English

Commuting Varieties and Cohomological Complexity

Representation Theory 2022-04-05 v2

Abstract

In this paper we determine, for all rr sufficiently large, the irreducible component(s) of maximal dimension of the variety of commuting rr-tuples of nilpotent elements of gln\mathfrak{gl}_n. Our main result is that in characteristic 2,3\neq 2,3, this nilpotent commuting variety has dimension (r+1)n24(r+1)\lfloor \frac{n^2}{4}\rfloor for n4n\geq 4, r7r\geq 7. We use this to find the dimension of the (ordinary) rr-th commuting varieties of gln\mathfrak{gl}_n and sln\mathfrak{sl}_n for the same range of values of rr and nn. Our principal motivation is the connection between nilpotent commuting varieties and cohomological complexity of finite group schemes, which we exploit in the last section of the paper to obtain explicit values for complexities of a large family of modules over the rr-th Frobenius kernel (GLn)(r)({\rm GL}_n)_{(r)}. These results indicate an inequality between the complexities of a rational GG-module MM when restricted to G(r)G_{(r)} or to G(Fpr)G(\mathbb F_{p^r}); we subsequently establish this inequality for every simple algebraic group GG defined over an algebraically closed field of good characteristic, significantly extending a result of Lin and Nakano.

Keywords

Cite

@article{arxiv.2105.07918,
  title  = {Commuting Varieties and Cohomological Complexity},
  author = {Nham V. Ngo and Paul D. Levy and Klemen Šivic},
  journal= {arXiv preprint arXiv:2105.07918},
  year   = {2022}
}

Comments

29 pages, no figures. Final version, to appear in the Journal of the London Mathematical Society

R2 v1 2026-06-24T02:11:11.892Z