Relative property (T) has recently been used to show the existence of a variety of new rigidity phenomena, for example in von Neumann algebras and the study of orbit-equivalence relations. However, until recently there were few examples of group pairs with relative property (T) available through the literature. This motivated the following result: A finitely generated group G admits a special linear representation with non-amenable R-Zariski closure if and only if it acts on an Abelian group A (of finite nonzero Q-rank) so that the corresponding group pair (G x A,A) has relative property (T). The proof is constructive. The main ingredients are Furstenberg’s celebrated lemma about invariant measures on projective spaces and the spectral theo...
For an arbitrary discrete probability-measure-preserving groupoid G, we provide a characterizat...
Bak A, Hazrat R, Vavilov N. Localization-completion strikes again: Relative K-1 is nilpotent by abel...
AbstractWe extend arbitrary group completions to the category of pairs (G,N) where G is a group and ...
Shalom characterized property (T) in terms of the vanishing of all reduced first cohomology for comp...
Improvement in the presentation of the replacement trick. Introduction of compressions for non-ergod...
AbstractWe define a relative property A for a countable group with respect to a finite family of sub...
AbstractThe main theorem of Galois theory implies that there are no finite group–subgroup pairs with...
1.1 Definition. Relative Property T via representations for a locally compact group G with closed su...
A general theorem governing the precise number of relative invariants for general multiplier represe...
In 1967, D. Kazhdan defined Property (T) for locally compact groups in terms of unitary representati...
Abstract. A prehomogeneous vector space is a rational representation ρ: G → GL(V) of a connected com...
AbstractWe prove that the notion of rigidity (or relative property (T)) for inclusions of finite von...
Abstract. We perform a systematic investigation of Kazhdan’s relative Prop-erty (T) for pairs (G,X),...
Abstract. The main point of this paper is to give necessary and sucient conditions so that certain c...
Let G and E stand for one of the following pairs of groups: • Either G is the general quadratic grou...
For an arbitrary discrete probability-measure-preserving groupoid G, we provide a characterizat...
Bak A, Hazrat R, Vavilov N. Localization-completion strikes again: Relative K-1 is nilpotent by abel...
AbstractWe extend arbitrary group completions to the category of pairs (G,N) where G is a group and ...
Shalom characterized property (T) in terms of the vanishing of all reduced first cohomology for comp...
Improvement in the presentation of the replacement trick. Introduction of compressions for non-ergod...
AbstractWe define a relative property A for a countable group with respect to a finite family of sub...
AbstractThe main theorem of Galois theory implies that there are no finite group–subgroup pairs with...
1.1 Definition. Relative Property T via representations for a locally compact group G with closed su...
A general theorem governing the precise number of relative invariants for general multiplier represe...
In 1967, D. Kazhdan defined Property (T) for locally compact groups in terms of unitary representati...
Abstract. A prehomogeneous vector space is a rational representation ρ: G → GL(V) of a connected com...
AbstractWe prove that the notion of rigidity (or relative property (T)) for inclusions of finite von...
Abstract. We perform a systematic investigation of Kazhdan’s relative Prop-erty (T) for pairs (G,X),...
Abstract. The main point of this paper is to give necessary and sucient conditions so that certain c...
Let G and E stand for one of the following pairs of groups: • Either G is the general quadratic grou...
For an arbitrary discrete probability-measure-preserving groupoid G, we provide a characterizat...
Bak A, Hazrat R, Vavilov N. Localization-completion strikes again: Relative K-1 is nilpotent by abel...
AbstractWe extend arbitrary group completions to the category of pairs (G,N) where G is a group and ...