- Probab. Theory and Related Fields 98 (1994), 91--112 . TreeIndexed Random Walks on Groups and
- APPEARED IN ACTA MATHEMATICA (2001) THICK POINTS FOR PLANAR BROWNIAN MOTION
- Ann. Probab. 23 (1995), 105--140. CRITICAL RANDOM WALK IN RANDOM ENVIRONMENT
- Ladder Heights, Gaussian Random Walks, and the Riemann Zeta Function \Lambda
- Geometric and Functional Analysis 2, no. 1 (1992), 1--28 UNIFORM DILATIONS
- Math. Research Letters 3 (1996) 231--236. ABSOLUTE CONTINUITY OF BERNOULLI
- The Number of Infinite Clusters in Dynamical Percolation Yuval Peres \Lambda Jeffrey E. Steif y
- Version of 29 July 1998 Critical Percolation on Any Nonamenable Group
- DUKE MATH. J. 102 (2000), 193--251. SMOOTHNESS OF PROJECTIONS, BERNOULLI CONVOLUTIONS,
- Ann. Probab., 28 (2000), 1--35. Thick Points for Spatial Brownian Motion
- A Phase Transition in Random Coin Tossing By David A. Levin, Robin Pemantle 1 and Yuval Peres 2
- Classical and Modern Branching Processes, K. Athreya and P. Jagers (editors), Springer, New York, to appear, pp. 181--186. Version of 21 May 1995 A Conceptual Proof of the KestenStigum Theorem
- To appear in Ann. Probab. Version of 19 September 1994 Conceptual Proofs of L log L Criteria
- Version of 30 July 1999 Nonamenable Products are not Treeable
- EQUIVALENCE OF POSITIVE HAUSDORFF MEASURE AND THE OPEN SET CONDITION FOR SELF-CONFORMAL SETS
- Large Deviations for Random Walks on GaltonWatson Trees: Averaging and Uncertainty
- BIINVARIANT SETS AND MEASURES HAVE INTEGER HAUSDORFF DIMENSION
- Version of 5 July 1994 Ergodic Theory on GaltonWatson Trees
- Math. Proc. Camb. Phil. Soc. 115 (1994), 437--450. THE PACKING MEASURE OF SELFAFFINE CARPETS
- Packing Dimension and Cartesian Products Christopher J. Bishop 1 Yuval Peres 2
- Unpredictable Paths and Percolation Itai Benjamini 1 , Robin Pemantle 2;3 , and Yuval Peres 4;5
- Trans. Amer. Math. Soc., to appear. SELFSIMILAR MEASURES AND INTERSECTIONS OF CANTOR SETS
- Appeared in: Random Discrete Structures, IMA Volume 76 (1996), D. Aldous and R. Pemantle (Editors), SpringerVerlag.
- Ann. Probab. 23 (1995), 1102--1124. GaltonWatson Trees with the Same Mean
- Math. Proc. Camb. Phil. Soc. 115 (1994), 437--450. THE SELFAFFINE CARPETS OF MCMULLEN AND
- Ann. Probab. 23 (1995), 1332--1346. MARTIN CAPACITY FOR MARKOV CHAINS
- To appear in Probab. Theory Related Fields Version of 9 January 1996 Biased Random Walks on GaltonWatson Trees
- Thin Points for Brownian Motion Amir Dembo Yuval Peres y Jay Rosen z Ofer Zeitouni x
- Information flow on trees Elchanan Mossel
- Ann. Probab. 22 (1994), 180--194. DOMINATION BETWEEN TREES AND APPLICATION TO
- Journal of Theoretical Probability 9 (1996), 231--244. RANDOM WALKS IN VARYING DIMENSIONS
- A LARGE WIENER SAUSAGE FROM CRUMBS OMER ANGEL, ITAI BENJAMINI AND YUVAL PERES
- No Directed Fractal Percolation in Zero Area L. Chayes 1 , Robin Pemantle 2;3 and Yuval Peres 4;5
- HOW LIKELY IS BUFFON'S NEEDLE TO FALL NEAR A PLANAR CANTOR SET?
- Version of July 5, 1998 Crossing Estimates and
- Version of 2 March 2000 Uniform Spanning Forests
- A Topological Criterion for Hypothesis Testing Amir Dembo 1 and Yuval Peres 2
- Dynamical Percolation Olle Haggstrom \Lambda Yuval Peres y Jeffrey E. Steif z
- SIXTY YEARS OF BERNOULLI CONVOLUTIONS YUVAL PERES, WILHELM SCHLAG, AND BORIS SOLOMYAK
- CUTPOINTS AND EXCHANGEABLE EVENTS FOR RANDOM WALKS Nicholas James and Yuval Peres 1
- Measures of Full Dimension on AffineInvariant R. Kenyon \Lambda and Y. Peres y
- To appear in Ann. Inst. H. Poincare Probab. Statist. Version of 22 March 2003 Markov Chain Intersections and the LoopErased Walk
- EXISTENCE OF L q DIMENSIONS AND ENTROPY DIMENSION FOR SELF-CONFORMAL MEASURES
- J. Number Theory 84, 185--198 (2000). APPROXIMATION BY POLYNOMIALS WITH COEFFICIENTS \Sigma1
- The Trace of Spatial Brownian Motion is Capacityequivalent to the Unit Square
- July 9, 2001 Geometry of the Uniform Spanning Forest
- Ann. Appl. Probab. 10 (2000), 410--433. Broadcasting on Trees and the Ising Model
- Energy and Cutsets in Infinite Percolation Clusters David Levin 1 and Yuval Peres 2;3
- ENTROPY OF CONVOLUTIONS ON THE CIRCLE ELON LINDENSTRAUSS, DAVID MEIRI AND YUVAL PERES
- Hausdorff Dimensions of Sofic AffineInvariant R. Kenyon \Lambda and Y. Peres y
- Where Did The Brownian Particle Go? Robin Pemantle \Lambda , Yuval Peres y , Jim Pitman z , Marc Yor x
- POINTS OF INCREASE FOR RANDOM WALKS Yuval Peres 1
- IntersectionEquivalence of Brownian Paths and Certain Branching Processes \Lambda
- SELFSIMILAR SETS OF ZERO HAUSDORFF MEASURE AND POSITIVE PACKING MEASURE
- Self--Affine Carpets on the Square Lattice Irene Hueter \Lambda and Yuval Peres y
- BERNOULLI CONVOLUTIONS AND AN INTERMEDIATE VALUE THEOREM FOR ENTROPIES OF KPARTITIONS
- E l e c t r o n i c r o b a b i l i t y
- A DIMENSION GAP FOR CONTINUED FRACTIONS WITH INDEPENDENT DIGITS
- Probab. Th. Rel. Fields, to appear . Monotonicity of Uniqueness for Percolation on Cayley Graphs
- Version of Sept. 1997 GroupInvariant Percolation on Graphs
- THICK POINTS FOR INTERSECTIONS OF PLANAR SAMPLE PATHS
- Percolation on Transitive Graphs as a Coalescent Process: Relentless Merging
- Version of 4 June 1999 Percolation on Nonamenable Products
- Random Structures Algorithms 16, (2000), 333--343. Percolation in a Dependent Random Environment
- INVARIANT MEASURES OF FULL DIMENSION FOR SOME EXPANDING MAPS
- J. Comb. Th. A, to appear Resistance Bounds for
- To appear, Comm. Math. Phys. Tail estimates for onedimensional random walk in random environment
