- Rev. Mat. Iberoamericana 22 (2006), no. 3, 747799 Transition operators
- Alea 4, 359392 (2008) Refined estimates for some basic random walks on
- Stability results for Harnack inequalities Alexander Grigor'yan
- E l e c t r o n i o b a b i l i t y
- Stochastic Processes and their Applications 117 (2007) 961979 www.elsevier.com/locate/spa
- L'INSTITUT FOURIER Alexander GRIGOR'YAN & Laurent SALOFF-COSTE
- CONNECTED LIE GROUPS AND PROPERTY RD I. CHATTERJI, C. PITTET, and L. SALOFF-COSTE
- hk.tex : 2009/3/2 (8:13) page: 1 Advanced Studies in Pure Mathematics ,
- L. Saloff-Coste Publications December 2008 [1] Melanie Pivarski and Laurent Saloff-Coste, Small time heat kernel behavior on Rie-
- Contemporary Mathematics Computations of spectral radii on G-spaces
- The Annals of Applied Probability 2006, Vol. 16, No. 4, 20982122
- Surveys in Differential Geometry IX, International Press
- Merging and stability for time inhomogeneous fi-nite Markov chains
- Probability on groups: Random walks and invariant diffusions Introduction What do card shuffling, volume growth, and Harnack inequal-
- Statistical Science 2008, Vol. 23, No. 2, 151178
- Analysis on compact Lie groups of large dimension and on connected compact groups
- title Introduction Fundamental questions Some upper bounds Harnack inequality Manifolds with ends CMS winter meeting 2008, Ottawa
- Sobolev Inequalities in Familiar and Unfamiliar Settings
- Central Gaussian convolution semigroups on compact groups: a survey
- Brownian motion on compact groups in infinite dimension A. Bendikov
- Holomorphic Functions and Subelliptic Heat Kernels over Lie groups.
- New York Journal of Mathematics New York J. Math. 14 (2008) 137.
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- The Cutoff Phenomenon for Randomized Riffle Shuffles*
- A survey on the relationships between volume growth, isoperimetry, and the behavior of simple
- Bendikov, A. and Saloff-Coste, L. Osaka J. Math.
- DOI 10.1007/s00208-006-0057-z Mathematische Annalen Ultracontractivity and embedding into L
- GROWTH OF TAYLOR COEFFICIENTS OVER COMPLEX HOMOGENEOUS SPACES
