Computing super matrix invariants. (Q408113)

Invariant theory of matrices studies the algebra of invariants of the general linear group \(\text{GL}_k(F)\) over a field \(F\) of characteristic 0 acting by simultaneous conjugation on the \(n\)-tuples of \(k\times k\) matrices. In [Trans. Am. Math. Soc. 309, No. 2, 581-589 (1988; Zbl 0706.16015)], the author of the paper under review obtained super- or \(\mathbb Z_2\)-analogues of some of the main results of the invariant theory of matrices, considering the invariants of the general linear Lie superalgebras.NEWLINENEWLINE The goal of the present paper is to establish super-analogues of results of \textit{E. Formanek} [J. Algebra 89, 178-223 (1984; Zbl 0549.16008)]. In particular, the author develops computational methods for the super-invariants involving complex integrals and inner products of Schur functions. As an application, explicit computations for matrices of small size are given.