English

The structured Gerstenhaber problem (I)

Rings and Algebras 2018-04-24 v1

Abstract

Let bb be a symmetric or alternating bilinear form on a finite-dimensional vector space VV. When the characteristic of the underlying field is not 22, we determine the greatest dimension for a linear subspace of nilpotent bb-symmetric or bb-alternating endomorphisms of VV, expressing it as a function of the dimension, the rank, and the Witt index of bb. Similar results are obtained for subspaces of nilpotent bb-Hermitian endomorphisms when bb is a Hermitian form with respect to a non-identity involution. In three situations (bb-symmetric endomorphisms when bb is symmetric, bb-alternating endomorphisms when bb is alternating, and bb-Hermitian endomorphisms when bb is Hermitian and the underlying field has more than 22 elements), we also characterize the linear subspaces with the maximal dimension. Our results are wide generalizations of results of Meshulam and Radwan, who tackled the case of a non-degenerate symmetric bilinear form over the field of complex numbers, and recent results of Bukov\v{s}ek and Omladi\v{c}, in which the spaces with maximal dimension were determined when the underlying field is the one of complex numbers, the bilinear form bb is symmetric and non-degenerate, and one considers bb-symmetric endomorphisms.

Keywords

Cite

@article{arxiv.1804.07938,
  title  = {The structured Gerstenhaber problem (I)},
  author = {Clément de Seguins Pazzis},
  journal= {arXiv preprint arXiv:1804.07938},
  year   = {2018}
}

Comments

40 pages

R2 v1 2026-06-23T01:30:58.952Z