English

Algebraic Shifting Increases Relative Homology

Algebraic Topology 2016-09-07 v1

Abstract

\newcommand{\rhomi}[1]{\widetilde{H}_{#1}} \newcommand{\rbeti}[1]{\beta_{#1}} \newcommand{\kk}{\mathbf k} \newcommand{\dimk}{\dim_{\kk}} We show that algebraically shifting a pair of simplicial complexes weakly increases their relative homology Betti numbers in every dimension. More precisely, let Δ(K)\Delta(K) denote the algebraically shifted complex of simplicial complex KK, and let \rbetij(K,L)=\dimk\rhomij(K,L;\kk)\rbeti{j}(K,L)=\dimk \rhomi{j}(K,L;\kk) be the dimension of the jjth reduced relative homology group over a field \kk\kk of a pair of simplicial complexes LKL \subseteq K. Then \rbetij(K,L)\rbetij(Δ(K),Δ(L))\rbeti{j}(K,L) \leq \rbeti{j}(\Delta(K),\Delta(L)) for all jj. The theorem is motivated by somewhat similar results about Gr\"obner bases and generic initial ideals. Parts of the proof use Gr\"obner basis techniques.

Keywords

Cite

@article{arxiv.math/9809195,
  title  = {Algebraic Shifting Increases Relative Homology},
  author = {Art M. Duval},
  journal= {arXiv preprint arXiv:math/9809195},
  year   = {2016}
}