Publication

Bounded cohomology of lattices in higher rank Lie groups

Nicolas Monod
1999
Journal paper

Abstract

Let G be an irreducible uniform lattice in a higher semi-simple rank Lie group or algebraic group. We prove that any G-action on the circle by C1 diffeomorphisms is finite. This is achieved by showing that natural map from bounded to usual second cohomology is injective. The latter holds also for non-trivial unitary coefficients, and implies more finiteness results for G; for instance the stable commutator length vanishes. We prove the same theorems for certain lattices in products of trees.

Official source

https://infoscience.epfl.ch/record/128748?ln=en

About this result

This page is automatically generated and may contain information that is not correct, complete, up-to-date, or relevant to your search query. The same applies to every other page on this website. Please make sure to verify the information with EPFL's official sources.

Graph Chatbot

Chat with Graph Search

Ask any question about EPFL courses, lectures, exercises, research, news, etc. or try the example questions below.

DISCLAIMER: The Graph Chatbot is not programmed to provide explicit or categorical answers to your questions. Rather, it transforms your questions into API requests that are distributed across the various IT services officially administered by EPFL. Its purpose is solely to collect and recommend relevant references to content that you can explore to help you answer your questions.

Bounded cohomology of lattices in higher rank Lie groups

Graph Chatbot

Chat with Graph Search

Multiplicity-free Representations of Algebraic Groups

Coxeter Combinatorics For Sum Formulas In The Representation Theory Of Algebraic Groups

Positivity Of The Cm Line Bundle For K-Stable Log Fanos

Coxeter Combinatorics For Sum Formulas In The Representation Theory Of Algebraic Groups

Multiplicity-free Representations of Algebraic Groups

Positivity Of The Cm Line Bundle For K-Stable Log Fanos