Add to ORKGWe study in this paper combinatorial problems concerning graphs generated by measure preserving actions of countable groups on standard measure spaces. In particular we study chromatic and independence numbers, in both the measure-theoretic and the Borel context, and relate the behavior of these parameters to properties of the acting group such as amenability, Kazhdan’s property (T), and freeness. We also prove a Borel analog of the classical Brooks’ Theorem in finite combinatorics for actions of groups with finitely many ends
Let G = (V, E) be a graph and k greater-than-or-equal-to 2 be an integer. A set S subset-of V is k-i...
We present a new approach to the proof of ergodic theorems for ac-tions of free groups which general...
We call a measure-preserving action of a countable discrete group on a standard probability space te...
We study in this paper combinatorial problems concerning graphs generated by measure preserving acti...
We study in this paper some combinatorial invariants associated with ergodic actions of infinite, co...
In this dissertation we study problems related to colorings of combinatorial structures both in the ...
In this note we give a short proof of a pointwise ergodic theorem for measure-preserving actions of ...
This paper is to a large extent a continuation of the work in [K] on the global aspects of measure p...
The class of ergodic, invariant probability Borel measure for the shift action of a countable group ...
We generalize Petridis’s new proof of Plünnecke’s graph inequality [6] to graphs whose vertex set i...
C1 - Refereed Journal ArticleEvery non-amenable countable group induces orbit inequivalent ergodic e...
We give a brief survey of some classification results on orbit equivalence of probability measure pr...
AbstractLet G=(V,E) be a graph and k⩾2 be an integer. A set S⊂V is k-independent if every component ...
We generalize Petridis’s new proof of Plünnecke’s graph inequality [6] to graphs whose vertex set i...
This book provides an introduction to the ergodic theory and topological dynamics of actions of coun...
Let G = (V, E) be a graph and k greater-than-or-equal-to 2 be an integer. A set S subset-of V is k-i...
We present a new approach to the proof of ergodic theorems for ac-tions of free groups which general...
We call a measure-preserving action of a countable discrete group on a standard probability space te...
We study in this paper combinatorial problems concerning graphs generated by measure preserving acti...
We study in this paper some combinatorial invariants associated with ergodic actions of infinite, co...
In this dissertation we study problems related to colorings of combinatorial structures both in the ...
In this note we give a short proof of a pointwise ergodic theorem for measure-preserving actions of ...
This paper is to a large extent a continuation of the work in [K] on the global aspects of measure p...
The class of ergodic, invariant probability Borel measure for the shift action of a countable group ...
We generalize Petridis’s new proof of Plünnecke’s graph inequality [6] to graphs whose vertex set i...
C1 - Refereed Journal ArticleEvery non-amenable countable group induces orbit inequivalent ergodic e...
We give a brief survey of some classification results on orbit equivalence of probability measure pr...
AbstractLet G=(V,E) be a graph and k⩾2 be an integer. A set S⊂V is k-independent if every component ...
We generalize Petridis’s new proof of Plünnecke’s graph inequality [6] to graphs whose vertex set i...
This book provides an introduction to the ergodic theory and topological dynamics of actions of coun...
Let G = (V, E) be a graph and k greater-than-or-equal-to 2 be an integer. A set S subset-of V is k-i...
We present a new approach to the proof of ergodic theorems for ac-tions of free groups which general...
We call a measure-preserving action of a countable discrete group on a standard probability space te...