A spectral theory for combinatorial dynamics
Abstract
This article proposes a framework for the study of periodic maps from a (typically finite) set to itself when the set is equipped with one or more real- or complex-valued functions. The main idea, inspired by the time-evolution operator construction from ergodic theory, is the introduction of a vector space that contains the given functions and is closed under composition with , along with a time-evolution operator on that vector space. I show that the invariant functions and 0-mesic functions span complementary subspaces associated respectively with the eigenvalue 1 and the other eigenvalues. Alongside other examples, I give an explicit description of the spectrum of the evolution operator when is the set of -element multisets with elements in , increments each element of a multiset by 1 mod , and (with ) maps a multiset to its th smallest element.
Cite
@article{arxiv.2105.11568,
title = {A spectral theory for combinatorial dynamics},
author = {James Propp},
journal= {arXiv preprint arXiv:2105.11568},
year = {2021}
}
Comments
Submitted to Algebraic Combinatorics, May 24, 2021