English

Matrix Points on Varieties

Algebraic Geometry 2025-10-28 v2 Combinatorics Representation Theory

Abstract

We study the cohomology of Cn(X)C_n(X), the moduli space of commuting nn-by-nn matrices satisfying the equations defining a variety XX. This space can be viewed as a non-commutative Weil restriction from the algebra of nn-by-nn matrices to the ground field. We introduce a ``Fermionic" counterpart Sn(X)S_n(X), constructed as a convolution Xn×SnGLn/TnX^n \times^{S_n} \mathrm{GL}_n/\mathrm{T}_n. Our main result establishes that a natural map σ ⁣:Sn(X)Cn(X)\sigma \colon S_n(X) \to C_n(X) induces an isomorphism on \ell-adic cohomology under mild conditions on XX or the characteristic of the field. This confirms a heuristic derived from the classical theory of Weil restrictions and highlights a version of Boson-Fermion correspondence. Furthermore, we derive explicit combinatorial formulae for the Betti numbers of Cn(X)C_n(X) and a Macdonald-type generating series. Finally we prove a Hermitian variant of our main result.

Keywords

Cite

@article{arxiv.2510.13380,
  title  = {Matrix Points on Varieties},
  author = {Asvin G and Yifeng Huang and Ruofan Jiang and Yifan Wei},
  journal= {arXiv preprint arXiv:2510.13380},
  year   = {2025}
}

Comments

17 pages, comments welcome! Updated the introduction. Updated the proof in section 2, now the proof is valid in all charactertics

R2 v1 2026-07-01T06:38:37.609Z