Spanning Trees and Mahler Measure
Combinatorics
2016-02-10 v1 Geometric Topology
Abstract
The complexity of a finite connected graph is its number of spanning trees; for a non-connected graph it is the product of complexities of its connected components. If is an infinite graph with cofinite free -symmetry, then the logarithmic Mahler measure of its Laplacian polynomial is the exponential growth rate of the complexity of finite quotients of . It is bounded below by , where is the grid graph of dimension . The growth rates are asymptotic to as tends to infinity. If , then . An application to determinant growth rates of families of alternating links arising from planar graphs is given.
Keywords
Cite
@article{arxiv.1602.02797,
title = {Spanning Trees and Mahler Measure},
author = {Daniel S. Silver and Susan G. Williams},
journal= {arXiv preprint arXiv:1602.02797},
year = {2016}
}
Comments
12 pages, 1 figure