Berezinians, Exterior Powers and Recurrent Sequences
Abstract
We study power expansions of the characteristic function of a linear operator in a -dimensional superspace . We show that traces of exterior powers of satisfy universal recurrence relations of period . `Underlying' recurrence relations hold in the Grothendieck ring of representations of . They are expressed by vanishing of certain Hankel determinants of order in this ring, which generalizes the vanishing of sufficiently high exterior powers of an ordinary vector space. In particular, this allows to explicitly express the Berezinian of an operator as a rational function of traces. We analyze the Cayley--Hamilton identity in a superspace. Using the geometric meaning of the Berezinian we also give a simple formulation of the analog of Cramer's rule.
Cite
@article{arxiv.math/0309188,
title = {Berezinians, Exterior Powers and Recurrent Sequences},
author = {H. M. Khudaverdian and Th. Th. Voronov},
journal= {arXiv preprint arXiv:math/0309188},
year = {2015}
}
Comments
35 pages. LaTeX 2e. New version: paper substantially reworked and expanded, new results included