Upper triangular matrices with superinvolution: identities and images of multilinear polynomials
Abstract
In this paper we consider the algebra of upper triangular matrices UT, endowed with a -grading (superalgebra) and equipped with a superinvolution. These structures naturally arise in the context of Lie and Jordan superalgebras and play a central role in the theory of polynomial identities with involution, as showed in the framework developed by Aljadeff, Giambruno, and Karasik in [2]. We provide a complete description of the identities of UT, where the grading is induced by the sequence and the superinvolution is the super-symplectic one. This work extends previous classifications obtained for the cases and , and addresses an open problem for . In the last part of the paper, we investigate the image of multilinear polynomials on the superalgebra UT with superinvolution, showing that the image is a vector space if and only if , thus contributing to an analogue of the L'vov-Kaplansky conjecture in this context.
Cite
@article{arxiv.2509.09428,
title = {Upper triangular matrices with superinvolution: identities and images of multilinear polynomials},
author = {Elena Campedel and Pedro Fagundes and Antonio Ioppolo},
journal= {arXiv preprint arXiv:2509.09428},
year = {2025}
}
Comments
26 pages