English

Loop space construction of bigraphs and box complexes

Algebraic Topology 2016-10-20 v1

Abstract

Dochtermann introduced the loop space construction of a based graph (G,v)(G,v) whose basepoint is a looped vertex. He showed that the complex C(Ω(G,v))C(\Omega(G,v)) is homotopy equivalent to the loop space Ω(C(G),v)\Omega(C(G),v) of C(G)C(G). Here we write C(G)C(G) to mean the clique complex of the maximal reflexive subgraph of GG. In this paper, we consider its bigraph version. A bigraph is a graph equipped with its 2-coloring. We introduce the loop space construction Ω/K2(X,x)\Omega_{/K_2}(X,x) of a based bigraph (X,x)(X,x). This is a graph such that C(Ω/K2(X,x))C(\Omega_{/K_2}(X,x)) is homotopy equivalent to the loop space of the box complex B/K2(X)B_{/K_2}(X) of the bigraph. As a result, we have alternative proofs of some results of Matsushita and Schultz.

Keywords

Cite

@article{arxiv.1610.05924,
  title  = {Loop space construction of bigraphs and box complexes},
  author = {Takahiro Matsushita},
  journal= {arXiv preprint arXiv:1610.05924},
  year   = {2016}
}

Comments

13 pages, 1 figure

R2 v1 2026-06-22T16:25:07.099Z