Complexity of gauge bounded Cartier algebras

Henry July; Axel St\"abler

arXiv:1910.08478·math.AC·October 28, 2020

Complexity of gauge bounded Cartier algebras

Henry July, Axel St\"abler

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TL;DR

This paper proves that gauge bounded Cartier algebras have finite complexity and provides an example demonstrating that the converse is not true in general.

Contribution

It establishes the finite complexity of gauge bounded Cartier algebras and presents a counterexample to the converse.

Findings

01

Gauge bounded Cartier algebras have finite complexity

02

Counterexample showing the converse does not hold

03

Insight into the structure of Cartier algebras

Abstract

We show that a gauge bounded Cartier algebra has finite complexity. We also give an example showing that the converse does not hold in general.

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