English

Free relations for matrix invariants in modular case

Representation Theory 2012-07-24 v2 Algebraic Geometry Rings and Algebras

Abstract

A classical linear group G<GL(n)G<GL(n) acts on dd-tuples of n×nn\times n matrices by simultaneous conjugation. Working over an infinite field of characteristic different from two we establish that the ideal of free relations, i.e. relations valid for matrices of any order, between generators for matrix O(n)- and \Sp(n)\Sp(n)-invariants is zero. We also prove similar result for invariants of mixed representations of quivers. These results can be considered as a generalization of the characteristic isomorphism ch:\SymJ{\rm ch}:\Sym\to J between the graded ring \Sym=d=0\Symd\Sym=\otimes_{d=0}^{\infty} \Sym_d, where \Symd\Sym_d is the character group of the symmetric group SdS_d, and the inverse limit JJ with respect to nn of rings of symmetric polynomials in nn variables. As a consequence, we complete the description of relations between generators for O(n)-invariants as well as the description of relations for invariants of mixed representations of quivers. We also obtain an independent proof of the result that the ideal of free relations for GL(n)GL(n)-invariants is zero, which was proved by Donkin in [Math. Proc. Cambridge Philos. Soc. 113 (1993), 23--43].

Keywords

Cite

@article{arxiv.1011.5201,
  title  = {Free relations for matrix invariants in modular case},
  author = {A. A. Lopatin},
  journal= {arXiv preprint arXiv:1011.5201},
  year   = {2012}
}

Comments

15 pages

R2 v1 2026-06-21T16:48:03.206Z