Add to ORKGWe present a new construction of finite Gelfand pairs by looking at the action of the full automorphism group of a finite spherically homogeneous rooted tree of type r on the variety V(r,s) of all spherically homogeneous subtrees of type s. This generalizes well-known examples as the finite ultrametric space, the Hamming scheme and the Johnson scheme. We also present further generalizations of these classical examples. The first two are based on Harary's notions of composition and exponentiation of group actions. Finally, the generalized Johnson scheme provides the inductive step for the harmonic analysis of our main construction
In this paper we define a particular Markov chain on some combinatorial structures called orthogonal...
This thesis explores connections between the Gaudin Hamiltonians in type A and the combinatorics of...
We prove the equivalence between a relative bottleneck property and being quasi-isometric to a tree-...
AbstractWe present a new construction of finite Gelfand pairs by looking at the action of the full a...
We present a new construction of finite Gelfand pairs by looking at the action of the full automorph...
AbstractWe show that the action of the group G on each level of the rooted binary tree T2 is 2-point...
We show that the action of the group G on each level of the rooted binary tree T-2 is 2-point homoge...
In this paper, we study harmonic analysis on finite homogeneous spaces whose associated permutation ...
In this paper, we study harmonic analysis on finite homogeneous spaces whose associated permutation ...
This book presents an introduction to the representation theory of wreath products of finite groups ...
In this paper, we continue the analysis of [28] on finite homogeneous spaces whose associated permut...
Abstract. The action of the unitary group on the real Heisenberg group yields a Gelfand pair. The as...
PhD ThesisThe PhD project consists of two parts. The first part is about finite trees, realizations ...
The focus of this thesis is finitely generated subgroups of the automorphism group of an infinite sp...
Every Gelfand pair (G, K) admits a decomposition G = K P, where P < G is an amenable subgroup. In pa...
In this paper we define a particular Markov chain on some combinatorial structures called orthogonal...
This thesis explores connections between the Gaudin Hamiltonians in type A and the combinatorics of...
We prove the equivalence between a relative bottleneck property and being quasi-isometric to a tree-...
AbstractWe present a new construction of finite Gelfand pairs by looking at the action of the full a...
We present a new construction of finite Gelfand pairs by looking at the action of the full automorph...
AbstractWe show that the action of the group G on each level of the rooted binary tree T2 is 2-point...
We show that the action of the group G on each level of the rooted binary tree T-2 is 2-point homoge...
In this paper, we study harmonic analysis on finite homogeneous spaces whose associated permutation ...
In this paper, we study harmonic analysis on finite homogeneous spaces whose associated permutation ...
This book presents an introduction to the representation theory of wreath products of finite groups ...
In this paper, we continue the analysis of [28] on finite homogeneous spaces whose associated permut...
Abstract. The action of the unitary group on the real Heisenberg group yields a Gelfand pair. The as...
PhD ThesisThe PhD project consists of two parts. The first part is about finite trees, realizations ...
The focus of this thesis is finitely generated subgroups of the automorphism group of an infinite sp...
Every Gelfand pair (G, K) admits a decomposition G = K P, where P < G is an amenable subgroup. In pa...
In this paper we define a particular Markov chain on some combinatorial structures called orthogonal...
This thesis explores connections between the Gaudin Hamiltonians in type A and the combinatorics of...
We prove the equivalence between a relative bottleneck property and being quasi-isometric to a tree-...