Finite generation of Andre-Quillen (co-)homology of F-finite algebras

Cristodor Ionescu

arXiv:1909.12652·math.AC·March 11, 2021

Finite generation of Andre-Quillen (co-)homology of F-finite algebras

Cristodor Ionescu

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TL;DR

This paper proves that the Andre-Quillen homology and cohomology modules of F-finite Z(p)-algebras are finitely generated, providing new insights into their algebraic structure.

Contribution

It establishes the finite generation of Andre-Quillen (co-)homology modules for F-finite Z(p)-algebras, a novel result in algebraic homology theory.

Findings

01

Andre-Quillen homology modules are finitely generated.

02

Andre-Quillen cohomology modules are finitely generated.

03

Results apply to F-finite Z(p)-algebras.

Abstract

We prove that the Andre-Quillen homology and cohomology modules of F-finite Z(p)-algebras are finitely generated.

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