Growth in noncommutative algebras and entropy in derived categories

TL;DR

This paper explores the relationship between growth measures of noncommutative algebras and entropy in derived categories, linking algebraic growth to categorical invariants.

Contribution

It establishes bounds and equalities connecting categorical and polynomial entropies with algebraic growth and Gelfand--Kirillov dimension for various classes of algebras.

Findings

Entropies are bounded by algebra growth entropy and Gelfand--Kirillov dimension.

Equalities hold for regular algebras and coordinate rings of smooth projective varieties.

Polynomial entropy is zero for monomial algebras of polynomial growth.

Abstract

A noncommutative projective variety is defined, after Artin and Zhang, by a graded coherent algebra A, where the category of coherent sheaves is the quotient qgr(A) of the category of finitely presented graded modules by the subcategory of torsion modules. We consider the categorical and polynomial entropies of the Serre twist, that is, of the degree shift functor on the bounded derived category of qgr(A). These two types of entropy can be viewed as analogues of the dimension of the noncommutative variety. We relate these invariants with the growth of the algebra. For algebras of finite global dimension, the entropies are bounded above by the growth entropy and the Gelfand--Kirillov dimension of the algebra. Moreover, these equalities hold for regular algebras, as well as for coordinate rings of smooth projective varieties. However, the polynomial entropy is zero for monomial algebras of polynomial growth, so in this case the inequality is strict.