Publikációk és hivatkozások
Simon Károly
Letöltve a BME PA adatbázisból
Összesen 40 cikkre 251 független hivatkozás. Összegzett impact faktor: 20,297.
Legfontosabb publikációim számai az alábbi listában: 1,7,19,29,31
2012
1. A Manning, K Simon
Dimension of slices through the Sierpinski carpet.
TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY accepted: (2012)
IF: [1.100**]
Folyóiratcikk/Szakcikk/Tudományos
2011
2. J Komjáthy, K Simon
Generating scale free graphs from fractals.
CHAOS SOLITONS & FRACTALS 44: pp. 651-666. (2011)
IF: 1.267
3. F M Dekking, Károly Simon, Balázs Székely
The algebraic difference of two random Cantor sets: The Larsson family.
ANNALS OF PROBABILITY 39:(2) pp. 549-586. (2011)
IF: 1.470
2009
4. Móra Péter, Simon Károly, Boris Solomyak
The Lebesgue measure of the algebraic difference of two random Cantor sets.
INDAGATIONES MATHEMATICAE-NEW SERIES 20:(1) pp. 131-149. (2009)
IF: 0.157
Független idéző: 1 Összesen: 1
1 Dekking FM, Kuijvenhoven B
Differences of random Cantor sets and lower spectral radii
1
JOURNAL OF THE EUROPEAN MATHEMATICAL SOCIETY 13: (3) 733-760.
(2011)
2008
5. M Dekking, K Simon
On the size of the algebraic difference of two random Cantor sets.
RANDOM STRUCTURES & ALGORITHMS 32: pp. 205-222. (2008)
IF: 1.253,
2007
6. T Jordan, K Simon
Multifractal analysis for Birkhoff averages for some self-affine iterated function system.
DYNAMICAL SYSTEMS-AN INTERNATIONAL JOURNAL 22:(4) pp. 469-483. (2007)
IF: 0.568, www.math.bme.hu/~simonk/papers/multifractal35.pdf
Független idéző: 2 Összesen: 2
1 L Olsen
Random self-affine multifractal Sierpinski sponges in Rd
Monatshefte für Mathematik 162: (1) 89-117. (2011)
2 H W J Reeve
The packing spectrum for Birkhoff averages on a self-affine repeller
Ergodic Theory and Dynamical Systems published online: 1-27. (2011)
7. T Jordan, M Pollicott, K Simon
Hausdorff dimension for self affine randomly perturbed attractors.
COMMUNICATIONS IN MATHEMATICAL PHYSICS 270: pp. 519-544. (2007)
IF: 2.070,
Független idéző: 9 Összesen: 9
1 Kaenmaki A, Vilppolainen M
Dimension and measures on sub-self-affine sets
MONATSHEFTE FUR MATHEMATIK 161: (3) 271-293. (2010)
2 Falconer KJ
Generalized dimensions of measures on almost self-affine sets
NONLINEARITY 23: (5) 1047-1069. (2010)
3 Falconer K, Miao J
Random subsets of self-affine fractals
Mathematika 56: (1) 61-76. (2010)
4 Feng DJ, Hu HY
Dimension Theory of Iterated Function Systems
2
5
6
7
8
9
COMMUNICATIONS ON PURE AND APPLIED MATHEMATICS 62: (11)
1435-1500. (2009)
Kaenmaki A, Shmerkin P
Overlapping self-affine sets of Kakeya type
ERGODIC THEORY AND DYNAMICAL SYSTEMS 29: 941-965. (2009)
Neunhauserer J
A GENERAL RESULT ON ABSOLUTE CONTINUITY OF NON-UNIFORM
SELF-SIMILAR MEASURES ON THE REAL LINE
FRACTALS-COMPLEX GEOMETRY PATTERNS AND SCALING IN
NATURE AND SOCIETY 16: (4) 299-304. (2008)
KJ Falconer
Continuity of Subadditive Pressure for Self-Affine Sets
Real Analysis Exchange 34: (2) 413-428. (2008)
Falconer K, Miao J
Exceptional sets for self-affine fractals
MATHEMATICAL PROCEEDINGS OF THE CAMBRIDGE
PHILOSOPHICAL SOCIETY 145: 669-684. (2008)
I Benjamini, O Gurel-Gurevich B Solomyak
Branching random walk with exponentially decreasing steps, and stochastically
self-similar measures
Trans. Amer. Math. Soc. .
8. F Hofbauer, P Raith, K Simon
Hausdorff dimension for some hyperbolic attractors with overlaps and without finite
Markov partition.
ERGODIC THEORY AND DYNAMICAL SYSTEMS 27:(4) pp. 1143-1165. (2007)
IF: 0.645,
Független idéző: 1 Összesen: 1
1 Farm D, Persson T
Large intersection classes on fractals
NONLINEARITY 24: (4) 1291-1309. (2011)
9. A Manning, K Simon
Subadditive pressure for triangular maps.
NONLINEARITY 20:(1) pp. 133-149. (2007)
IF: 1.339,
Független idéző: 3 Összesen: 3
1 Barreira L, Gelfert K
Dimension estimates in smooth dynamics: a survey of recent results
ERGODIC THEORY AND DYNAMICAL SYSTEMS 31: 641-671. (2011)
2 Chen JY, Pesin Y
3
Dimension of non-conformal repellers: a survey
NONLINEARITY 23: (4) R93-R114. (2010)
3 B Bárány
Subadditive pressure for IFS with triangular maps.
Bull. Pol. Acad. Sci. Math. 57: (3-4) 263-278. (2009)
2006
10. Y Peres, K Simon, B Solomyak
Absolute continuity for random iterated function systems with overlaps.
JOURNAL OF THE LONDON MATHEMATICAL SOCIETY-SECOND SERIES 74:
pp. 739-756. (2006)
IF: 0.617,
Független idéző: 9 Összesen: 9
1 A Iosevich, M Mourgoglou, S Senger
On sets of directions determined by subsets of ℝd
Journal d'Analyse Mathématique 116: (1) 355-369. (2012)
2 Mantica G
Dynamical systems and numerical analysis: the study of measures generated by
uncountable IFS
NUMERICAL ALGORITHMS 55: (Verona, ITALY) 321-335. (2010)
3 Barany B, Persson T
The absolute continuity of the invariant measure of random iterated function
systems with overlaps
FUNDAMENTA MATHEMATICAE 210: (1) 47-62. (2010)
4 Ya V Goncharenko, M V Pratsyovytyĭ, G M Torbin
Fractal properties of some Bernoulli convolutions
Theory of Probability and Mathematical Statistics 79: 39-55. (2009)
5 Jordan Thomas, Pollicott Mark
The Hausdorff dimension of measures for iterated function systems which contract
on average.
Discrete and Continuous Dynamical Systems. Series A 22: (1-2) 235-246. (2008)
6 Theodosopoulos T, Boyer R
Periodic attractors of random truncator maps
PHYSICA A-STATISTICAL MECHANICS AND ITS APPLICATIONS 382:
(Turin, ITALY) 302-310. (2007)
7 V Bergelson, M Misiurewicz, S Senti
Affine actions of a free semigroup on the real line
Ergodic Theory Dynam. Systems 26: (5) 1285-1305. (2006)
8 T Holiday, A Goldsmith, P Glynn
Capacity of Finite State Channels Based on Lyapunov Exponents of Random
Matrices
4
IEEE Transactions on Information Theory 52: (8) 3509-3582. (2006)
9. T Holliday, P Glinn, A Goldsmith
Shannon Meets Lyapunov: Connections between Information Theory and
Dynamical Systems
In: Decision and Control, 2005. város?, ország? 2005.12.12-2005.12.15. (2005) ,
pp. 1756-1763.
2005 European Control Conference. CDCECC ?05. 44th IEEE Conference
Konferenciacikk
11. K Simon, B Solomyak
Visibility for self-similar sets of dimension one in the plane.
REAL ANALYSIS EXCHANGE 32:(1) pp. 67-78. (2006)
www.math.bme.hu/~simonk/papers/visib8.ps
Folyóiratcikk/Szakcikk/Tudományos
Source: PublEx
Független idéző: 2 Összesen: 2
1 K I Eroglu
On planar self-similar sets with a dense set of rotations
Annales Academiae Scientiarum Fennicae Mathematica 32: 409. (2007)
2 Csörnyei Marianna, Preiss David
Sets of finite $\scr H\sp 1$ measure that intersect positively many lines in infinitely
many points.
Annales Academiæ Scientiarium Fennicæ. Mathematica 32: (2) 545-548. (2007)
12. A H Fan, K Simon, H R Tóth
Contracting on average random IFS with repelling fixed point.
JOURNAL OF STATISTICAL PHYSICS 122: pp. 169-193. (2006)
IF: 1.437,
Független idéző: 3 Összesen: 3
1 Barany B, Persson T
The absolute continuity of the invariant measure of random iterated function
systems with overlaps
FUNDAMENTA MATHEMATICAE 210: (1) 47-62. (2010)
2 Jaroszewska J, Rams M
On the Hausdorff dimension of invariant measures of weakly contracting on
average measurable IFS
JOURNAL OF STATISTICAL PHYSICS 132: (5) 907-919. (2008)
3 Jordan T, Pollicott M
The Hausdorff dimension of measures for iterated function systems which contract
on average
DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS 22: (Lisbon,
PORTUGAL) 235-246. (2008)
5
2004
13. K Simon, H R Tóth
The absolute continuity of the distribution of random sums with digits {0; 1;...;m-1}.
REAL ANALYSIS EXCHANGE 30:(1) pp. 397-409. (2004)
Független idéző: 2 Összesen: 2
1 P Smerkin
Overlapping self-affine sets
Indiana Univ. Math. J 55: (4) 1291-1331. (2006)
2 I Benjamini, O Gurel-Gurevich B Solomyak
Branching random walk with exponentially decreasing steps, and stochastically selfsimilar measures.
14. K Simon
Hausdorff dimension of hyperbolic attractors in R3.
In: 3rd Conference on Fractal Geometry and Stochastics. Friedrichroda, Németország,
2003.03.17-2003.03.22. pp. 79-92.
(PROGRESS IN PROBABILITY; 57.)(ISBN: 3-7643-7070-X)
Konferenciacikk/Előadás vagy poszter cikke/Tudományos
Független idéző: 1 Összesen: 1
1 Ban JC, Cao YL, Hu HY
THE DIMENSIONS OF A NON-CONFORMAL REPELLER AND AN
AVERAGE CONFORMAL REPELLER
TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY 362: (2)
727-751. (2010)
2003
15. Y Peres, K Simon, B Solomyak
Fractals with positive length and zero Buffon needle probability.
AMERICAN MATHEMATICAL MONTHLY 110:(4) pp. 314-325. (2003)
IF: 0.264,
Független idéző: 2 Összesen: 2
1 P Mattila
Hausdorff Dimension, projections, and the Fourier transform
Publ. Math 48: 3-48. (2004)
2 C G T D Moreira E M M Morales
Sums of Cantor sets whose sum of dimensions is close to 1
Nonlinearity 16: (5) 1641-1647. (2003)
16. M Rams, K Simon
Hausdorff and packing measures for solenoids.
6
ERGODIC THEORY AND DYNAMICAL SYSTEMS 23:(1) pp. 273-291. (2003)
IF: 0.657,
Source: PublEx
17. M Keane, K Simon, B Solomyak
The dimension of graph directed attractors with overlaps on the line, with an application
to a problem in fractal image recognition.
FUNDAMENTA MATHEMATICAE 180:(3) pp. 279-292. (2003)
IF: 0.391,
Független idéző: 4 Összesen: 4
1 Olsen L
A lower bound for the symbolic multifractal spectrum of a self-similar multifractal
with arbitrary overlaps
MATHEMATISCHE NACHRICHTEN 282: (10) 1461-1477. (2009)
2 Peres Y, Shmerkin P
Resonance between Cantor sets
ERGODIC THEORY AND DYNAMICAL SYSTEMS 29: 201-221. (2009)
3. Das M, Edgar GA
WEAK SEPARATION IN SELF-SIMILAR FRACTALS
In: TOPOLOGY PROCEEDINGS, VOL 34. Milwaukee, WI, 2008.03.132008.03.15. (2009) , pp. 245-282.
Konferenciacikk
4 Dutkay Dorin Ervin, Jorgensen Palle E T
Harmonic analysis and dynamics for affine iterated function systems.
Houston Journal of Mathematics 33: (3) 877-905. (2007)
2002
18. K Simon, B Solomyak
On the dimension of self-similar sets.
FRACTALS-AN INTERDISCIPLINARY JOURNAL ON THE COMPLEX
GEOMETRY OF NATURE 10:(1) pp. 59-65. (2002)
IF: 0.682,
Független idéző: 9 Összesen: 9
1 Guo QL, Li H, Wang Q, Xi LF
LIPSCHITZ EQUIVALENCE OF A CLASS OF SELF-SIMILAR SETS WITH
COMPLETE OVERLAPS
ANNALES ACADEMIAE SCIENTIARUM FENNICAE-MATHEMATICA 37:
(1) 229-243. (2012)
2 Barany B
Iterated function systems with non-distinct fixed points
JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS 383: (1)
7
3
4
5
6
7
8
9
244-258. (2011)
Barany B
On the Hausdorff dimension of a family of self-similar sets with complicated
overlaps
FUNDAMENTA MATHEMATICAE 206: (Bedlewo, POLAND) 49-59. (2009)
He XG, Lau KS
On a generalized dimension of self-affine fractals
MATHEMATISCHE NACHRICHTEN 281: (8) 1142-1158. (2008)
H X He, Z Y Wen
The self-similarity structure on infinite intervals
J. Math. Anal. Appl 329: (2) 1094-1101. (2007)
J Neunhauserer
A construction of singular overlapping asymmetric self-similar measures
Acta Math. Hungar 113: (4) 333-343. (2006)
T Jordan, M Pollicott
Properties of measures supported on flat Sierpinski carpets
Ergodic Theory Dynam. Systems 26: (3) 739-754. (2006)
Broomhead D, Montaldi J, Sidorov N
Golden gaskets: variations on the Sierpiniski sieve
NONLINEARITY 17: (4) 1455-1480. (2004)
D Broomhead, J Montaldi, N Sidorov
Golden gaskets: variations on the Sierpinski sieve
Nonlinearity 17: (4) 1455-1480. (2004)
2001
19. Y Peres, M Rams, K Simon, B Solomyak
Equivalence of positive Hausdorff measure and open set condition for self conformal sets.
PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY 129: pp. 26892699. (2001)
IF: 0.369,
Független idéző: 28 Összesen: 28
1 Barral J, Qu YH
LOCALIZED ASYMPTOTIC BEHAVIOR FOR ALMOST ADDITIVE
POTENTIALS
DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS 32: (3) 717-751.
(2012)
2 Deng QR, Ngai SM
Conformal iterated function systems with overlaps
DYNAMICAL SYSTEMS-AN INTERNATIONAL JOURNAL 26: (1) 103-123.
(2011)
3 Roychowdhury MK
8
4
5
6
7
8
9
10
11
12
13
14
15
LOWER QUANTIZATION COEFFICIENT AND THE F-CONFORMAL
MEASURE
COLLOQUIUM MATHEMATICUM 122: (2) 255-263. (2011)
Barral J, Bhouri I
Multifractal analysis for projections of Gibbs and related measures
ERGODIC THEORY AND DYNAMICAL SYSTEMS 31: 673-701. (2011)
Ferrari MA, Panzone P
SEPARATION PROPERTIES FOR ITERATED FUNCTION SYSTEMS OF
BOUNDED DISTORTION
FRACTALS-COMPLEX GEOMETRY PATTERNS AND SCALING IN
NATURE AND SOCIETY 19: (3) 259-269. (2011)
Llorente M, Mattila P
Lipschitz equivalence of subsets of self-conformal sets
NONLINEARITY 23: (4) 875-882. (2010)
Roychowdhury MK
QUANTIZATION DIMENSION FOR SOME MORAN MEASURES
PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY 138: (11)
4045-4057. (2010)
Zhu SG
The quantization for self-conformal measures with respect to the geometric mean
error
NONLINEARITY 23: (11) 2849-2866. (2010)
Mauldin RD, Szarek T, Urbanski M
Graph directed Markov systems on Hilbert spaces
MATHEMATICAL PROCEEDINGS OF THE CAMBRIDGE
PHILOSOPHICAL SOCIETY 147: 455-488. (2009)
Lau KS, Ngai SM, Wang XY
Separation conditions for conformal iterated function systems
MONATSHEFTE FUR MATHEMATIK 156: (4) 325-355. (2009)
A Kaenmaki, M Vilppolainen
Separation conditions on controlled Moran constructions
Fundamenta Mathematicae 200: 69-100. (2008)
Sanguo Zho
The lower quantization coefficient of the $F$-conformal measure is positive.
Nonlinear Analysis. Theory, Methods & Applications. An International
Multidisciplinary Journal. Series A: Theory and Methods 2: 448-455. (2008)
I K Eroglu
On planar self-similar sets with a dense set of rotations.
Annales Academiæ Scientiarium Fennicæ. Mathematica 32: 409-424. (2007)
K I Eroglu
On the arithmetic Sums of Cantor Sets
Nonlinearity 20: 1145-1161. (2007)
Urbanski Mariusz
9
16
17
18
19
20
21
22
23
24
25
26
27
28
Recurrence rates for loosely Markov dynamical systems
J. Aust. Math. Soc 82: (1) 39-57. (2007)
Baribeau Line, Roy Mario
Analytic multifunctions, holomorphic motions and Hausdorff dimension in IFSs
Monatsh. Math 147: (3) 199-217. (2006)
L Barreira, V Saraiva
Explicit formulas for the average density of conformal repellers
Ergodic Theory Dynam. Systems 26: (4) 973-997. (2006)
M Urbanski
Diophantine approximation and self-conformal measures
Journal of Number Theory 110: (2) 219-235. (2005)
T Szarek, S Wedrychowicz
The OSC does not imply the SOSC for infinite iterated function systems
Proc. Amer. Math. Soc 133: (2) 437-440. (2005)
A Käenmäki
On natural invariant measures on generalised iterated function systems
Ann. Acad. Sci. Fenn. Math 29: (2) 419-458. (2004)
N Patzschke
The tangent measure distribution of self-conformal fractals
Monatshefte fur Mathematik 142: (3) 243-266. (2004)
N Patzschke
The strong open set condition for self-conformal random fractals
Proc. Amer. Math. Soc 131: (8) 2347-2358. (2003)
R D Mauldin, M Urbanski
Fractal measures for parabolic IFS
Adv. Math 168: (2) 225-253. (2002)
T Y Hu, K S Lau, X Y Wang
On the absolute continuity of a class of invariant measures
Proc. Amer. Math. Soc 130: (3) 759-767. (2002)
L J Lindsay, R D Mauldin
Quantization dimension for conformal iterated function systems
Nonlinearity 15: (1) 189-199. (2002)
Y L Ye
Separation properties for self-conformal sets
Studia Math 152: (1) 33-44. (2002)
K S Lau, Y L Ye
Ruelle operator with nonexpansive IFS
Studia Mathematica 148: 143-169. (2001)
M Zähle
The average density of self-conformal measures
J. London Math. Soc 63: (3) 721-734. (2001)
20. K Simon
10
Multifractals and the dimension of exceptions.
REAL ANALYSIS EXCHANGE 27:(1) pp. 191-207. (2001)
Független idéző: 1 Összesen: 1
1 M R Lee, J J Park, H H Lee
Dimension for a Cantor-like set with overlaps
Commun. Korean Math. Soc 19: (4) 683-689. (2004)
21. K Simon, B Solomyak, M Urbanski
Invariant measures for parabolic IFS with overlaps and random continued fractions.
TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY 353: pp. 51455164. (2001)
IF: 0.600,
Független idéző: 10 Összesen: 10
1 Barany B
Iterated function systems with non-distinct fixed points
JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS 383: (1)
244-258. (2011)
2 Barany B, Persson T
The absolute continuity of the invariant measure of random iterated function
systems with overlaps
FUNDAMENTA MATHEMATICAE 210: (1) 47-62. (2010)
3 Barany B
On the Hausdorff dimension of a family of self-similar sets with complicated
overlaps
FUNDAMENTA MATHEMATICAE 206: (Bedlewo, POLAND) 49-59. (2009)
4 Dutkay Dorin Ervin, Jorgensen Palle E T
Harmonic analysis and dynamics for affine iterated function systems.
Houston Journal of Mathematics 33: (3) 877-905. (2007)
5 L Barreira, L Radu
Multifractal analysis of non-conformal repellers: a model case
Dynamical Systems 22: (2) 147-168. (2007)
6 Bergelson V, Misiurewicz M, Senti S
Affine actions of a free semigroup on the real line
ERGODIC THEORY AND DYNAMICAL SYSTEMS 26: 1285-1305. (2006)
7 T Jordan, M Pollicott
Properties of measures supported on flat Sierpinski carpets
Ergodic Theory Dynam. Systems 26: (3) 739-754. (2006)
8 T Szabados Sz Balázs
An exponential functional of random walks.
Journal of Applied Probability 40: (2) 413-426. (2003)
9 D Broomhead, M Nicol, N Sidorov
On the fine structure of stationary measures in systems which contract-on-average
11
J. Theoret. Probab 15: 715-730. (2002)
10 R Lyons
Singularity of some random continued fractions
Journal of Theoretical Probability 13: 535-545. (2000)
22. K Simon, B Solomyak, M Urbanski
Hausdorff dimension of limit sets for parabolic IFS with overlaps.
PACIFIC JOURNAL OF MATHEMATICS 201: pp. 441-478. (2001)
IF: 0.395
Független idéző: 7 Összesen: 7
1 Barany B
Iterated function systems with non-distinct fixed points
JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS 383: (1)
244-258. (2011)
2 Olsen L
A lower bound for the symbolic multifractal spectrum of a self-similar multifractal
with arbitrary overlaps
MATHEMATISCHE NACHRICHTEN 282: (10) 1461-1477. (2009)
3 Barany B
On the Hausdorff dimension of a family of self-similar sets with complicated
overlaps
FUNDAMENTA MATHEMATICAE 206: (Bedlewo, POLAND) 49-59. (2009)
4 Rugh Hans Henrik
On the dimensions of conformal repellers. Randomness and parameter dependency.
Annals of Mathematics. Second Series 168: (3) 695-748. (2008)
5 L Barreira, L Radu
Multifractal analysis of non-conformal repellers: a model case
Dynamical Systems 22: (2) 147-168. (2007)
6 Y L Ye
Vector-valued Ruelle operator with weakly contractive IFS
J. Math. Anal. Appl 330: (1) 221-236. (2007)
7 K S Lau, Y L Ye
Ruelle operator with nonexpansive IFS
Studia Mathematica 148: 143-169. (2001)
2000
23. Y Peres, K Simon, B Solomyak
Self-similar sets of zero Hausdorff and positive Packing measure.
ISRAEL JOURNAL OF MATHEMATICS 117: pp. 353-379. (2000)
IF: 0.539,
12
Független idéző: 11 Összesen: 11
1 Barany B
Iterated function systems with non-distinct fixed points
JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS 383: (1)
244-258. (2011)
2 Bateman M, Volberg A
AN ESTIMATE FROM BELOW FOR THE BUFFON NEEDLE PROBABILITY
OF THE FOUR-CORNER CANTOR SET
MATHEMATICAL RESEARCH LETTERS 17: (5) 959-967. (2010)
3 Wen SY, Wen ZX, Wen ZY
Gauges for the self-similar sets
MATHEMATISCHE NACHRICHTEN 281: (8) 1205-1214. (2008)
4 K I Eroglu
On planar self-similar sets with a dense set of rotations
Annales Academiae Scientiarum Fennicae Mathematica 32: (2) 409-424. (2007)
5 K I Eroglu
On the arithmetic Sums of Cantor Sets
Nonlinearity 20: 1145-1161. (2007)
6 P Smerkin
Overlapping self-affine sets
Indiana Univ. Math. J 55: (4) 1291-1331. (2006)
7 M Rams
Generic behavior of iterated function systems with overlaps
Pacific Journal of Mathematics 218: (1) 173-186. (2005)
8 J Ma, Z Wen
Hausdorff and packing measure of sets of generic points: a zero-infinity law
J. London Math. Soc 69: (2) 383-406. (2004)
9 P Mattila
Hausdorff Dimension, projections, and the Fourier transform
Publ. Math 48: 3-48. (2004)
10 K S Lau, X Y Wang
Iterated function systems with a weak separation condition
Studia Math 161: (3) 249-268. (2004)
11 M Rams
Absolute continuity of the SBR measure for non-linear fat baker maps
Nonlinearity 16: (5) 1649-1655. (2003)
1999
24. K Simon, B Solomyak
Hausdorff dimension Horseshoes in R3.
ERGODIC THEORY AND DYNAMICAL SYSTEMS 19: pp. 1343-1363. (1999)
13
IF: 0.378,
Független idéző: 12 Összesen: 12
1 Barreira L, Gelfert K
Dimension estimates in smooth dynamics: a survey of recent results
ERGODIC THEORY AND DYNAMICAL SYSTEMS 31: 641-671. (2011)
2 Mihailescu E, Urbanski M
HAUSDORFF DIMENSION OF THE LIMIT SET OF CONFORMAL
ITERATED FUNCTION SYSTEMS WITH OVERLAPS
PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY 139: (8)
2767-2775. (2011)
3 Barreira L
ALMOST ADDITIVE THERMODYNAMIC FORMALISM: SOME RECENT
DEVELOPMENTS
REVIEWS IN MATHEMATICAL PHYSICS 22: (10) 1147-1179. (2010)
4 Ban JC, Cao YL, Hu HY
THE DIMENSIONS OF A NON-CONFORMAL REPELLER AND AN
AVERAGE CONFORMAL REPELLER
TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY 362: (2)
727-751. (2010)
5 L Barreira
Dimension and Recurrence in Hyperbolic Dynamics
Berlin: Birkhauser, 2008.
ISBN 978-3-7643-8881-2
Könyv
E Mihailescu, M Urbański
Transversal families of hyperbolic skew-products
Discrete and Continuous Dynamical Systems. Series A 21: (3) 907-928. (2008)
7 L Barreira, L Radu
Multifractal analysis of non-conformal repellers: a model case
Dynamical Systems 22: (2) 147-168. (2007)
8 M Rams
Contracting-on-average baker maps
Bull. Pol. Acad. Sci. Math 54: (3) 219-229. (2006)
9 L Barreira, K Gelfert
Multifractal analysis for Lyapunov exponents on nonconformal repellers
Comm. Math. Phys 267: (2) 393-418. (2006)
10 Barreira L
Dimension estimates in nonconformal hyperbolic dynamic
NONLINEARITY 16: (5) 1657-1672. (2003)
6
14
11 L Barreira
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