Numerical estimates are given for the spectral radius of simple random walks on Cayley graphs. Emphasis is on the case of the fundamental group of a closed surface, for the usual system of generators
This thesis concerns the diameter and spectral gap of finite groups. Our focus shall be on the asymp...
This thesis discusses various aspects of continuous-time simple random walks on measure weighted gra...
The study of random walks demonstrates connections between their algebraic, combinatorial, geometric...
Numerical estimates are given for the spectral radius of simple random walks on Cayley graphs. Empha...
Introduction Let \Gamma be a group generated by a finite set S which is symmetric (s 2 S () s \Gamm...
v2: added a geometric interpretation of the lower boundEstimating numerically the spectral radius of...
43 pages, 3 figuresInternational audienceWe establish spectral theorems for random walks on mapping ...
This work is mainly concerned with discrete random walks on graphs and an interesting application of...
This paper announces results which have been later developped in three articles: 1. "Random walks on...
We calculate the spectra and spectral measures associated to random walks on restricted wreath produ...
AbstractLet G be a compact group, not necessarily abelian, let Ĝ be its unitary dual, and for f∈L1(G...
Abstract. We investigate various features of a quite new family of graphs, introduced as a possible ...
with random walk on a distance-regular graph, which roughly corresponds to nearest-neighbor isotropi...
International audienceWe prove a general large sieve statement in the context of random walks on sub...
The study of random walks demonstrates connections between their algebraic, combinatorial, geometric...
This thesis concerns the diameter and spectral gap of finite groups. Our focus shall be on the asymp...
This thesis discusses various aspects of continuous-time simple random walks on measure weighted gra...
The study of random walks demonstrates connections between their algebraic, combinatorial, geometric...
Numerical estimates are given for the spectral radius of simple random walks on Cayley graphs. Empha...
Introduction Let \Gamma be a group generated by a finite set S which is symmetric (s 2 S () s \Gamm...
v2: added a geometric interpretation of the lower boundEstimating numerically the spectral radius of...
43 pages, 3 figuresInternational audienceWe establish spectral theorems for random walks on mapping ...
This work is mainly concerned with discrete random walks on graphs and an interesting application of...
This paper announces results which have been later developped in three articles: 1. "Random walks on...
We calculate the spectra and spectral measures associated to random walks on restricted wreath produ...
AbstractLet G be a compact group, not necessarily abelian, let Ĝ be its unitary dual, and for f∈L1(G...
Abstract. We investigate various features of a quite new family of graphs, introduced as a possible ...
with random walk on a distance-regular graph, which roughly corresponds to nearest-neighbor isotropi...
International audienceWe prove a general large sieve statement in the context of random walks on sub...
The study of random walks demonstrates connections between their algebraic, combinatorial, geometric...
This thesis concerns the diameter and spectral gap of finite groups. Our focus shall be on the asymp...
This thesis discusses various aspects of continuous-time simple random walks on measure weighted gra...
The study of random walks demonstrates connections between their algebraic, combinatorial, geometric...
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