Post-Earthquake Fire Assessment of Reinforced Concrete Frame Structures
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Structural Engineering International ISSN: (Print) (Online) Journal homepage: www.tandfonline.com/journals/tsei20 Post-Earthquake Fire Assessment of Reinforced Concrete Frame Structures Hugo Vitorino(PhD Student), Paulo Vila Real(Prof.), Carlos Couto(Dr, Research Assistant) & Hugo Rodrigues(Assoc. Prof.) To cite this article: Hugo Vitorino(PhD Student), Paulo Vila Real(Prof.), Carlos Couto(Dr, Research Assistant) & Hugo Rodrigues(Assoc. Prof.) (2023) Post-Earthquake Fire Assessment of Reinforced Concrete Frame Structures, Structural Engineering International, 33:4, 596-610, DOI: 10.1080/10168664.2022.2062084 To link to this article: https://doi.org/10.1080/10168664.2022.2062084 Published online: 25 May 2022. Submit your article to this journal Article views: 484 View related articles View Crossmark data Citing articles: 1 View citing articles Full Terms & Conditions of access and use can be found at https://www.tandfonline.com/action/journalInformation?journalCode=tsei20 Post-Earthquake Fire Assessment of Reinforced Concrete Frame Structures Hugo Vitorino , PhD Student; Paulo Vila Real , Prof.; Carlos Couto , Dr, Research Assistant; Hugo Rodrigues , Assoc. Prof., RISCO, Department of Civil Engineering, University of Aveiro, Portugal. Contact: hugo.vitorino@ua.pt. DOI: 10.1080/10168664.2022.2062084 Abstract Earthquakes can cause several catastrophic events and the consequences of fires in urban areas can be even worse than the consequences of the earthquake itself. Several numerical models were developed with SAFIR— software that models the behaviour of structures subject to fire for reinforced concrete (RC) frames to study their post-earthquake fire behaviour. First, a calibration was performed to validate the modelling strategy. Subsequently, two different frame typologies were considered, and a parametric study was carried out considering as the main variables the location and configuration of the damage caused by the earthquake and the location of the fire within the structure. The results show that the damaged RC frames have a lower fire resistance when compared with the undamaged frames. It was observed that the difference in time until collapse between an undamaged frame and a heavily damaged frame can be higher than 2 h. This observation is particularly relevant since, after a large earthquake, the rescue teams are generally overloaded, and consequently the response times are higher than that. This, combined with the reduction of the fire resistance of the reinforced concrete elements caused by the earthquake, can lead to increased severity and ultimately to the losses. Keywords: post-earthquake fire; fire safety; fire resistance; reinforced concrete; numerical analysis Introduction Post-earthquake fires are events with high consequences for societies where the damage caused by the fire can be more severe than the damage caused by the earthquake itself. There are examples of major earthquakes that caused several ignitions leading to fires, namely to conflagrations. The 1906 San Francisco and the 1923 Kanto earthquakes had several outbreaks of fire that evolved into conflagrations. In the 1993 Hokkaido Nansei-oki earthquake, the town of Aonae was destroyed by conflagration following the earthquake and a tsunami.1 Damage from post-earthquake fires may become extensive due to the limited availability of firefighting resources in a case where multiple fires can occur almost simultaneously, and the arrival of firefighters is hampered by the blockage of streets from collapsed buildings.1,2 The major causes of post-earthquake fires are primarily electrical or gas related, but can also be related to open flames, hot surfaces, exothermic 596 Scientific Paper chemical reactions from spilled chemicals and fires lit intentionally.1– 3 Electrical causes are increasing proportionally in comparison with earlier earthquakes.2 It is not possible to eliminate all fire outbreaks after an earthquake, but it is possible to reduce the risk of these if some preventive measures are applied.1 For example, the installation of earthquake shut-off valves in building gas metres is a solution that decreases the amount of gas inside a building after an earthquake.4,5 The structural and non-structural damage caused by earthquakes in buildings can lead to the loss of integrity of passive protection systems. Passive protection systems can be damaged by cracking, buckling or breaking, which can lead to openings that can permit the increased ventilation of compartment fires.1 After an earthquake, active fire protection systems, such as detection, alarm and suppression systems, may be malfunctioning, thus becoming unreliable. This aspect can lead to undetected ignitions that can cause large fires which will be more difficult to extinguish.1,3 The responses to building fires are a combination of active and passive fire protection systems and manual firefighting by a fire brigade. It is necessary to have adequate water supplies to be able to stop the spread of fire, but urban underground water distribution systems are very vulnerable to earthquake shaking, and failures are expected after an even moderate earthquake.1,4 The response of fire brigades can be impaired owing to reporting delays caused by failure in communication systems, impassable routes or traffic jams.1,3 All these factors combined, failure of passive and active fire protection systems, delays in response of fire brigades and reduced or exhausted water supplies will lower the possibilities of immediate fire extinguishment. Consequently, bigger fires and even conflagrations can occur that can ultimately lead to the loss of structures and lives. There are some numerical works that study post-earthquake fires in structures. Some of these works use a sequential analysis method for considering the effect of both earthquake and fire on a structure. This method has three loading stages, the first one is the application of gravity loads, which are assumed to be static and uniform, followed by a pseudo earthquake load in a pushover style or nonlinear time history analysis, and in the end, a fire load is applied to the structure.6–10 The results of these works for reinforced concrete (RC) structures show that structures that have suffered significant damage from earthquakes have lower fire resistance than undamaged structures, which indicates the huge impact of damage to the fire resistance of structures.8 Some studies have observed that the fire resistance rating, when whole frames are exposed to fire, is very similar to the situation when only the beams are exposed to fire, suggesting that the fire resistance of the frames is mainly dependent on the resistance of the beams.9,10 Structural Engineering International Nr. 4/2023 Research on the post-earthquake fire behaviour of structures is limited,11– 13 especially regarding the experimental investigation of post-earthquake fire in RC structures. Nevertheless, there are a few studies on the postearthquake fire behaviour of RC columns and frames. To study the fire behaviour of concrete columns with prior damage, eight RC specimens were subjected to cyclic loadings at room temperature.14 The damaged specimens and one control specimen without damage were then tested considering the ISO 834 fire curve. The experimental work showed that, when compared with the drift ratio, the axial load ratio had a more significantly adverse effect on the spalling of the column’s concrete cover during the cyclic loading test.14 The severe loss of the concrete cover in the plastic hinge region of the columns resulted in faster heat penetration into the inner concrete in this region during the subsequent fire test.14 It was found that, the more severe the damage in the columns, the less was the maximum elongation of the column in fire and the higher the axial load ratio, as well as the less was the maximum thermal elongation in the damaged column. The authors also observed that the influence of the volumetric transverse reinforcement ratio on the axial deformation of damaged columns was insignificant.14 There are also studies regarding the performance of RC frames to post-earthquake fire.15–19 The observations of a single storey RC frame that was subjected to seismic damage and subsequently to fire showed that the position of the opening in the compartment and the resulting movement of the fire plume and hot gases had a considerable influence on the temperature evolution in the structural sections.15 Consequently, the location of the fire may or may not overlap with the locations of the damage resulting from the seismic action.15 In this study, it was also reported that the temperature distribution throughout the compartment was non-uniform due to the highly varying surface fluxes imposed by the fire, which shows that consideration of a uniform compartment temperature in fully developed fires may not be a very accurate representation.15–17,19 The tests conducted in Ref. [16] showed the vulnerability of thin elements (e.g. slabs and shells) of non–ductile RC frames to spalling in post-earthquake fire events. The brick infill walls provided insulation to the RC structural elements, which led to a slow transmission of heat to these elements. This is a beneficial influence of masonry walls that should be considered when designing columns and beams that are integrated in masonry walls.16 In addition, it was observed that higher levels of the cyclic loading on the RC frame induced wider cracks which led to the development of higher temperatures in the structural elements of the frame.17,19 The cracks that appeared in the different elements during the tests suggest that the details of the steel reinforcement may have critical implications for the global behaviour of the structure when exposed to fire.17,19 The experimental test demonstrated a better performance of the RC frames with ductile detailing because the recommendations that are generally used for seismic design have a key role in increasing the fire resistance of the structure.15,19 The strength and stiffness degradation that occur at different levels of seismic demand are important aspects for understandong the post-earthquake fire response of structures. Some studies focused on the nonlinear modelling of the strength and stiffness degradation to obtain a comprehensive assessment of a structural system.20 There are also studies that analysed the common occurrence of fires in base-isolated structures following a seismic event.21 The increasing application of base-isolated techniques to provide seismic protection need to be complemented with studies regarding the effectiveness of those techniques not only with respect to seismic behaviour but also with respect to fire behaviour.21 It is important to have information regarding the degradation of mechanical properties during a fire for an understanding of the seismic performance of an isolated structure due to the possibility of aftershocks.21 Post-earthquake fire is a multifaceted phenomenon, where the behaviour of structures can depend on many aspects, some of them perhaps not immediately identified at first hand. It is important to have a comprehensive Structural Engineering International Nr. 4/2023 view when analysing this phenomenon because there are factors, such as the ones mentioned previously, that can significantly affect the safety of the structures in a post-earthquake fire scenario. Simplified Methodology for Post-Earthquake Fire Assessment of RC Frames Numerical Modelling Assumptions The software SAFIR22,23 was used to develop the numerical models for investigating post-earthquake fire on RC frames. SAFIR can perform the analysis of structures at elevated temperatures and under ambient temperature, as the thermal and mechanical analyses are calculated separately and consecutively. The temperature distribution deeply influences the mechanical response.22,23 The concrete and steel models defined in SAFIR are based on the constitutive models defined in EN 1992-1-2.24 The parameters for the concrete model that are input are of the aggregate type (e.g. siliceous or calcareous), the Poisson ratio and the compressive and tensile strengths. Transient creep can be treated implicitly or explicitly in the model. The implicit formulation corresponds to the Eurocode model, while the explicit formulation is a refinement of the Eurocode model but is also able to consider the nonreversibility of transient creep strain when the stress and/or temperature is decreasing.25,26 The beam finite element was used in the mechanical FEM simulations. The beam finite element is straight in its undeformed geometry. The position of the beam is defined by three nodes, two end nodes and a third node that defines the position of the local y-axis of the beam. The geometry of the cross section is defined by a fibre model. Each fibre can be of a different material, which allows the creation of reinforced concrete sections. Some assumptions are considered in the beam element: the cross section remains plane under bending moments, yielding is only considered in the longitudinal direction of the member, and non-uniform torsion is considered.23,27 The temperature distribution in the cross section of the elements is obtained using a 2D analysis. SAFIR uses linear isoparametric Scientific Paper 597 finite elements with classical shape functions to represent the geometry and the temperature field in the element, based on the temperature at the nodes. Heat transfer by conduction according to the Fourier law is considered in the material. The temperature field between adjacent elements does not have a discontinuity. The temperature changes linearly on all the borders of the elements and the temperature at a common border is the same in both elements.25 The constitutive relationships are based on the strain decomposition model of Eq. (1):27 etot = eth + es + etr + ei (1) with etot the total strain, obtained from spatial derivatives of the displacement field; eth the thermal elongation, dependent only on the temperature; es the stress related strain, which contains the elastic and plastic part of the strain; etr the transient creep, a term that appears in concrete during first heating under load; and ei is an initial strain that can be used either for initial prestressing or for the strain that exists in in situ concrete when it hardens at a moment when loads already exist in the structure.27 The models considered in the analyses are SILCON_ETC for the concrete and STEELEC2EN for the reinforcing steel. The SILCON_ETC model represents normal strength concrete, with siliceous aggregates based on the laws of part 1–2 of Eurocode 224 and with explicit transient creep. STEELEC2EN corresponds to reinforcing carbon steel from EN 1992-1-2.22,24 The numerical modelling strategy consists in the development of several beam and column cross sections with different simulated seismic damage and fire exposure, which are then considered in different frame configurations. The times until collapse of the frames are compared to ascertain the most severe fire and damage scenarios. A scheme of the modelling strategy is presented in Fig. 1. Seismic Damage To consider seismic damage, the first step is the definition of the cross sections considering both the original (undamaged) and the seismic damage situations. To simulate the damage induced by an earthquake, a reduction of the cover of the RC elements was considered. Three damage types were considered, the damage type D0/D1 corresponds to an intact section (D0) or a section with minor cracks (D1), damage D2 corresponds to slight damage with some concrete spalling, related to the loss of concrete cover and simulated by the removal of exterior fibres (50% of the cover section) and damage D3 corresponds the severe damage in the elements, with large concrete spalling, simulated Fig. 1: Scheme of the modelling strategy: (a) sections with simulated seismic damage; (b) fire frontiers in the damaged sections; and (c) different frame configurations 598 Scientific Paper by the removal of the entire concrete cover, leaving the longitudinal steel reinforcement exposed. The same numerical model was considered for damage D0 and D1 since, according to the literature, small cracks do not significantly influence thermal evolution through concrete.28,29 The extent of the types of damage considered in this numerical study was obtained from the definitions of damage states presented in FEMA 356.30 It was considered that damage D0/D1, D2 and D3 correspond to Immediate Occupancy (IO), Life Safety (LS) and Collapse Prevention (CP), respectively. At the IO level, minor damage in the structural elements is observed; at the LS level, extensive damage is observed to beams, spalling of cover and shear cracking of ductile columns; and at the CP level, extensive spalling in columns and beams is observed.9,30,31 At the section level, the damage was assumed to be different between the columns and the beams. In the columns, the damage was considered to affect all sides of the cross section, while in the case of beams, damage was only considered on the bottom and sides since it was assumed that the earthquake did not damage the top side of beams and that there was no detachment of concrete. Figure 2 represents the sections of the columns and beams with damage of types D0/D1, D2 and D3. The damage that an RC element (beam or column) suffers after an earthquake is usually located near the extremities of the elements. The observed length of that damage is usually between 0.5H and 1.5H, where H is the height of the section.10 In all the frames that were Fig. 2: Sections of the columns and beams with damage D0/D1 (40 mm cover), D2 (20 mm cover) and D3 (no cover) Structural Engineering International Nr. 4/2023 modelled in this study, the length of the damage considered was H. Fire Action The fire curve considered in the thermal analyses was the standard fire curve of ISO 834.32 SAFIR then calculates the temperature evolution as a function of time, which is then used as input data in the subsequent step to perform the mechanical analysis. In the mechanical analysis, the structural behaviour is calculated based on the geometry, support conditions, loads and strength of the materials. The temperature increase reduces the strength of the materials and leads to thermal elongation that causes an increase in the displacements until the collapse of the structure. In SAFIR, the numerical analysis will stop at the time specified by the user (240 min), or if it finds numerical problems at the material level, or when it cannot converge to a state of equilibrium.27,33 The standard fire curve of ISO 834 is the most common fire curve considered in the numerical and experimental work found in the literature. Modelling Strategy Validation Introduction To evaluate the effectiveness of the modelling strategy, it was deemed necessary to develop a numerical model representative of an experimental work. The experimental work under consideration is the post-earthquake fire assessment of an RC column.34,35 The experimental study consisted in the testing of six columns under post-earthquake fire conditions. In the study, ductile and non-ductile columns were tested at different levels of earthquake damage and axial load ratio. The square columns had a section of 23 cm and a length of 180 cm. The columns had four longitudinal steel bars with a diameter of 12 mm. The columns in the experimental study also had transversal reinforcement, which was not considered in the numerical simulations, following the usual strategy found in the literature for similar studies. The clear cover of the RC section was 25 mm, the grade of the reinforcement steel was S500 and the specimens were cast with an M25 concrete mix. Additional details can be found in Refs. [34,35]. Experimental Loading Sequence The experimental procedure to test the post-earthquake fire response of the RC columns consisted of the following steps:34,35 (i) the column was loaded statically in pure compression up to the desired load level and the load was maintained for at least 45 min before the application of cyclic loading; (ii) the axial load was maintained at a constant level, and the lateral cyclic loading was applied up to the desired maximum drift level; (iii) after damaging the column to the required level of maximum drift, the lateral and axial loads on the column were slowly removed. Subsequently, the column was removed from the earthquake loading setup and placed in the compression testing machine for a load-bearing test under fire conditions; (iv) the damaged portion of the column was subjected to the fire curve of ISO 834 for a one-hour duration without loading the column mechanically; and finally (v) after one hour of heating, the column was loaded in axial compression until it failed. The loading was applied under displacement controlled at a constant rate of 2 mm/min. The temperature change during step (v) was small, and therefore it could be closely tested under adiabatic conditions34,35 in the numerical simulations. Numerical Analysis Considerations Three numerical models representative of the experimental tests were defined in SAFIR. The experimental details of the specimens considered in the numerical analysis are presented in Table 1. The important details considered for the numerical analysis were the information relating to the spalled concrete. The time–temperature curve considered in the numerical analysis is represented in Fig. 3. For the first hour, the fire curve is the same as the fire of ISO 834 and after one hour the temperature remains constant until the end of the numerical analysis. The properties of the concrete and reinforcing steel considered in the numerical analysis are represented in Tables 2 and 3, respectively. In Fig. 4 are represented three different cross sections that were defined in SAFIR to simulate the three different damage situations (spalled concrete) caused by the cyclic loading. The reinforcing steel is represented in grey. Figure 4a corresponds to the intact section (cross-section a), Fig. 4b corresponds to a section with a cover reduction of 20 mm (cross-section b) and Fig. 4c corresponds to a section with a cover reduction of 15 mm (cross-section c). With these sections it is then possible to model the columns that are represented in Fig. 5. Figure 5a corresponds to the specimen ND-E0-A0 where all the elements of the column have crosssection a. Figure 5b corresponds to the specimen ND-E6-A350 where element three has cross-section b and the remaining elements have crosssection a. Finally, Fig. 5c corresponds to the specimen D-E6-A350 where element 3 has cross-section c and the remaining elements have a crosssection a. The reduction of the cover considered in the cross sections (Fig. 4) and the length of the elements of the columns (Fig. 5) are based on observations regarding the spalled concrete in the experimental tests. The information related to the Spalled concrete Axial load capacity after fire at max. load (kN) Ductile detailing Earthquake damage (drift %) Axial load (kN) Length (mm) Depth (mm) ND-E0A0 No 0 0 0 0 1110 ND-E6A350 No 6 350 150 20 709.8 D-E6A350 Yes 6 350 120 15 1108 Specimen Table 1: Specimen details, concrete spalled during the earthquake and load resistance after one-hour fire34,35 Structural Engineering International Nr. 4/2023 Scientific Paper 599 numerical analysis at 6 mm of deformation is around 1300 kN. Reinforcing steel properties24,36 Steel model Fig. 3: Time–temperature curve considered in the numerical analysis Modulus of elasticity 210 GPa Yield strength 550 MPa Poisson ratio 0.3 Coefficient of convection 25 W/m2K Emissivity Concrete properties Reinforcing steel diameter 24 Concrete model Siliceous aggregates24 Specific mass of concrete 2464 kg/m3 Water content 36.96 kg/m3 Coefficient of convection 25 W/m2K Emissivity 0.7 Compression strength 40 MPa Tensile strength 0 Poisson ratio 0.2 Table 2: Concrete properties used in the numerical analysis spalled concrete is presented in Table 1. In the numerical analysis, the fire curve is applied at the beginning of the analysis (t = 0) and after one hour an incremental axial compression load is applied until the analysis stops. Only the elements 2, 3 and 4 are subjected to the fire curve, the temperature of the remaining elements remains constant at 20°C. This consideration is based on the figures presented in the experimental study.34,35 Hot rolled, class B24,36 0.7 12 mm Table 3: Reinforcing steel properties used in the numerical analysis Axial Compression Response of the Columns The comparison between the experimental and numerical axial compression response of the RC columns is represented in Figs. 6–8. Although the peak values of the numerical analysis are different from those observed experimentally, there is a relatively good similarity between the experimental and the numerical results regarding the stiffness of the column. For the specimen ND-E0-A0 in Fig. 6, the results are similar until a deformation of about 1 mm, after which a higher stiffness of the experimental columns is observed when compared with the numerical columns until a deformation of about 3.5 mm. The failure of the experimental RC column is observed after a deformation of 6 mm while the numerical analysis stops with a deformation of almost 7 mm. The peak axial load capacity after fire, observed in the experimental results, is 1110 kN and the axial load observed in the Fig. 4: Column cross-section discretization: (a) intact section (ND-E0-A0); (b) section with 20 mm depth of spalled concrete (ND-E6-A350); and (c) section with 15 mm depth of spalled concrete (D-E6-A350) 600 Scientific Paper In Fig. 7 is represented a comparison between the experimental and numerical results for the specimen ND-E6A350. The results are very similar regarding the stiffness of the column. The numerical results show a slightly higher axial load capacity of 766 kN and lower deformation (5.4 mm) when compared with the experimental results of 709.8 kN and around 7 mm. Finally, in Fig. 8 is represented a comparison between the experimental and numerical results for the specimen D-E6-A350. The results are very similar until an axial load capacity after fire of around 400 kN, after which the numerical results indicate a higher stiffness of the columns when compared with the results of the experimental columns. The peak axial load capacity after fire of the experimental columns is 1108 kN while in numerical columns it is around 900 kN. In the experimental test, it was observed that the columns that were not detailed for ductile behaviour, with higher confinements, showed a more significant reduction in axial load carrying capacity in fire conditions as reported by the authors.35 In the modelling strategy, the confinement reinforcement is not considered. This aspect could explain the differences observed at the end of the numerical results, especially on specimens ND-E6-A350 and ND-E0-A0, which do not include ductile detailing. Another important issue is that in the experimental tests the axial load is applied after one hour of heating; however, the temperature in the postheating is not reported and was considered constant in the numerical analysis, which may lead to an overestimation of the results as observed. The similarity between the experimental and numerical results indicates a reliable approach to simulating the damage observed in the RC columns. Nevertheless, it is necessary to perform more calibration studies on other RC elements to ascertain the reliability of this methodology better. Certain characteristics of the numerical model, e.g. the fire curve considered in the thermal analysis and the properties of the materials, need to be well analysed to guarantee that the considerations of the numerical model are according to what was performed in the experimental tests. Structural Engineering International Nr. 4/2023 Concrete properties24 Siliceous aggregates24 Concrete model Fig. 5: Column discretization: (a) specimen ND-E0-A0; (b) specimen ND-E6-A350; and (c) specimen D-E6-A350 Specific mass of concrete 2300 kg/m3 Water content 46 kg/m3 Coefficient of convection 25 W/m2K Emissivity 0.7 Compression strength 30 MPa Tensile strength 0 Poisson ratio 0.2 Table 4: Concrete properties used in the numerical analysis Reinforcing steel properties24,36 Steel model Fig. 6: Comparison between the experimental and numerical results for the specimen ND-E0-A0 Fig. 8: Comparison between the experimental and numerical results for the specimen D-E6-A350 Hot rolled, class B24,36 Modulus of elasticity 210 GPa Yield strength 500 MPa Poisson ratio 0.3 Coefficient of convection 25 W/m2K Emissivity Reinforcing steel diameter 0.7 25 mm Table 5: Reinforcing steel properties used in the numerical analysis Temperature Evolution at the Section Level Fig. 7: Comparison between the experimental and numerical results for the specimen ND-E6-A350 Post-Earthquake Fire Assessment in RC Frames In this section, two different frames are analysed (a one-bay/two-storey plane frame, and a two-bay/threestorey plane frame). For each frame, several configurations are considered regarding the type and location of the damage and the location of the fire. The main objective of the analyses is to compare the times until collapse of the different frames and identify the Fig. 9: Section of the columns (8Ø25) and section of the beams (4Ø25) scenario that leads to a lower time until collapse. The comparison of the times until collapse also allows the evaluation of the impact of different types of damage in the post-earthquake fire resistance of the RC frames. Section Properties and Characteristics In Fig. 9 is represented the section of the columns and the section of the beams. In Tables 4 and 5 are described all the properties used in the numerical analyses of the RC frames. Structural Engineering International Nr. 4/2023 In this section are presented the temperature profiles of the columns and beams used later in the analyses of the RC frames. The size of each fibre in the sections of the columns and beams is 1 cm × 1 cm. The temperature profiles for damage D0/D1, D2 and D3 are presented for the columns and beams. Each figure has four temperature profiles, corresponding to 1, 2, 3 and 4 h (from left to right). Each reinforcing steel bar is constituted by four fibres and the contour of the reinforcement is represented with a blue line. Figures 10–12 represent the temperature profiles of columns with damage D0/D1, D2 and D3 considering the curve of ISO 834, and Figs. 13–15 represent the temperature profiles of beams with damage D0/D1, D2 and D3 considering the curve of ISO 834 Scientific Paper 601 Fig. 10: Temperature profiles of a column with damage D0/D1 at 60, 120, 180 and 240 min (left to right) considering the curve of ISO 834 it takes around 60 min for the middle reinforcement to reach the same temperature. The effect of the damage also has a significant impact on the temperature of the reinforcement; for instance at 90 min, the temperature of the corner reinforcement on the section with damage D3 is about double the temperature of the corner reinforcement in the section with damage D0/D1. This aspect shows the significant influence that the damage and the position of the reinforcement have on the temperature of the reinforcement. In the beams, the steel reinforcement in the bottom has higher temperatures when compared with the top reinforcement. The explanation of this is the fact that there is no damage and no fire frontiers considered on the top side of the beam. One-Bay/Two-Storey Plane Frame Introduction Fig. 11: Temperature profiles of a column with damage D2 at 60, 120, 180 and 240 min (left to right) considering the curve of ISO 834 Fig. 12: Temperature profiles of a column with damage D3 at 60, 120, 180 and 240 min (left to right) considering the curve of ISO 834 To understand the post-earthquake fire in RC structures better, a numerical model was developed of 15 plane frames with one bay and two storeys. A parametric study was defined with different assumptions regarding the type of damage, location of the damage and location of the fire. The numerical simulations were calculated using a 2D model. The frame has a permanent load distributed in the beams (45 kN/m) and point loads in the columns (370 kN). The applied vertical loads were defined to have columns with an axial load ratio lower than 0.2. Figure 20 represents a scheme of the frame considered in the parametric study. Figure 21 represents the location of the overall damage that is assumed and the definition of the compartments, namely compartment 1 (C1) and compartment 2 (C2). Frames Characteristics on three sides. The impact of the cover reduction on the temperatures of the steel reinforcement is clear in the temperature profiles. reinforcement of the columns, while Figs. 18 and 19 show the temperature evolution of the steel reinforcement of the beams. With the development of the temperature profiles of the columns and beams is possible to analyse the temperature evolution of the steel reinforcement considering all types of damage. Figures 16 and 17 show the temperature evolution of the steel In the columns, the temperature of the corner reinforcement is higher when compared with the temperature of the middle reinforcement. For example, considering damage D3, while it takes 30 min for the corner reinforcement to reach about 750˚C, 602 Scientific Paper The parametric study comprises six different configurations that were considered to evaluate the impact of the damage location and the fire on the time until collapse of the one-bay/ two-storey frames. In the first configuration (frames 1, 2 and 3), only damage and fire in compartment 1 were considered. In the second configuration (frames 4 and 5), damage in both compartments and fire only in compartment 1 were considered. In the third Structural Engineering International Nr. 4/2023 compared with the frames with damage D0/D1 (frame without damage) that were already presented in the first, third and fifth configurations, respectively. The difference between the various frames with damage D0/D1 is then only related to the location of the fire in the compartments. Thus, there are three frames with damage D0/D1, frame 1 in the first and second configuration, frame 6 in the third and fourth configuration, and finally frame 11 in the fifth and sixth configuration. Fig. 13: Temperature profiles of a beam with damage D0/D1 at 60, 120, 180 and 240 min (left to right) considering the curve of ISO 834 on three sides Fig. 14: Temperature profiles of a beam with damage D2 at 60, 120, 180 and 240 min (left to right) considering the curve of ISO 834 on three sides configuration (frames 6, 7 and 8), damage in compartment 1 and fire in both compartments were considered. In the fourth configuration (frames 9 and 10), damage and fire in both compartments were considered. In the fifth configuration (frames 11, 12 and 13), damage in both compartments and fire in compartment 2 were considered. Finally, in the sixth configuration (frames 14 and 15), damage in compartment 1 and fire in compartment 2 were considered. For all the frame configurations, all the levels of damage were analysed, resulting in a total of 15 different models investigated. Figure 22 represents the frame configurations considered. Time Until Collapse Table 6 and Fig. 23 represent the times until collapse of one-bay/two-storey plane frames. For the sake of comparison, it is important to mention that in Fig. 23, for the second, fourth and sixth configurations, the frames with damage D2 and D3 are again Structural Engineering International Nr. 4/2023 The difference in the time until collapse between frame 1 (damage D0/ D1) and frame 3 (damage D3) is more than 2 h. This aspect shows the great influence that the damage has in the time until the collapse of the structure. The difference in the time until collapse between frame 1 (damage D0/D1) and frame 2 (damage D2) is more than 1 h, and the same is also true between frame 2 (damage D2) and frame 3 (damage D3). The damage D2 also has a significant impact on the time until collapse of the structure. The results are quite similar for the first configuration until the fifth configuration (frame 1 to frame 13), which seems to indicate that, if there is damage and fire in the same compartment, the fact that there is damage and/or fire in the other compartment does not have a significant impact on the time until the collapse of the structure. The exception is in the sixth configuration (frames 11, 14 and 15), where the damage and fire are in different compartments. Because of that, it is observed that the damage in these frames does not have a significant impact on the time until collapse of the structure. As such, it should be highlighted that the extent of damage in a compartment that is not exposed to fire does not significantly contribute to the overall time until collapse of the frame. For the same assumptions regarding the levels of damage, the different configurations (configuration 1 to configuration 5) have similar times until collapse. Frame 1 and frame 8 are, respectively, the ones with maximum and minimum times until collapse. The location of the damage and fire for frame 1 is in compartment 1, but the damage is assumed to be D0/D1, which corresponds to the undamaged case. Frame 8 represents the case that was considered the most severe Scientific Paper 603 damage (Damage D3) with both the fire and location of the damage in the same compartment (compartment 1). In this regard, it is however interesting to note that frame 8 has lower fire resistance than frame 10, despite the damage in frame 10 being assumed to be in both compartments. Although small, this difference may be related to the fact that frame 8 has a higher stiffness than frame 10, which leads to slightly higher forces that in turn lead to a faster collapse. Two-Bay/Three-Storey Plane Frame Introduction Fig. 15: Temperature profiles of a beam with damage D3 at 60, 120, 180 and 240 min (left to right) considering the curve of ISO 834 on three sides Following the analysis of the previously presented cases, it was deemed necessary to study a different frame typology corresponding to plane frames with two bays and three storeys to enlarge the parametric study on post-earthquake fire in RC structures. For this typology, 36 frames were defined with different assumptions regarding the type of damage, location of the damage and location of the fire. These numerical simulations were also developed using a 2D model and both the geometry of the cross sections and the loads considered for this new frame typology were identical to those considered in the previous case. Figure 24 represents a scheme of the frame typology considered in this case. In Fig. 25 is represented the location of the damage that is considered and the name of the compartments. Fig. 16: Temperature evolution of the column corner reinforcement Frame Characteristics Fig. 17: Temperature evolution of the column middle reinforcement Several configurations were considered to evaluate the impact of the location of the damage and the fire on the time until collapse of the twobay/three-storey frames. Six different configurations were considered regarding the location of the types of damage and six different configurations regarding the location of the fire. The configurations regarding the location of the types of damage (damage configurations) are represented in Fig. 26. The configurations regarding the location of the fire (fire configurations) are represented in Fig. 27. The numerical models were defined such that, for each fire configuration, all the damage configurations were considered, thus 604 Scientific Paper Structural Engineering International Nr. 4/2023 Fig. 18: Temperature evolution of the bottom reinforcement of a beam with three fire frontiers Figure 28 shows the results of the frames that are entirely subjected to damage D0/D1, D2 and D3 and for each damage configuration all the fire configurations are considered. Similarly to what was observed for the one-bay/two-storey frame, for this new typology, for each fire configuration, a difference is observed in the time until collapse of about 2 h between the frames with damage D0/ D1 and the frames with damage D3. This aspect emphasises the great influence that the damage has on the time until the collapse of the structure. The difference in the time until collapse between frames with damage D0/D1 and frames with damage D2 is around 1 h, and the same is also observed between the frames with damage D2 and the frames with damage D3. These differences are similar to those also observed for the one-bay/two-storey frame. From the frames considered, the highest time until collapse is 206.45 min (frame 410) and the lowest time until collapse is 43.28 min (frame 403). From the frames considered, frame 410 is the frame with the lowest amount of damage considered (damage D0/D1 in all compartments) and where the fire scenario is less severe (fire only in compartment C11). By contrast, frame 403 is the frame with the highest amount of damage considered (damage D3 in all compartments) and where the fire scenario is more severe (fire in all compartments). Fig. 19: Temperature evolution of the top reinforcement of a beam with three fire frontiers Fig. 21: Compartments and damage zones combining all the fire and all the damage configurations. Time Until Collapse Fig. 20: Scheme of the one-bay/two-storey plane frames considered in the numerical analyses Table 7, Fig. 28 and Fig. 29 represent the times until collapse of the frames (one-bay/two-storey plane frames). Structural Engineering International Nr. 4/2023 The results in Fig. 29 show a comparison between three different damage configurations. The frames with higher time until collapse, for each damage configuration, are the frames where fire is considered in both the bottom compartments (frames 421, 427 and 433). Although the time until collapse of these frames is the highest, it is very similar to the time until collapse of the frames where the fire is only considered in compartment C11 (frames 422, 428 and 434). Even if the differences are small, it is interesting to notice that the frames with fire in both bottom compartments have a better fire resistance when compared with the frames with fire in only one of the bottom compartments. A similar situation was also observed in the one-bay/two-storey plane frame. The small difference may be related to the fact that frames 421, 427 and 433, due to the fire, have lower stiffness Scientific Paper 605 Fig. 22: Frame configuration (fire and damage distribution) Damage Model Fire C1 C2 C1 C2 Time until collapse (min) 1 D0/D1 D0/D1 ISO834 – 188.35 2 D2 D0/D1 ISO834 – 117.25 3 D3 D0/D1 ISO834 – 45.61 4 D2 D2 ISO834 – 117.54 5 D3 D3 ISO834 – 45.62 6 D0/D1 D0/D1 ISO834 ISO834 173.3 7 D2 D0/D1 ISO834 ISO834 110.65 8 D3 D0/D1 ISO834 ISO834 40.98 9 D2 D2 ISO834 ISO834 114.39 10 D3 D3 ISO834 ISO834 44.42 11 D0/D1 D0/D1 – ISO834 176.54 12 D2 D2 – ISO834 121.93 13 D3 D3 – ISO834 48.71 14 D2 D0/D1 – ISO834 176.64 15 D3 D0/D1 – ISO834 176.5 Table 6: Time until collapse of the frames considered Fig. 23: Time until collapse of the frames 1 bay and 2 storeys 606 Scientific Paper Fig. 24: Scheme of the two-bay/three-storey plane frames considered in the numerical analyses Fig. 25: Compartments and damage zones than frames 422, 428 and 434, which leads to slightly lower forces that consequently leads to a slightly later collapse. The lower time until collapse of the frames that have damage D3 in the bottom compartments is 43.28 min (frame 403) and the higher time until collapse of those frames is 59.92 min (frame 427), which represents a relative difference of −38%. In this case, for the two-bay/three-storey plane frame, the types of damage and location of the fire considered in the structure can represent a significant impact on the time until collapse of the structure. Similarly, the lower time until collapse of the frames that have damage D2 in the bottom compartments is 103.67 min (frame 417) and the higher time until collapse of those frames is 123.67 min (frame 433), representing a relative difference of −19%. In this case, observing only the frames with damage D2 in the bottom compartment, the types of damage and location of the fire considered in the structure do not represent such a significant impact on Structural Engineering International Nr. 4/2023 damage on the fire resistance of RC structures. The development of these numerical investigations allowed the study of the impact of damage and fire in reinforced concrete frames (one-bay/ two-storey frames, and two-bay/threestorey frames). Fig. 26: Location of the types of damage in the configurations considered: damage D0/D1 (green); damage D2 (yellow); damage D3 (red) Fig. 27: Locations of fire in the configurations considered the time until collapse of the structure when compared with the frames that have damage D3 in the bottom compartments. Nevertheless, a difference is observed of 20 min in the time until collapse between these two frames (frames 417 and 433). In Fig. 29, when comparing the results of the two configurations with damage D3 in the bottom compartments, it is observed that the times until collapse are very similar. The difference in these configurations is in the damage considered in compartments C21 and C22 (damage D2 and D0/D1). The similar times until collapse of these frames seems to indicate that a slight variation in the damage considered in compartments C21 and C22 does not significantly impact the behaviour of the frame for more severe damage (damage D3) in the bottom compartments (compartments C11 and C12). It is interesting to notice that, in Fig. 29, for each damage configuration, the frame with lower time until collapse is never the frame with fire in all compartments. This remark indicates that more compartments on fire does not necessarily represent a lower time until collapse of the frame. Conclusions The present work starts with the evaluation of the effectiveness of the modelling strategy comparing results from an experimental test with the proposed simplified approach. The results obtained were relatively similar to those of the experimental study, showing that the modelling strategy can be used with a certain reliability to perform several numerical investigations regarding the impact of Structural Engineering International Nr. 4/2023 Comparison between the results of the parametric study of the various models allowed the observation that the damaged frames have a lower fire resistance than the undamaged frames, especially when the reinforcement is exposed to the fire. It was observed that the difference in the time until collapse of an undamaged frame (damaged D0/D1) and a heavily damaged frame (damage D3) can be higher than 2 h. In the one-bay/two-storey frames, it was observed that, if there is damage and fire in the same compartment, the fact that there is damage and/or fire in the other compartment does not significantly change the time until collapse of the frame. This aspect is not observed for the twobay/three-storey frames, where the difference in the time until collapse of frames with damage D2 and D3 in the bottom compartments (C11 and C12) can be significant when considering different fire and damage configurations, i.e. different configurations but with damage D2 and D3 in the bottom compartments, meaning that the frame geometry plays an important role in the postearthquake fire resistance. It was observed that the fire configuration where all the compartments are exposed to fire does not necessarily correspond to the worst possible situation regarding the time until collapse, and certain damage and fire configurations can result in lower times until collapse. Finally, it is important to mention that, as observed in this study, frames with different characteristics and properties can lead to different conclusions. In addition, it is necessary to confirm if the main findings of this article remain valid for the 3D behaviour of complete structures, since the methodology followed herein, in principle, should be valid for these conditions. It should be mentioned also that some studies point to the fact that 3D modelling to study the post earthquake fire and simulate the load Scientific Paper 607 Damage Fire Model C11/C12 C21/C22 C31/C32 C11 C12 C21 C22 C31 C32 Time (min) 401 D0/D1 D0/D1 D0/D1 ISO834 ISO834 ISO834 ISO834 ISO834 ISO834 167.42 402 D2 D2 D2 ISO834 ISO834 ISO834 ISO834 ISO834 ISO834 107.63 403 D3 D3 D3 ISO834 ISO834 ISO834 ISO834 ISO834 ISO834 43.28 404 D0/D1 D0/D1 D0/D1 ISO834 ISO834 ISO834 ISO834 – – 187.04 405 D2 D2 D2 ISO834 ISO834 ISO834 ISO834 – – 115.42 406 D3 D3 D3 ISO834 ISO834 ISO834 ISO834 – – 46.42 407 D0/D1 D0/D1 D0/D1 ISO834 ISO834 – – – – 206.33 408 D2 D2 D2 ISO834 ISO834 – – – – 123.08 409 D3 D3 D3 ISO834 ISO834 – – – – 59.42 410 D0/D1 D0/D1 D0/D1 ISO834 – – – – – 206.45 411 D2 D2 D2 ISO834 – – – – – 122.58 412 D3 D3 D3 ISO834 – – – – – 57.83 413 D0/D1 D0/D1 D0/D1 ISO834 – ISO834 – – – 187.5 414 D2 D2 D2 ISO834 – ISO834 – – – 114.19 415 D3 D3 D3 ISO834 – ISO834 – – – 45.92 416 D0/D1 D0/D1 D0/D1 ISO834 – ISO834 – ISO834 – 158.25 417 D2 D2 D2 ISO834 – ISO834 – ISO834 – 103.67 418 D3 D3 D3 ISO834 – ISO834 – ISO834 – 43.83 419 D3 D2 D0/D1 ISO834 ISO834 ISO834 ISO834 ISO834 ISO834 48.65 420 D3 D2 D0/D1 ISO834 ISO834 ISO834 ISO834 – – 47.50 421 D3 D2 D0/D1 ISO834 ISO834 – – – – 59.83 422 D3 D2 D0/D1 ISO834 – – – – – 58.67 423 D3 D2 D0/D1 ISO834 – ISO834 – – – 46.67 424 D3 D2 D0/D1 ISO834 – ISO834 – ISO834 – 48.17 425 D3 D0/D1 D0/D1 ISO834 ISO834 ISO834 ISO834 ISO834 ISO834 48.51 426 D3 D0/D1 D0/D1 ISO834 ISO834 ISO834 ISO834 – – 46.08 427 D3 D0/D1 D0/D1 ISO834 ISO834 – – – – 59.92 428 D3 D0/D1 D0/D1 ISO834 – – – – – 58.75 429 D3 D0/D1 D0/D1 ISO834 – ISO834 – – – 47.17 430 D3 D0/D1 D0/D1 ISO834 – ISO834 – ISO834 – 47.08 431 D2 D0/D1 D0/D1 ISO834 ISO834 ISO834 ISO834 ISO834 ISO834 114.50 432 D2 D0/D1 D0/D1 ISO834 ISO834 ISO834 ISO834 – – 106.58 433 D2 D0/D1 D0/D1 ISO834 ISO834 – – – – 123.67 434 D2 D0/D1 D0/D1 ISO834 – – – – – 123.01 435 D2 D0/D1 D0/D1 ISO834 – ISO834 – – – 113.67 436 D2 D0/D1 D0/D1 ISO834 – ISO834 – ISO834 – 113.58 Table 7: Time until collapse of the frames considered distribution between columns due to heating and, most importantly, benefit from the so-called tensile membrane 608 Scientific Paper action.37,38 For this reason, the study carried out in this work will be further extended to understand better and increase current knowledge of the post-earthquake fire phenomenon in reinforced concrete structures. 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