*-Graded Capelli Polynomials and their Asymptotic

Abstract

Let F Y Z, be the free -superalgebra over a field F of characteristic zero and let M, L be the TZ2-ideal generated by the set of the -graded Capelli polynomials Cap(Z2, )M+ [Y+,X], Cap(Z2, )M- [Y-,X], Cap(Z2, )L+ [Z+,X], Cap(Z2, )L- [Z-,X] alternating on M+ symmetric variables of homogeneous degree zero, on M- skew variables of homogeneous degree zero, on L+ symmetric variables of homogeneous degree one and on L- skew variables of homogeneous degree one, respectively. We study the asymptotic behavior of the sequence of -graded codimensions of M, L. In particular we prove that the -graded codimensions of the finite dimensional simple -superalgebras are asymptotically equal to the -graded codimensions of M, L, for some fixed natural numbers M+, M-, L+ and L-.