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Valette, Alain
Résultat de la recherche
Lp-distortion and p-spectral gap of finite graphs
2014, Jolissaint, Pierre-Nicolas, Valette, Alain
Proper actions of wreath products and generalizations
2012, Cornulier, Yves, Stalder, Yves, Valette, Alain
Limits of graphs in group theory and computer science
2009, Goulnara, Arzhantseva, Valette, Alain
Amenability and margulis super-rigidity
2008, Valette, Alain, Cowling, Michael, Kashiwara, Masaki, Vogan, David A, Frenkel, Edward, Valette, Alain, Wallach, Nolan R
L2-Betti numbers and Plancherel measure
2014, Petersen, Henrik Densing, Valette, Alain
The Howe-Moore property for real and p-adic groups
2011, Cluckers, Raf, Cornulier, Yves, Louvet, Nicolas, Tessera, Romain, Valette, Alain
We consider in this paper a relative version of the Howe-Moore property, about vanishing at infinity of coefficients of unitary representations. We characterize this property in terms of ergodic measure-preserving actions. We also characterize, for linear Lie groups or $p$-adic Lie groups, the pairs with the relative Howe-Moore property with respect to a closed, normal subgroup. This involves, in one direction, structural results on locally compact groups all of whose proper closed characteristic subgroups are compact, and, in the other direction, some results about the vanishing at infinity of oscillatory integrals.
Isometric group actions on banach spaces and representations vanishing at infinity
2008, De Cornulier, Yvan, Tessera, Romain, Valette, Alain
Our main result is that the simple Lie group G = Sp( n; 1) acts metrically properly isometrically on L-p( G) if p > 4 n + 2. To prove this, we introduce Property (BP0V), with V being a Banach space: a locally compact group G has Property (BP0V) if every affine isometric action of G on V, such that the linear part is a C-0- representation of G, either has a fixed point or is metrically proper. We prove that solvable groups, connected Lie groups, and linear algebraic groups over a local field of characteristic zero, have Property ( BP V 0). As a consequence, for unitary representations, we characterize those groups in the latter classes for which the first cohomology with respect to the left regular representation on L-2(G) is nonzero; and we characterize uniform lattices in those groups for which the first L-2- Betti number is nonzero.
Reduced 1-cohomology and relative property (T)
2012, Fernós, Talia, Valette, Alain, Martin, Florian
The Euclidean distortion of the lamplighter group
2010, Austin, Tim, Naor, Assaf, Valette, Alain
Imagination et mathématiques: deux exemples
2008, Valette, Alain