Colorings, determinants and Alexander polynomials for spatial graphs

Terry Kong, Alec Lewald, Blake Mellor, Vadim Pigrish

Research output: Contribution to journalArticlepeer-review

Abstract

A balanced spatial graph has an integer weight on each edge, so that the directed sum of the weights at each vertex is zero. We describe the Alexander module and polynomial for balanced spatial graphs (originally due to Kinoshita cite{8}), and examine their behavior under some common operations on the graph. We use the Alexander module to define the determinant and p-colorings of a balanced spatial graph, and provide examples. We show that the determinant of a spatial graph determines for which p the graph is p-colorable, and that a p-coloring of a graph corresponds to a representation of the fundamental group of its complement into a metacyclic group (p,m,k). We finish by proving some properties of the Alexander polynomial.

Original languageAmerican English
Pages (from-to)1-14
JournalJournal of Knot Theory and its Ramifications
Volume25
Issue number4
StatePublished - Jan 18 2016

Keywords

  • spatial graphs
  • p-colorings
  • Alexander polynomial

Disciplines

  • Geometry and Topology

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