Research highlights Statistical approaches to analyzing Arctic Ocean salinity were developed.
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*Highlights (for review) Research highlights Statistical approaches to analyzing Arctic Ocean salinity were developed. Six classes of typical patterns in the surface salinity fields were identified. Abrupt changes in the salinity of the Arctic Ocean surface layer were detected. Three leading modes of salinity decomposition describe >70% of the total dispersion. Interannual and quasidecadal oscillations linked to atmospheric and oceanic variability. *Manuscript Click here to download Manuscript: Paper_Ocean Modelling_resubmission_March_2015.docx Click here to view linked References 1 1 Surface salinity fields in the Arctic Ocean and statistical approaches to predicting large- 2 scale anomalies and patterns 3 Ekaterina A. Cherniavskaia1, Ivan Sudakov2,*, Kenneth M. Golden3, Leonid A. Timokhov1, 4 and Courtenay Strong4 5 1 6 Petersburg, 199397 Russia. 7 2 8 45469-2314 USA 9 3 Department of Oceanography, Arctic and Antarctic Research Institute, Bering str. 38, St. Department of Physics, 300 College Park, SC 111, University of Dayton, Dayton, OH Department of Mathematics, University of Utah, 155 S 1400 E, Room 233, Salt Lake City, 10 UT 84112-0090 USA. 11 4 12 Lake City, UT 84112-0090 USA. 13 * corresponding author: 14 email: isudakov1@udayton.edu Department of Atmospheric Sciences, University of Utah, 135 S 1460 E, Room 819, Salt 15 16 Abstract 17 Significant salinity anomalies have been observed in the Arctic Ocean surface layer during 18 the last decade. Using gridded data of winter salinity in the upper 50 m layer of the Arctic 19 Ocean for the period 1950-1993 and 2007-2012, we investigated the inter-annual variability 20 of the salinity fields, identified predominant anomaly patterns and leading modes of 21 variability, and developed a statistical model for the prediction of surface layer salinity. The 22 statistical model is based on linear regression equations linking the principal components 23 with environmental factors, such as atmospheric circulation, river runoff, ice processes, and 24 water exchange with neighboring oceans. Using this model, we obtained prognostic fields of 25 the surface layer salinity for the winter period 2013-2014. The prognostic fields generated by 2 26 the model were consistent with previously observed tendencies of surface layer freshening. 27 Cluster analysis of the salinity fields exhibits a dramatic shift in behavior of the 2007-2012 28 data in comparison to earlier observations. 29 Keywords: Arctic Basin, surface layer, patterns, salinity anomalies, empirical orthogonal 30 functions, gridding. 31 32 1. Introduction 33 The Arctic Ocean is very sensitive to changing environmental conditions. Its surface 34 layer is a key component of the Arctic climate system, which serves as the dynamic and 35 thermodynamic link between the atmosphere and the underlying waters (Carmack, 2000). 36 Thermohaline characteristics of the surface layer fully reflect the effects of atmospheric and 37 ice processes, as the water most directly exposed to the atmosphere and ice lies within the 38 mixed layer (Cronin and Sprintall, 2001). The stability and development of the ice cover are 39 associated with mixed layer thickness, as well as salinity and halocline structure in the upper 40 layer, which influence the geographic distribution of sea ice and its variability. In this 41 context, the Arctic Ocean surface layer is a critical indicator of climate change (Toole et al., 42 2010). 43 The thermohaline structure of the Arctic Ocean surface layer has undergone 44 significant changes in recent years. Of particular interest is the great freshening of the 45 Amerasian Basin surface layer that had not been observed since 1950 until the early 1990s 46 (Figure 1). In Jackson et al. (2012) it was emphasized that processes related to warming and 47 freshening the surface layer in this region had transformed the water mass structure of the 48 upper 100 m. 49 In addition, there have been observations of significant salinification of the upper 50 Eurasian Basin that began around 1989. One hypothesis for this is that the increase of Arctic 3 51 atmospheric cyclone activity in the 1990s led to a large change in the salinity in the Eurasian 52 Basin through changes in river inflow, and increased brine formation due to changes in Arctic 53 sea ice formation. The other reason for salinification is the influence of Atlantic waters (AW), 54 which by 2007 became warmer by about 0.24˚C than they were in the 1990s. Observations 55 show that increases in Arctic Ocean salinity have accompanied this warming. This led to 56 significant shoaling of the upper AW boundary and weakening of the upper-ocean 57 stratification in the Eurasian Basin as well (Polyakov et al., 2010). However, current 58 observations also show that the upper ocean of the Eurasian Basin was appreciably fresher in 59 2010 than it was in 2007 and 2008 (Timmermans et al., 2011). 60 Generally speaking, the problem of variability of Arctic Ocean salinity is challenging 61 from a theoretical perspective. There are two main approaches to this problem. The first 62 approach is to study variability of liquid freshwater export. For example, in (Lique et al., 63 2009) there is an analysis of the variability of Arctic freshwater content informed by a global 64 ocean/sea-ice model. The authors showed that contrast in the interannual variability of the 65 freshwater fluxes can be defined through flux velocity and salinity variations. They conclude 66 that variations of salinity (controlling part of the Fram freshwater export) arise from the sea 67 ice formation and melting north of Greenland. In (Jahn et al., 2012), simulations from ten 68 global ocean-sea ice models of Arctic freshwater have been compared. The authors conclude 69 that improved simulations of salinity variability are required to advance understanding of 70 liquid freshwater export. 71 The second approach is to model Arctic salinity stratification. It is known that for the 72 Arctic Ocean, water density depends more on water salinity than on water temperature, and 73 hence the thermohaline circulation is mainly determined by salinity distribution. This 74 conclusion comes easily from an analysis of a linear equation for the state of sea water: 75 (1) 4 76 where ρ0, T0, and S0 are some initial values of water density, temperature, and salinity; and 77 εT = 7·10-5 g/(cm3·K), εS = 8·10-4 g/(cm3·‰) (Fofonoff, 1985). 78 Vertical variations of temperature and salinity in the upper layer (5-200 m) can reach 79 0.5˚C and 1‰ respectively. If we put these numbers into equation (1) we obtain the 80 contributions of variations in temperature and salinity to changes in water density, which are 81 about 4% and 96%, respectively. Thus, salinity was chosen as the main characteristic of 82 thermohaline structure variations of the Arctic Ocean surface layer. 83 Improving the representation of the salinity distribution is crucial, however inclusion, 84 representation, and parametrization of a number of processes is required (Steele et al., 2001, 85 and Komuro, 2014). For example, in global ocean-sea ice models, salt is rejected in the first 86 ocean model level during ice formation, while in reality, the salt is distributed in the mixed 87 layer and below (Nguyen et al., 2009). 88 Recently, Sea Surface Salinity maps at high latitudes have been developed at the 89 SMOS Barcelona Expert Centre on Radiometric Calibration and Ocean Salinity (SMOS- 90 BEC). The maps are computed by means of an objective analysis scheme and they are 91 distributed in a spatial grid at 25km. However, the spatial coverage includes Arctic Ocean 92 open water regions only. Also, it covers only 2011-2013 years. 93 The transfer from the Arctic Ocean to the North Atlantic of briny water from sea ice 94 formation and sea ice itself are significant components of global ocean circulation. Thus, the 95 investigation of the variability of the surface layer can make a significant contribution to 96 understanding ocean-climate feedback. In particular, abrupt changes in surface layer salinity 97 may lead to critical transitions in patterns of global ocean circulation. A robust conceptual 98 statistical model may help to describe features of anomalies in salinification of the Arctic 99 Ocean, which are key players in the formation of surface salinity patterns. In this case, 100 investigation of the structure of patterns and quality of anomalies leads to a better 5 101 understanding of possible critical transitions in the patterns of global ocean circulation. 102 Variations of Arctic Ocean surface salinity have complex spatial and temporal structures, 103 which are affected by many external factors. Our aim is to distinguish the most significant 104 factors that lead to recent changes in upper layer salinity patterns. 105 We propose to develop a statistical (multiple linear regression) model for Arctic 106 Ocean salinity fields building on ideas presented in, for example, Timokhov et al. (2012). 107 This statistical model of variability of the Arctic Ocean winter salinity in the 5–50 m layer is 108 used as a method for reconstruction of the winter salinity fields, which have been presented in 109 Pokrovsky and Timokhov (2002). The model (see Appendix Figure A2 for a schematic of the 110 model) is based on equations of multiple correlations for the time series - principal 111 components (PC) associated with the first three leading modes from Empirical Orthogonal 112 Function (EOF) analysis. We apply this type of spectral analysis to the salinity fields. The 113 contribution of atmospheric factors and hydrological processes to variations in salinity can be 114 interpreted by determining the structure of the multiple correlation equations. The variability 115 patterns and relationships identified through the statistical analysis and modeling inform a 116 conceptual model for principal drivers of Arctic salinity. 117 Cluster analysis of the surface salinity allowed identification of six types of patterns in 118 the salinity fields, which differ from each other by the position of the fresh water core, the 119 position of the Transpolar Drift frontal zone, and the value of the horizontal salinity gradient. 120 It has been shown that the structure of the salinity fields of 1990-1993 and 2007-2012 121 differed greatly from previous years. The uniqueness of the haline structure (during 2007- 122 2012) was also confirmed by the results of decomposing the surface salinity fields into EOFs. 123 Analysis of the equations for the first three PCs showed that surface salinity fields 124 were influenced most by hydrological processes. Using the PCs calculated by the model, we 125 obtained forecast fields of Arctic Ocean surface layer salinity for the winter period 2013- 6 126 2014. Prognostic fields demonstrate the same tendencies of surface layer freshening that were 127 previously observed. 128 129 2. Methods 130 2.1. Data Set 131 This study is based on a collection of more than 9800 instantaneous temperature and salinity 132 profiles, with data available at the standard horizons (5, 10, 25, 50, 75, 100, 150, 200, 250, 133 300, 400, 500, 750, 1000 and so on every 500 meters), collected between 1950-1993. The 134 data were obtained from the Russian Arctic and Antarctic Research Institute (AARI) database 135 which was also used in the creation of the joint U.S. Russian Atlas of the Arctic Ocean for 136 winter (Timokhov and Tanis, 1997). This is complemented by data made available over the 137 period 2007-2012 from the expeditions of the International Polar Year (IPY) and afterward, 138 which consisted of Conductivity Temperature Depth (CTD) and eXpendable Conductivity 139 Temperature Depth (XCTD) data, as well as data from the Ice-Tethered Profiler (ITP)-buoys 140 (more than 14600 stations in total). The average vertical resolution of these profiles was 1 m. 141 The first database was introduced by Lebedev et al. (2008). In areas where observations were 142 missing, temperature and salinity data were reconstructed in a regular grid for the period of 143 1950 to 1989 as detailed in the next subsection. Also, some data was found in the joint U.S. 144 Russian Atlas of the Arctic Ocean for winter (Timokhov and Tanis, 1997). Thus, the working 145 database is represented by grids with 200-km horizontal spacing, covering a deep part of the 146 Arctic Ocean (with depths of more than 200 m). According to Treshnikov (1959), Rudels et 147 al. (1996, 2004) and Korhonen et al. (2013), the average thickness of the Arctic Ocean mixed 148 layer for the winter season is about 50 m. Also, a description of the data sources for other 149 physical parameters can be found in Table 1. 7 150 Table A1 lists the expeditions and number of stations that were used for 151 reconstruction and gridding of salinity fields. Figure A1 shows the overall observation 152 density and the year associated with each observation. The data exhibit a spatiotemporal non- 153 uniformity that is undesirable but expected given the challenges associated with recovering 154 long-term observations of Arctic salinity. Acknowledging its limitations, the data set still 155 provides the most spatiotemporally detailed observational resource for studying multidecadal 156 variations in basin-wide Arctic salinity, and there is community value in the identification, 157 dissemination, and modeling of its principal modes of variability. To test for artifacts from 158 the data gaps and the interpolation procedure (reviewed in the next subsection), we make 159 several comparisons across methods and to independent data sets in the subsections to follow. 160 For example, we note that our full-record cluster analysis yields dendograms similar to those 161 found by Koltyshev et al. (2008) without using the 2007-2012 period. We further performed 162 the EOF analysis with and without the additional 2007-2012 period, and report only modest 163 change to the resulting modes of variability (Section 3.2). In Section 3.2, we also show that 164 analogous EOF analysis on salinity fields from an independent, data-assimilated coupled 165 ocean-ice model forced by atmospheric observations yields leading modes similar to the 166 patterns found in our merged salinity data sets. 167 2.2. Field reconstruction and interpolation 168 To provide temporal and spatial continuity, we have unified existing data sets using 169 reconstruction and gridding. The technique of computation of gridded fields for the period 170 from 1950-1993 was described by Lebedev et al. (2008), and is summarized here. 171 These techniques are based on the method of ocean field reconstruction, proposed by 172 Pokrovsky and Timokhov (2002). This method projects the data onto EOFs and then recovers 173 spatially continuous fields by interpolating the EOFs onto regular grids. This involves an 174 eigen decomposition of the covariance matrix as widely performed in geostatistical analysis 8 175 (e.g., Hannachi et al., 2007). The proposed method, which was used to obtain gridded 176 salinity fields, is described as 177 zi=zi(r )+e, zi z j =σ x x , zi ei =0, i j (2) ei =0, ei e j =δij σe2. 178 Here z(t, x) is the measured value of an oceanographic variable (e.g. temperature or salinity) 179 and is a random function of time t and spatial coordinates x; i and j are the nodes of the 180 irregular data grid; the notation <…> indicates the ensemble average of a value. We can 181 reproduce the observed value of z(t, x) as the sum of a true value z(r)(t, x) of the 182 oceanographic variable and an observational error e(t, x). The mean values of z(t, x) are 183 derived by time averaging and space smoothing. We also propose that zi(r) has spatial 184 correlations to the p variables; that a systematic error is not identified; a standard deviation of 185 error (σe2) does exist, and ij 0 if i j is the Kronecker delta. 1 if i j 186 Biorthogonal decomposition of the oceanographic variable can help to identify the 187 connections between spatial and temporal distributions within the data: 188 z (t j , xi ) = ckj f k ( xi ) + e(t j , xi ) , (3) k 189 where fk(xi) – is the spatial empirical orthogonal function (EOF); ckj – the calculated 190 coefficient, so-called k-th principal component. 191 The main goal of this spectral analysis method is to estimate the coefficients of 192 j spectral decomposition c k . In this case, we rewrite formula (3) in the following matrix 193 form: 194 Z F C e , 195 here is the sign of the matrix multiplication. (4) 9 196 The system of linear equations (4) with respect to the unknown coefficients c kj can be 197 solved on the basis of the a priori statistical information (2) with the use of the methods of 198 statistical estimation. A formula for the estimation of the matrix of the unknown coefficients 199 C was obtained in (Pokrovsky and Timokhov, 2002) 200 Cˆ ( F T K e1 F K c1 ) 1 F T K e1 Z , 201 where X 1 and X T are the inverse and transposed matrixes with respect to X, respectively. 202 We use the following notation for the covariance matrices: 203 K z z2ij , K e e2ij , (i, j 1,...., N ). The covariance matrix of errors of the expansion ij 204 (5) coefficients ij is a diagonal matrix composed of eigenvalues of the covariance matrix . 205 The matrix F is formed by the values of the EOF, and the matrix Z is composed of 206 the totality of the measurement data at the points of the observation net x i . In order to obtain 207 an estimate of the unknown variables at the nodes of the regular grid ~ xi , it is necessary to 208 interpolate the EOF into the corresponding nodes of the grid and obtain a new matrix F of 209 the EOF. Using the matrix F obtained in this way and the estimates of the coefficients Ĉ 210 from formula (5), we obtain from the matrix relationship 211 ~ ~ ~ Z F C e~ , 212 an estimate of the unknown parameters at the nodes of a regular grid. Simultaneously with 213 the salinity fields in the nodes of a regular grid, we can also calculate the covariance matrices 214 of the errors of estimations obtained from the following equations: 215 ~ ~ ~ K cˆ ( I ( K ( F T K e1 F ))) 1 K c , ~ ~ K zˆ F K z F T , 216 ~ where K e is the covariance matrix of the observation error expanded over the regular grid 217 ~ xi . ~ ~ (6) (7) 10 218 The approach detailed above is a combination of singular value decomposition and 219 statistical regularization. These coefficients (modes) can be linked to the real physical 220 processes that influence salinity (see Table 1). Preparation of the average salinity field data 221 for 2007-2012 has consisted of several stages (see Appendix). First, we checked the data for 222 random errors. Further, we used bilinear spatial interpolation. Next, we constructed an 223 interpolation via a grid of nodes, and gaps in the data for uncovered sites were filled with 224 climatic values from the Joint U.S.-Russian Atlas of the Arctic Ocean (Timokhov and Tanis, 225 1997). 226 2.3. Statistical approach 227 Here we describe the approaches to data analysis which were used for physical 228 interpretation of our statistical model. Polyakov et al. (2010), Rabe et al. (2011), and Morison 229 et al. (2012) have emphasized that the thermohaline structure of the surface layer has 230 undergone significant change over the last decade. However, it is not clear what physical 231 processes led to these changes or what future trends may be. 232 The analysis of the variability of the surface layer (including salinity fields) of the 233 Arctic Ocean may be based on the decomposition using EOFs. This approach is useful in our 234 case because this decomposition gives us EOF modes and principal components (PCs), 235 respectively providing spatial and temporal views of variations in salinity. Each mode 236 accounts for a certain fraction of the total variance of the initial data. The EOFs are 237 conventionally ranked so that the first mode explains the largest fraction of total variance, the 238 second mode explains the largest fraction of the remaining variance, and so on (Hannachi et 239 al., 2007). The first 3-5 modes describe most of the variance of the analyzed salinity fields, 240 which allows significant compressing of the information contained in the original data 241 (Hannachi et al., 2007; Borzelli and Ligi, 1998). The EOF decomposition was carried out for 11 242 the average salinity fields for the layer 5-50 m, as well as obtaining time series of PCs for the 243 periods of 1950-1993 and 2007-2012. 244 We applied our statistical model to interpret the physical processes through PCs. We 245 used multiple linear regression to model the time series of principal components to identify 246 predictors that determined variability of the salinity fields. The regression equations can give 247 projections of future changes because the predictors lead the salinity field by various 248 temporal lags. The statistical model is characterized by a system of linear regression 249 equations constructed for the first three PCs, as the first three EOFs yield more than 72% of 250 the total variance of the salinity data. The PCs were associated with the following factors: 251 winter (October-March) and summer (July-September) atmospheric circulation indexes (AO 252 and AD; Table 1), river runoff, the area of the ice-free surface in Arctic seas in September, 253 and water exchanges with the Pacific and Atlantic Oceans. For the latter two indices 254 representing water exchanges, we used the PDO and AMO indices as respective proxies 255 because of their influence on the temperature and salinity of water entering through the 256 Bering Strait and the Faeroe-Shetland Strait to the Arctic Ocean (Zhang et al., 2010; Dima 257 and Lohmann, 2007). Atmospheric indexes were averaged by different time periods within 258 indicated winter and summer seasons. The optimal periods of averaging for a particular index 259 were chosen to maximize correlation with the PCs. 260 2.4. Cluster analysis 261 The cluster analysis suggested by Ward (1963) was used to analyze the trajectories of 262 the evolution of winter salinity. Ward’s method is a hierarchical method based on 263 minimization of the sum of squares of any two clusters that form at each step. This method 264 was chosen as it is regarded as very efficient and yields unique and exact hierarchy (Scheibler 265 and Schneider, 1985). Analysis was performed using the “Multivariate Exploratory 266 Techniques” toolkit in the STATISTICA 8.0 software package (Hill and Lewicki, 2007). 12 267 According to this approach, we represented the salinity fields as a matrix (50×129) 268 with years in columns and grid nodes in rows. Each of these nodes contained information 269 about salinity in the region. The measure of the distance between two years was introduced 270 through the Euclidean metric: 271 Dij = ( (S i S j ) ) 2 1 2 (8) ij 272 where Si and Sj are the salinity fields for the years i and j respectively 273 Consequently, this analysis allowed us to obtain the hierarchical salinity fields with a 274 feature of statistical identity (Figure 2). The figure shows that the salinity fields have 275 structural differences and thus are grouped in clusters for consecutive years. Based on the 276 tree ties, we have identified six of the largest groups in a temporal scale as well as the six 277 basic patterns in salinity fields. The first cluster includes the field for the years: 1950-59, 278 1976-77 and 1989; the second cluster includes 1960-1965; the third cluster includes 1966- 279 1975; the fourth cluster includes 1981-1988; the fifth cluster includes 1978-1980; and the 280 sixth cluster includes 1990-93 and 2007-2012. 281 Similar results were obtained using other methods of cluster analysis (e.g., complete 282 linkage, and weighted pair-group average). This indicates that the chosen division into 283 clusters is stable and proper. In addition, a similar dendrogram was found in the work of 284 Koltyshev et al. (2008), where cluster analysis was completed for the data series of an 285 average salinity at a depth of 5-25 m for the period of 1950-1989. It also confirms the 286 robustness of our classification. Within the framework of our classification, the pattern may 287 persist for two to nine years. 288 289 3. Results 290 3.1 Cluster Analysis 13 291 Beginning with results from the cluster analysis, we calculated the average salinity 292 anomalies for each of the cluster time periods. This allowed us to find the differences (from 293 cluster to cluster) (Figure 3) in the structure of salinity fields (Table 2). In general, if we 294 compare the variability of salinity in the Eurasian and Amerasian basins, we may conclude 295 that the main difference in salinity fields for 2007-2012 (included in pattern 6) are in the 296 value of the salinity in the Canada basin (which is a part of the Amerasian basin). During this 297 period its values were 1.4 ‰ less compared with average values. This means there has been a 298 significant freshening of the surface layer, which had apparently not happened in at least the 299 past 50 years of available observations (Figure 1). 300 In addition, we note that pattern 6 has a separate branch with the largest Euclidean 301 distance on the dendrogram. Thus it can be assumed, that since 1990 the structure of the 302 salinity fields has undergone significant changes, which were most pronounced in 2007-2012. 303 These years can be isolated in a separate sub-branch. 304 3.2. Decomposition of surface salinity fields by EOF 305 Considering the results of cluster analysis, as a result of EOF decomposition of the 306 salinity fields for the 5-50 m layer, we obtained two sets of modes and PCs for the period of 307 1950-1993 (series 1), and for the same period adding the years 2007-2012 (series 2). Based 308 on North’s Rule of Thumb (North et al., 1982) the first three modes were accepted for further 309 analysis as physically significant. In summary, the first three modes obtained by the 310 decomposition of series 1 describe more than 60% of the total dispersion of the initial fields, 311 the first three modes of series 2 describe more than 70% of the total dispersion, and the 312 results from these two decompositions are quite similar. The only significant difference is an 313 additional core in the Canada Basin that appears in the first mode of series 2 (Figure 4b). We 314 assume that the modes obtained by decomposition in series 1 cannot take into account the 315 essential features of the distribution of surface salinity fields associated with the freshening of 14 316 the Canada Basin. Therefore, for further analysis we used the PCs and modes obtained upon 317 decomposition in series 2. 318 To enhance confidence in the robustness of these modes, Appendix Figure A3 319 presents a similar EOF analysis using model output from the Pan-Arctic Ice-Ocean Modeling 320 and Assimilation System (PIOMAS; Zhang and Rothrock, 2003, Lindsay and Zhang, 2006). 321 PIOMAS is a coupled ice-ocean model that uses data assimilation methods for ice 322 concentration and ice velocity. Forced by atmospheric observations, its output available for 323 1978-2005 is widely used as the best possible estimate of Arctic fields with limited long-term 324 observations including salinity and sea ice thickness. The spatial pattern of PIOMAS mean 325 salinity (Figure A3a) closely resembles the pattern shown for our data in Figure 4a. Without 326 detrending, the freshening trend in the Canada Basin (Jackson et al., 2012) dominates the 327 leading EOF of PIOMAS salinity (not shown) because the data begin in 1978. EOFs of 328 PIOMAS salinity after detrending (Figure A3b-d) compare favorably with corresponding 329 results in Figure 4b-d, despite incomplete overlap over the analysis periods. In particular, for 330 both data sets, the leading EOF of salinity features a prominent dipole between the Canada 331 Basin and Eurasian Basin (Figures 4b and A3b), and the second EOF of salinity features a 332 positive center of action elongated along the Lomonosov Ridge surrounded by negative 333 loading strongest near Svalbard (Figures 4c and A3c). Less agreement is seen for the third 334 EOF (Figures 4d and A3d), which is perhaps unsurprising moving toward modes accounting 335 for less variance. 336 3.3. The linear regression equation for the principal components 337 We present here a statistical model of inter-annual variability of the Arctic Ocean 338 surface layer salinity. This research builds on established approaches used by Pokroivsky and 339 Timokhov (2002) (specifically, their reconstruction of salinity fields applying modified EOF 340 methods). 15 341 We suggest some additions to improve the ideas presented in previous research. For 342 example, the analysis presented is based on a dataset updated for the period 2007-2012, 343 which is quite important for understanding the physical processes during the dramatic current 344 changes in Arctic sea ice. Also, in contrast to our previous study (Timokhov et al., 2012), we 345 do not use the preceding values of the principal components (history) as predictors for linear 346 regression, thus simplifying the physical interpretation of the equations obtained. 347 A set of external factors having the most correlation with salinity values have been 348 defined based on the results of correlation analysis. As a result of linear regression analysis, 349 we obtained empirical equations for the first three principal components (see Table A2 in 350 Appendix). 351 The structure of these equations can be explained through the sets of factors 352 representing the effects of both atmospheric and hydrological processes. Thus, the predictors 353 used can be divided into two groups: the first group includes atmospheric circulation indices 354 and reflects the influence of atmospheric processes; the second group reflects hydrological 355 processes captured by river runoff for Arctic seas, inflows through the Bering Strait and the 356 Faeroe-Shetland Strait (characterized by the PDO and AMO indices), and the areas of open 357 water in the Arctic seas in September. Predictors were included in the equations with 358 different time shifts so that the predictors may lead the PCs. The value of the time shifts was 359 1–10 years and was chosen on the basis of crosscorrelations of predictors with PCs in order to 360 maximize explained variance. 361 The contribution of each group to explained variance in PC1 – PC3 can be calculated 362 based on the magnitude and sign of the regression coefficients of correspondent predictors 363 included in that particular group. In this case, hydrological processes have a dominant 364 contribution to explained variance in PC1. Atmospheric factors (i.e. AO and AD) contribute 16 365 70% of the explained variance of PC2 and PC3 with the remainder falling on hydrological 366 processes. 367 368 4. Discussion and Summary 369 The first mode of surface salinity decomposition (EOF1) displays an out-of-phase 370 relationship between salinity anomalies in Canada Basin and Eurasian Basin (which includes 371 Nansen and Amundsen Basins) and Makarov Basin (Figure 4b). This opposition closely 372 resembles pattern 6, which features positive salinity anomalies in Eurasian Basin and 373 negative anomalies in Canada Basin (Figure 3f). 374 In the late 1980s, the atmospheric circulation regime began to change (Steele and 375 Boyd, 1998; Proshutinsky et al., 2009; Morison et al., 2012). Degradation of the Arctic 376 anticyclone is an key example. Some changes in the structure of the surface pressure field 377 were observed in association with a frequent recurrence of large values of the AD indices. 378 According to Wang et al. (2009), this could be a main reason for the local minima of sea ice 379 extent in the summers of 1995, 1999, 2002, 2005 and 2007. In addition, in the late 1980s the 380 inflow of warm and high salinity Atlantic water into the Arctic Basin increased (Morison et 381 al., 2000; Polyakov et al., 2010). At the beginning of this century, the heat flow of Pacific 382 waters through the Bering Strait to the Chukchi Sea increased as well (Woodgate et al., 383 2010). 384 These observations allow us to suggest that pattern 6 of the dendrogram is the 385 consequence of these processes. Our suggestion is supported by the regression equation for 386 PC1 (Appendix) from which we see that PC1 is a function of AMO, PDO, and open water area 387 in East Siberian and Chukchi seas (the latter can be considered as an indirect indicator of 388 fresh water inflow form these seas to the Arctic). The time lags should be related to the time 17 389 that it takes for Atlantic and Pacific waters to reach the Arctic Basins and become involved in 390 circulation (Shauer et al., 2002; Bourgain and Gascard, 2012). 391 EOF2 exhibits opposite polarity of salinity anomalies in the central Arctic Ocean and 392 near-slope areas (Figure 4c). Spectral analysis of the associated PC2 revealed an 8-year cycle, 393 which we associate with shifts between cyclonic and anticyclonic circulation regimes 394 (Proshutinsky and Johnson, 1997; Rigor et al., 2002). The regression equation for PC2 395 indicates its dependence on summer AO and AD indices. PDO and river runoff from Laptev, 396 East Siberian and Chukchi seas make the largest contribution to variability of PC2 (28.8% and 397 25.9%, respectively) with slightly weaker effects from AO and AD (24.4% and 20.9%, 398 respectively). Cluster pattern 2 (Figure 3b) resembles the EOF2 (Figure 4c) spatial pattern. 399 For the averaging period 1960-1965, summer AO indices (and PC2) were negative. During 400 the anti-cyclonic regime of atmospheric circulation, fresh surface waters tend to flow to the 401 center of the Arctic basin and negative salinity anomalies form there. At the same time, along 402 the slopes there is upwelling of Atlantic waters and positive salinity anomalies occur 403 (Proshutinsky and Johnson, 1997). Positive PC2 (i.e. cyclonic circulation regime) indicates 404 the opposite conditions. 405 EOF3 is represented by two elongated bands of loading (Figure 4d). The “Eurasian” 406 band has two distinct centers located over Chukchi Plateau and over Lomonosov Ridge. The 407 “Canadian” band has one core over the North Pole. This pattern of variation is consistent with 408 the Arctic Dipole (Wu et al., 2006). The winter AD index is the leading predictor of PC3 with 409 a contribution of over 30%. Two centers of the “Eurasian” band are associated with influence 410 of river runoff from Kara and Laptev seas and Pacific water inflow. Corresponding predictors 411 account for 28.5 %and 22.5 % of the variability of PC3 (Appendix). 412 Time series of PC1-3 show a mixture of interannual and quasidecadal oscillations 413 (Figure 5). We may conclude that large-scale surface layer salinity anomalies (with period of 18 414 over 20 years) are the result of water exchange effects. The more short-period (8-9 years) 415 variations are determined by atmospheric circulation processes. Also interannual variations 416 occur due to interannual variability of both atmospheric and hydrological processes. 417 The derived equations in the Appendix (Table A2) describe the first three principal 418 components for the period 1950-2012; calculated with these equations the PCs have good 419 agreement with the values of PCs directly derived from the decomposition of salinity fields 420 via EOF analysis (Figure 5). 421 Theoretically, the salinity fields for 1994-2006 can be reconstructed using this 422 statistical model. We noted above that this period had gaps in observational data. In practice 423 they may lead to inaccuracies due to the higher-frequency variability of the calculated PCs. 424 This model cannot reproduce exact principal components for short-term time series, although 425 the trend in variability of all three PCs is reproduced correctly. Therefore, the model can be 426 used for tracking long-term processes of the structure transformation of salinity fields. 427 Validation of the model was carried out by calculating an error of reconstruction for 428 the surface salinity fields. The difference between the actual and reconstructed salinity fields 429 (ε) was determined as a percentage by the following formula: 430 = ( ( S f S c ) ( S f )) 100% , 431 where σ is the standard deviation, Sf is the actual salinity, and Sc is the calculated salinity. (9) 432 On the basis of 13 reconstructed salinity fields the average error of reconstruction 433 obtained was 31.2%. As the first three EOF modes describe more than 72% of the variability 434 of the initial fields, the error obtained exceeds by a small amount the rest of the dispersion 435 that is not covered by the first three EOFs. Thus we have a system of regression equations 436 (statistical model) that may reproduce long-term salinity anomalies relatively well. 437 The rest of the surface salinity dispersion captured by higher order EOFs (about 28%) 438 is likely explained through the short-term, and probably local, processes such as ice 19 439 formation and cascading in polynya regions (Ivanov and Watanabe, 2013), deep convection, 440 or mixing with Atlantic water upper boundary (Ivanov et al., 2012). 441 We applied our statistical model to the reconstruction of salinity fields for 2013-2014. 442 As a result, we obtained the salinity fields that correspond to the trends observed in recent 443 years. The dendrogram obtained via cluster analysis with the 2013-2014 fields added, showed 444 that reconstructed fields also fall into cluster 6 (not shown). This has preserved the significant 445 freshening in the Canada Basin as well as large spatial gradients between the Eurasian and 446 Amerasian Basins, though in 2014 these gradients appear to be smaller (Figure 6). According 447 to our projections for 2013-2014, freshened water from the Beaufort Gyre moves westward 448 along the Canadian Continental Slope. As a result, average salinity of the Eurasian basin will 449 decrease. 450 Recently, Sea Surface Salinity maps at high latitudes have been developed at the 451 SMOS Barcelona Expert Centre on Radiometric Calibration and Ocean Salinity (SMOS- 452 BEC) available from http://cp34-bec.cmima.csic.es/. The maps are computed by means of an 453 objective analysis scheme. However, it lacks the spatial coverage of our data because it is for 454 Arctic Ocean open water regions only. Also, it covers only 2011-2013 years. 455 Thus we have identified various patterns in Arctic Ocean surface salinity fields using 456 a reliable statistical model. In addition, we have found anomalies in the salinity fields, which 457 have occurred in the past and conclude that more than 70% of surface salinity variability is 458 constituted by long-term processes and only 30% are due to short-term and local processes. 459 Our findings again raise questions about nonlinearities in global ocean circulation, 460 particularly in the Arctic Ocean, which is strongly connected with Earth’s climate system. In 461 the future, information obtained about these anomalies may be helpful in determining 462 whether the Arctic Ocean salinity, and related oceanographic phenomena, have undergone 463 regime shifts or changes in response to climate forcing. 20 464 465 Acknowledgments The authors thank the big data sources, which are mentioned below. 466 The detailed algorithm of the salinity data gridding procedure is available at the AARI web- 467 site:http://www.aari.ru/resources/a0013_17/kara/Atlas_Kara_Sea_Winter/text/tehnik_report.h 468 tm#p2. Indexes of atmospheric circulation are available at NOAA’s Data Base. The area of 469 ice-free 470 http://www.aari.ru/projects/ECIMO/index.php?im=100. River runoff data were obtained from 471 the Joint US-Russian Atlas of the Arctic Ocean and Arctic RIMS Data Server. We thank M. 472 Janout for providing AD indices north of 600N. surface in the Arctic seas was calculated from data sited at 473 The authors are grateful for financial support from the Otto Schmidt Laboratory for 474 Polar and Marine Research (Grant No. OSL-13-05), and from the Russian Foundation for 475 Basic Research (Grants No. 16-34-00733_mol_a and 16-31-60070_mol_a_dk). Also, we 476 gratefully acknowledge support from the Division of Mathematical Sciences and the Division 477 of Polar Programs at the U.S. National Science Foundation (NSF) through Grants ARC- 478 0934721, DMS-0940249, and DMS-1413454. We are also grateful for support from the 479 Office of Naval Research (ONR) through Grant N00014-13-10291. We would like to thank 480 the NSF Math Climate Research Network (MCRN) as well for their support of this work. We 481 thank N. Lebedev and V. Karpy for help with data processing. In preparing this text, we have 482 benefited from discussions with Jessica R. Houf. Finally, the authors acknowledge helpful 483 comments from three anonymous reviewers. 484 References 485 Borzelli, G., Ligi, R., 1998. Empirical Orthogonal Function Analysis of SST Image Series: a 486 Physical Interpretation. J. Atmos. Oceanic Technol. 16, 682–690. 21 487 Bourgain, P. and Gascard, J.C., 2012. The Atlantic and summer Pacific waters variability in 488 the Arctic Ocean from 1997 to 2008. Geophys. Res. Lett., 39, L05603, 489 doi:10.1029/2012GL051045 490 Carmack, E.C., 2000. The Arctic Ocean’s freshwater budget: sources, storage and export, in: 491 Lewis, E.L., Jones, E.P., Lemke, P., Prowse, T.D., Wadhams, P. (Eds), The 492 Freshwater Budget of the Arctic Ocean. 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Oceanogr., 40, 1729-1747. doi: 619 10.1175/2010JPO4323.1 620 27 621 Table 1. Predictors used for the approximation of PCs. Physical Physical value Description processes and its Data sources (references and the web sources) notation Arctic oscillation First EOF-mode of Sea- When the AO index is positive, surface pressure is low in the Thompson and Wallace (1998). index (AO) level pressure north of 60N polar region. NOAA Center for Weather and latitude When the AO index is negative, there tends to be high pressure Climate Prediction (NCWCP) in the polar region. http://www.esrl.noaa.gov/psd/d The lower case in Table A1 indicates the months of an average ata/gridded/ period. Arctic Dipole Second EOF-mode of Sea- When the AD index is positive, sea-level pressure has positive Overland and Wang (2010). Anomaly index level pressure north of 60N anomaly over the Canadian Archipelago and negative anomaly NOAA Center for Weather and (AD) latitude over the Barents Sea. Climate Prediction (NCWCP) When the AD index is negative, SLP anomalies show an http://www.esrl.noaa.gov/psd/d opposite scenario, with the center of negative SLP anomalies ata/gridded/ over the Nordic seas. (Wu et al., 2006; Wang et al., 2009; 28 Overland & Wang, 2010). Atlantic Multi Variations of sea surface Index has cool and warm phases that may last for 20-40 years at Enfield et al.(2001). decadal oscillation temperature in the North a time and a difference of about 0.5˚C. It reflects changes of sea ESRL Physical Sciences index (AMO) Atlantic Ocean surface temperature in the Atlantic Ocean between the equator Division (PSD) and Greenland. http://www.esrl.noaa.gov/psd/d Was used as a substitute for processes of water exchange with ata/timeseries/AMO/ the Atlantic Ocean. The Pacific North Pacific sea surface When the PDO index is positive, the west Pacific becomes cool Trenberth and Hurrell (1994). Decadal temperature variability and part of the eastern ocean warms. When the PDO index is Joint Institute for the Study of Oscillation index negative, the opposite pattern occurs. It shifts phases on at least the Atmosphere and Ocean (PDO) the inter-decadal time scale, usually about 20 to 30 years. (JISAO) http://jisao.washington.edu/pdo/ River runoff (RIV) Water flows Average annual runoff of the main Siberian rivers. It was used Timokhov and Tanis (1997). as total runoff in the Kara Sea (K), Laptev Sea (L), East- Joint US-Russian Atlas of the Siberian Sea (E) and Chukchi Sea (C). The lower case in Table Arctic Ocean. A1 indicates the first letters of the sea name. http://rims.unh.edu/data/station/ 29 list.cgi?col=4 Area of open water Area Total ice-free area in the Kara Sea (K), Laptev Sea (L), East- Russian Arctic and Antarctic in Arctic seas Siberian Sea (E) and Chukchi Sea (C) in September. The lower Research Institute (AARI) (OW) case in Table A1 indicates the first letter of the sea name. http://www.aari.ru/projects/ECI MO/index.php?im=100 622 623 Table 2. Patterns of the salinity fields. Pattern Pattern 1 Structure of salinity fields Our analysis for these years shows that a desalination zone occupies the Canada Basin and spread along the Canadian shelf till the Fram Strait (Figure 3a). The salt-frontal zone lies along the Lomonosov Ridge. Pattern 2 Here the distribution of salinity fields looks more like a freshening zone with multiple cores, which extend from the Beaufort Sea toward the Barents Sea through to the North Pole (Figure 3b), while along the slope there were positive salinity anomalies. This kind of distribution of salinity fields may be formed under the dominance of an anti-cyclonic mode of atmospheric circulation (Proshutinsky and Johnson, 1997), which is probably reflected by dominant negative principal component (PC2) (see histogram). Pattern 3 The main feature of the salinity distribution is an extensive area of freshening which occupies the entire Amerasian Basin, Eurasian and Greenland slopes. As a result, the salinity frontal zone was shifted to the region of the Gakkel Ridge (Figure 3c). This structure of the salinity spatial distribution may be formed at the cyclonic mode of the atmospheric circulation (Proshutinsky and Johnson, 1997). Pattern 4 This cluster is opposite to cluster 3. Slight salinization was observed in Canada and Makarov Basins (Figure 3d). Pattern 5 The core of freshening has a displacement to the region of the Makarov Basin to the Northeast from the slope of the Laptev Sea shelf. The freshening zone extends from west to east (Figure 3e). This cluster is opposite to clusters 1 and 6 in terms of signs of PCs and location of salinity anomalies. 30 Pattern 6 This cluster is similar to cluster 1 as both have dominant negative PC1, but salinity anomalies are much more extreme. The zone of maximum freshening is located in the southern part of the Canada Basin and spreading along the slope till the Lomonosov Ridge. The salt-frontal zone is at the extreme eastern position and occupies the whole Eurasian Basin area up to Mendeleev Ridge (Figure 3f). 624 31 625 Figure Caption List: 626 Figure 1. Temporal changes in salinity averaged over the depth range 5-50 m. 627 Figure 2. Dendrogram of winter salinity fields for the layer 5-50 m in the Arctic Basin. 628 Figure 3. Winter salinity anomalies for the layer 5-50 m averaged over six periods to patterns: 629 a – pattern 1, 1950-59, 1976-77 and 1989; b – pattern 2, 1960-1965; c – pattern 3, 1966-1975; 630 d – pattern 4, 1981-1988; e – pattern 5, 1978-1980; f – pattern 6, 1990-93 and 2007-2012. 631 The histograms illustrates the differences between patterns in terms of PCs. Anomalies were 632 calculated relative to averaged surface salinity for 1961-1990. 633 Figure 4. The average salinity field (a) and first three modes of the average salinity field 634 decomposition for the layer 5-50 m: (b), (c), (d) - 1st, 2nd and 3rd modes, respectively, for the 635 period 1950-1993 and 2007-2012. 636 Figure 5. The actual (black line) principal components and calculated principal components 637 (red dashed line) with the help of the equations of linear regression. Correlation coefficients 638 between the calculated time series of PCs and actual PCs are: r(PC1)=0.87; r(PC2)=0.67; 639 r(PC3)=0.66. 640 Figure 6. There are reconstructed salinity fields for the layer of 5-50 m in 2013 (a) and 2014 641 (b) and their anomalies (c, d) comparatively averaged surface salinity for 1961-1990. 642 Figure A1.Observation density. Color bar indicate the last number of year in each decade. 643 Figure A2. Schematic of the conceptual statistical model. 644 Figure A3. Same as Figure 4, but for salinity averaged annually over the upper ten layers of 645 PIOMAS data for 1979-2005: a) mean salinity and (b-d) are respectively EOFs 1, 2, and 3 of 646 salinity. 32 647 648 649 650 651 652 Figure 1. Temporal changes in salinity averaged over the depth range 5-50 m. 33 653 654 655 656 657 658 659 660 661 662 663 664 665 666 667 Figure 2. Dendrogram of winter salinity fields for the layer 5-50 m in the Arctic Basin. 34 668 669 Figure 3. Winter salinity anomalies for the layer 5-50 m averaged over six periods 670 representing objectively determined clusters: a – pattern 1, 1950-59, 1976-77 and 1989; b – 671 pattern 2, 1960-1965; c – pattern 3, 1966-1975; d – pattern 4, 1981-1988; e – pattern 5, 1978- 672 1980; f – pattern 6, 1990-93 and 2007-2012. The inset histograms illustrate the differences 673 between patterns in terms of PCs. Anomalies were calculated relative to averaged surface 674 salinity for 1961-1990. 675 676 677 678 679 680 681 682 35 683 684 685 Figure 4. The average salinity field (a) and first three modes of the average salinity field 686 decomposition for the layer 5-50 m: (b), (c), (d) - 1st, 2nd and 3rd modes, respectively, for the 687 period 1950-1993 and 2007-2012. 36 688 689 Figure 5. The actual (black line) principal components and calculated principal components 690 (red dashed line) with the help of the equations of linear regression. Correlation coefficients 691 between the calculated time series of PCs and actual PCs are: r(PC1)=0.87; r(PC2)=0.67; 692 r(PC3)=0.66. 693 694 695 37 696 697 Figure 6. There are reconstructed salinity fields for the layer of 5-50 m in 2013 (a) and 2014 698 (b) and their anomalies (c, d) comparatively averaged surface salinity for 1961-1990. 699 700 701 702 703 704 705 38 706 Appendix: 707 Data and observation density 708 Table A1. Datasets used for reconstruction and gridding of surface layer salinity fields. Expedition (cruise) or code of expedition (cruise) Regions, water areas Date of station performance first Number of stations last SEVER05 ArB,ChS,EsS 03/31/1950 04/02/1951 51 Toros1951 KrS,LpS 04/08/1951 04/24/1951 9 SEVER07 ArB, KrS,LpS 04/16/1955 05/15/1955 105 NP05 ArB 05/20/1955 03/20/1956 14 SEVER08 ArB, ChS,EsS 04/04/1956 05/16/1956 48 SEVER09 ArB 03/1957 11 Lena1958 GrS 03/11/1958 03/25/1958 28 SEVER10 ArB 03/1958 18 WOD98_31_3272 ArB 03/29/1958 04/14/1958 3 SEVER11 ArB 03/1959 30 Storm1959 GrS 04/26/1959 06/12/1959 59 NP08 ArB 06/30/1959 02/15/1962 52 27 05/1957 06/1958 05/1959 SEVER12 ArB 03/1960 WOD98_18_11445 ArB 04/18/1960 05/30/1960 05/1960 6 WOD98_31_672 ArB 12/29/1960 12/29/1960 1 SEVER13 ArB 03/1961 05/1961 27 SEVER14 ArB 03/1962 05/1962 29 SEVER15 ArB 02/1963 05/1963 58 SEVER16 ArB,ChS,EsS,KrS,LpS 03/23/1964 05/13/1964 43 SEVER17 ArB,ChS,EsS,KrS,LpS 03/17/1965 05/11/1965 44 NP14 ChS,EsS 05/30/1965 01/24/1966 16 SEVER18 ArB,ChS,EsS,KrS,LpS 03/12/1966 05/07/1966 42 SEVER19 ArB,ChS,EsS,KrS,LpS 03/19/1967 04/26/1967 32 OBTAZ1967 KrS 04/06/1967 08/21/1967 26 NP15 ArB 04/30/1967 03/14/1968 18 SEVER20 ArB,ChS,EsS,KrS,LpS 03/19/1968 05/03/1968 60 WOD98_31_2170 ArB 03/29/1968 04/06/1968 3 AUGMS1968 KrS 04/09/1968 05/03/1968 45 NP17 ArB 06/25/1968 09/26/1969 45 SEVER21 ArB,ChS,EsS,KrS,LpS 03/18/1969 05/14/1969 95 NP16 ArB 04/22/1969 03/15/1972 83 Tiksi1969 LpS 04/25/1969 12/08/1969 51 DUGMS1970 KrS 01/06/1970 12/18/1970 73 SEVER22 ArB,ChS,EsS,KrS,LpS 03/30/1970 05/11/1970 90 AUGMS1970 KrS 04/12/1970 05/01/1970 70 NP18 ArB 05/19/1970 03/15/1971 20 NP20 ArB,EsS 05/20/1970 04/15/1972 49 NP19 ArB,EsS 11/14/1970 03/26/1973 43 DUGMS1971 KrS 01/07/1971 12/23/1971 73 Tiksi1971 LpS 01/10/1971 11/30/1971 106 39 SEVER23 ArB,ChS,EsS,KrS,LpS 02/28/1971 05/10/1971 81 AUGMS1971 KrS 04/19/1971 08/07/1971 112 DUGMS1972 KrS 01/06/1972 12/27/1972 95 Tiksi1972 LpS 01/10/1972 06/20/1972 54 SEVER24 ArB,ChS,EsS,KrS,LpS 02/29/1972 05/07/1972 51 AUGMS1972 KrS 04/20/1972 05/30/1972 80 NP21 ArB,EsS 05/30/1972 03/21/1974 30 SEVER25 ArB,BfS,ChS,EsS,KrS,LpS 03/19/1973 05/10/1973 178 Liman1973 KrS,ObR 03/20/1973 09/23/1973 18 Tiksi1973 LpS 05/04/1973 11/16/1973 109 Tiksi1974 LpS 12/14/1973 12/15/1974 119 DUGMS1974 KrS 01/08/1974 12/27/1974 62 SEVER26 ArB,BfS,ChS,EsS,KrS,LpS 03/11/1974 05/10/1974 166 NP22 ArB,BfS,ChS,EsS 03/23/1974 03/03/1982 117 DUGMS1975 KrS 01/04/1975 09/23/1975 145 Tiksi1975 LpS 01/15/1975 12/15/1975 55 SEVER27 ArB,BfS,ChS,EsS,GrS,KrS,LpS 03/13/1975 04/30/1975 188 DUGMS1976 KrS 01/07/1976 12/16/1977 312 AUGMS1976 KrS,ObR 02/24/1976 09/24/1976 249 SEVER28 ArB,BfS,ChS,EsS,GrS,KrS,LpS 03/11/1976 05/09/1976 155 NP23 ArB,EsS 05/30/1976 10/17/1978 83 SEVER29 ArB,BfS,ChS,EsS,KrS,LpS 03/01/1977 04/29/1977 150 AUGMS1977 KrS,ObR 03/03/1977 05/27/1977 101 WOD98_31_10614 BeS 03/31/1977 04/03/1977 16 VegaDUGMS1978 KrS 01/19/1978 12/22/1978 10 SEVER30 ArB,BaS,ChS,EsS,KrS,LpS 03/08/1978 05/10/1978 185 WOD98_31_13021 BfS 04/04/1978 07/29/1978 46 NP24 ArB 12/19/1978 09/30/1980 31 KrS 01/09/1979 11/21/1979 22 ArB,BaS,BfS,ChS,EsS,GrS,KrS,LpS 03/02/1979 05/19/1979 205 VegaDUGMS1979 SEVER31 WOD98_18_8924 BeS,ChS 04/19/1979 04/28/1979 8 VegaDUGMS1980 KrS 01/17/1980 09/26/1980 17 SEVER32 ArB,BaS,ChS,EsS,KrS,LpS 02/15/1980 05/15/1980 138 WOD98_31_10726 BfS 03/05/1980 07/02/1980 62 VegaDUGMS1981 KrS 01/06/1981 12/23/1981 32 DUGMS1981 KrS 03/17/1981 10/01/1981 344 SEVER33 ArB,ChS,EsS,KrS,LpS 03/18/1981 05/18/1981 112 VegaDUGMS1982 KrS 01/06/1982 12/29/1982 14 SEVER34 ArB,ChS,EsS,KrS,LpS 02/17/1982 05/19/1982 117 DUGMS1982 KrS 03/20/1982 05/07/1982 155 AUGMS1982 KrS 03/27/1982 06/07/1982 190 NP25 ArB 05/27/1982 03/11/1984 25 VegaDUGMS1983 KrS 01/05/1983 12/06/1983 20 SEVER35 ArB,ChS,EsS,KrS,LpS 02/25/1983 05/14/1983 235 DUGMS1983 KrS 03/22/1983 05/02/1983 67 NP26 ArB 07/01/1983 02/21/1986 35 VegaDUGMS1984 KrS 01/05/1984 11/26/1984 24 AUGMS1984 KrS 01/06/1984 12/24/1984 175 40 TUGKS1984 LpS 01/15/1984 12/27/1984 112 SEVER36 ArB,ChS,EsS,KrS,LpS 02/27/1984 05/13/1984 247 TUGMS1984 EsS,LpS 03/23/1984 05/22/1984 20 DUGMS1984 KrS 04/01/1984 05/18/1984 36 Pevek1984 EsS 04/10/1984 12/29/1984 37 NP27 ArB,EsS 06/26/1984 03/10/1987 35 TUGKS1985 EsS,LpS 01/03/1985 09/24/1985 213 VegaDUGMS1985 KrS 01/03/1985 12/24/1985 20 Pevek1985 EsS 01/10/1985 03/29/1985 17 SEVER37 ArB,ChS,EsS,KrS,LpS 02/25/1985 05/10/1985 296 TUGMS1985 EsS,LpS 03/21/1985 05/04/1985 39 WOD98_31_12556 BfS 04/01/1985 04/18/1985 7 DUGMS1985 KrS 04/02/1985 09/20/1985 209 AUGMS1985 KrS 04/05/1985 07/01/1985 38 VegaDUGMS1986 KrS 01/06/1986 12/26/1986 22 SEVER38 ArB,ChS,EsS,KrS,LpS 02/26/1986 06/06/1986 196 DUGMS1986 KrS 04/03/1986 08/24/1986 96 SEVER39 ArB,ChS,EsS,KrS,LpS 02/25/1987 06/08/1987 284 NP28 ArB,GrS 05/07/1987 01/17/1989 34 SEVER40 ArB,BeS,ChS,EsS,LpS 03/09/1988 05/19/1988 282 AUGE1988 HtR,LpS 05/06/1988 09/19/1988 100 SEVER41 ArB,BeS,ChS,EsS,LpS 02/27/1989 06/02/1989 262 NP31 ArB,BfS 06/29/1989 03/26/1990 10 SEVER42 BeS,ChS,EsS 01/19/1990 08/11/1990 150 SEVER43 KrS 04/25/1991 05/24/1991 20 SEVER44 ArB,BeS,ChS,EsS,LpS 02/27/1992 06/02/1992 206 SEVER45 BaS,KrS,WhS 04/08/1993 06/14/1993 180 CELTIC VOYAGER NoS 04/07/2007 04/07/2007 1 CLUPEA NoS 05/10/2007 05/12/2007 57 LLZG (G.O. SARS) NoS, BaS 02/07/2007 11/26/2009 350 HAKON MOSBY NoS, GrS 01/10/2007 12/05/2009 989 HERWIG, W. (JAN.73) NoS 02/07/2007 01/10/2007 14 ITP01 Bfs 01/01/2007 01/08/2007 32 ITP04 ArB 01/01/2007 05/31/2007 302 ITP05 ArB 01/01/2007 05/31/2007 453 ITP06 ArB 01/01/2007 05/31/2008 580 ITP07 ArB 04/28/2007 11/01/2007 134 LDGJ (JOHAN HJORT) BaS, GrS, NoS 01/15/2007 12/04/2009 1178 MAGNUS HEINASON (OW2252) NoS 02/15/2007 11/10/2008 364 Transarctica_2007 ArB, LpS, KrS 05/15/2007 05/31/2007 49 SCOTIA NoS 01/29/2007 02/14/2010 288 Tara ArB 01/13/2007 12/10/2007 35 Twin Otter ArB 04/21/2007 05/07/2007 10 CELTIC EXPLORER NoS 05/21/2008 05/21/2008 3 TRANSDRIFT XIII (Polynya) LpS 04/10/2008 05/05/2008 17 ITP08 ArB 01/01/2008 05/31/2008 303 ITP09 ArB 01/01/2008 02/27/2009 408 ITP10 ArB 01/01/2008 05/25/2008 293 41 709 710 711 712 713 ITP11 ArB 01/01/2008 05/31/2009 630 ITP13 ArB 01/01/2008 05/31/2008 317 ITP16 ArB 01/01/2008 04/03/2008 140 ITP18 BrS 01/01/2008 05/31/2008 317 ITP19 ArB, GrS 04/08/2008 11/21/2008 216 LAHV (JAN MAYEN) BaS 02/07/2008 03/06/2009 304 NP35 ArB 01/01/2008 12/31/2008 152 NPEO_2008 (Twin Otter) ArB, BfS 03/21/2008 04/20/2008 43 TRANSDRIFT XV (Polynya) LpS 03/24/2009 04/23/2009 15 HERWIG, W. (JAN.73) NoS 02/10/2009 02/15/2009 16 NP36 ArB 01/01/2009 12/31/2009 151 ITP21 ArB 01/01/2009 05/31/2009 288 ITP23 ArB 01/01/2009 05/31/2010 599 ITP24 ArB 01/01/2009 05/31/2009 299 ITP25 ArB 01/01/2009 05/31/2009 298 ITP26 ArB 01/01/2009 02/26/2009 114 ITP27 ArB 01/01/2009 01/20/2009 40 ITP29 ArB 01/01/2009 05/31/2010 589 ITP33 BfS, ArB 01/01/2010 01/25/2011 351 ITP34 BfS, ArB 01/01/2010 05/31/2010 298 ITP37 ArB 01/01/2010 12/24/2010 301 ITP38 ArB, GrS 04/19/2010 12/28/2010 170 NP37 ArB 01/01/2010 12/30/2010 112 NPEO_2010 (Hercules) BfS 05/25/2010 05/26/2010 4 NPEO_2011(Twin Otter) ArB 04/28/2011 05/08/2011 25 ITP41 ArB 01/01/2011 05/31/2012 607 ITP42 BfS, ArB 01/01/2011 04/15/2011 201 ITP43 BfS 01/01/2011 02/11/2011 83 ITP47 ArB 04/11/2011 02/28/2012 434 PALEX 2011 ArB 04/10/2011 04/20/2011 20 NP38 ArB 01/01/2011 11/01/2011 147 BARNEO2012 ArB 04/06/2012 04/17/2012 24 ITP48 ArB 01/01/2012 11/16/2012 446 ITP53 BfS 01/01/2012 05/31/2012 304 ITP55 ChS 01/01/2012 05/08/2012 257 ITP56 ArB, GrS 04/15/2012 12/31/2012 185 ITP63 ArB 04/21/2012 12/31/2012 161 NP39 ArB 01/01/2012 12/31/2012 143 SWITCHYARD2012 ArB, NrS 05/03/2012 05/21/2012 23 TRANSDRIFT XX LpS 03/26/2012 04/19/2012 7 All expeditions All regions 03/31/1950 12/31/2012 24557 Note: Conventional names of regions and water areas in column 2: ArB - Arctic Basin, BaS Barents Sea, BeS - Bering Sea, BfS - Beaufort Sea, ChS - Chukchi Sea, EsS - East Siberian Sea, GrS - Greenland Sea, HtR - Khatanga river mouth zone JpS - Japan Sea, KrS - Kara Sea, LpS - Laptev Sea, NoS – Norwegian Sea, NrS – Nares Strait, ObR - Ob estuary zone, WhS White Sea. 42 714 715 716 Figure A1.Observation density. The color bar indicates the last number of year in each decade. 43 717 718 The empirical equations for the first three principal components The equations are derived from a simple formula of multiple linear regressions: 719 yi = aij xij bi 720 where yi – the principal components PCi; xij– the independent variables of yi (the different 721 environmental factors), aij – regression coefficients, bi – intercept. To determine which 722 predictors to include in each regression model, we used “forward stepwise” method. 723 Calculations were made using “Multiple Linear Regression” toolbar of the STATISTICA 8.0 724 software package. 725 Each predictor leads the salinity EOF by some number of years, and these temporal lags were 726 determined by cross correlations. (A1) 727 The values of the correlation coefficients (R), coefficients of determination (R2) and 728 F-criteria (Hill and Lewicki, 2007) are shown in Table A2. The values of all F-criteria exceed 729 the threshold indicating that the variables used are statistically significant. The correlation 730 coefficients for all PCs were statistically significant and varied from 0.66 (R3) to 0.87 (R1). 731 732 733 734 735 736 737 738 739 740 741 44 742 Table A2. The empirical statistical model developed for each of the first three PCs. PCi PC1 Statistical Equations PC1 10.88 AMO (7) * 0.009 OWEC (1) 1.18 PDO (10) 8.6 Multiple Multiple Adjusted F- R R² R² criteria 0.87 0.76 0.74 48.48 (3;46)** PC2 PC2 1.12 AOVII IX (1) 0.98 ADVII IX (1) 0.73 PDO(6) 0.005 RIVLEC (4) 5.69 0.67 0.45 0.40 9.21 (4;45) PC3 PC3 0.85 DA IIII (1) 0.64 AO X-III (1) 0.6 PDO(4) 0.003 RIVKL (3) 6.39 0.66 0.43 0.38 8.62 (4;45) 743 * – time shift for every predictor is indicated in parentheses (minus means that predictor leads the dependent variable). 744 ** – numbers of degrees of freedom are indicated in parentheses. 45 745 746 747 Figure A2. Schematic of the conceptual statistical model. 46 748 749 Figure A3. Same as Figure 4, but for salinity averaged annually over the upper ten layers of 750 PIOMAS data for 1979-2005: a) mean salinity and (b-d) are respectively EOFs 1, 2, and 3 of 751 salinity. Figure Click here to download high resolution image Figure Click here to download high resolution image Figure Click here to download high resolution image Figure Click here to download high resolution image Figure Click here to download high resolution image Figure Click here to download high resolution image Figure Click here to download high resolution image Figure Click here to download high resolution image Figure Click here to download high resolution image
