# Appoximate Cohomology

**Authors:** David Kazhdan, Tamar Ziegler

arXiv: 1702.01308 · 2017-05-16

## TL;DR

This paper introduces approximate cohomology groups for vector spaces over finite fields and proves the finiteness of a related minimal rank bound for approximate homomorphisms, extending classical cohomology concepts.

## Contribution

It defines a new notion of approximate cohomology groups and establishes finiteness results for minimal rank bounds in the context of approximate homomorphisms over finite fields.

## Key findings

- Finiteness of R(G,r,k) for finite fields and countable-dimensional vector spaces.
- Introduction of approximate cohomology groups as algebraic analogues of epsilon-representations.
- Computation of the first approximate cohomology group for certain modules.

## Abstract

Let $k$ be a field, $G$ be an abelian group and $r\in \mathbb N$. Let $L$ be an infinite dimensional $k$-vector space. For any $m\in End_k(L)$ we denote by $r(m)\in [0,\infty ]$ the rank of $m$. We define by $R(G,r,k)\in [0,\infty]$ the minimal $R$ such that for any map $A:G \to End_k(L)$ with $r(A(g'+g'')-A(g')-A(g''))\leq r$, $g',g''\in G$ there exists a homomorphism $\chi :G\to End_k(L)$ such that $r(A(g)-\chi (g))\leq R(G, r, k)$ for all $g\in G$. We show the finiteness of $R(G,r,k)$ for the case when $k$ is a finite field, $G=V$ is a $k$-vector space $V$ of countable dimension. We actually prove a generalization of this result. In addition we introduce a notion of {\it Approximate Cohomology} groups $H^k_{\mathcal F} (V,M)$ (which is a purely algebraic analogue of the notion of $\epsilon$-representation (\cite{ep})) and interperate our result as a computation of the group $H^1_{\mathcal F} (V,M)$ for some $V$-modules $M$.

## Full text

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## References

13 references — full list in the complete paper: https://tomesphere.com/paper/1702.01308/full.md

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Source: https://tomesphere.com/paper/1702.01308