Matrix algebras with degenerate traces and trace identities

TL;DR

This paper investigates matrix algebras with degenerate traces, characterizing their trace identities, exploring specific subalgebras with special traces, and classifying related algebraic varieties of polynomial growth.

Contribution

It provides a detailed analysis of trace identities for degenerate trace matrix algebras and classifies subvarieties of polynomial growth varieties.

Findings

Trace identities of diagonal matrices with degenerate trace follow from commutativity and pure trace identities.

Determined generators of the trace T-ideal of D_3.

Classified subvarieties of algebras with almost polynomial growth.

Abstract

In this paper we study matrix algebras with a degenerate trace in the framework of the theory of polynomial identities. The first part is devoted to the study of the algebra $D_n$ of $n \times n$ diagonal matrices. We prove that, in case of a degenerate trace, all its trace identities follow by the commutativity law and by pure trace identities. Moreover we relate the trace identities of $D_{n+1}$ endowed with a degenerate trace, to those of $D_n$ with the corresponding trace. This allows us to determine the generators of the trace T-ideal of $D_3$. In the second part we study commutative subalgebras of $M_k(F)$, denoted by $C_k$ of the type $F + J$ that can be endowed with the so-called strange traces: $tr(a+j) = \alpha a + \beta j$, for any $a+j \in C_k$, $\alpha$, $\beta \in F$. Here $J$ is the radical of $C_k$. In case $\beta = 0$ such a trace is degenerate, and we study the trace identities satisfied by the algebra $C_k$, for every $k \geq 2$. Moreover we prove that these algebras generate the so-called minimal varieties of polynomial growth. In the last part of the paper, devoted to the study of varieties of polynomial growth, we completely classify the subvarieties of the varieties of algebras of almost polynomial growth introduced in an earlier paper of the same authors.