Commuting matrices via commuting endomorphisms
Abstract
Evidences have suggested that counting representations are sometimes tractable even when the corresponding classification problem is almost impossible, or "wild" in a precise sense. Such counting problems are directly related to matrix counting problems, many of which are under active research. Using a general framework we formulate for such counting problems, we reduce some counting problems about commuting matries to problems about endomorphisms on all finite abelian -groups. As an application, we count finite modules on some first examples of nonreduced curves over . We also relate some classical and hard problems regarding commuting triples of matrices to a conjecture of Onn on counting conjugacy classes of the automorphism group of an arbitrary finite abelian -group.
Cite
@article{arxiv.2404.19483,
title = {Commuting matrices via commuting endomorphisms},
author = {Yifeng Huang},
journal= {arXiv preprint arXiv:2404.19483},
year = {2024}
}
Comments
19 pages