English

The Type Defect of a Simplicial Complex

Commutative Algebra 2019-01-30 v3 Combinatorics

Abstract

Fix a field kk. When Δ\Delta is a simplicial complex on nn vertices with Stanley-Reisner ideal IΔI_\Delta, we define and study an invariant called the type defect\textit{type defect} of Δ\Delta. Except when Δ\Delta is of a single simplex, the type defect of Δ\Delta, td(Δ)\textrm{td}(\Delta), is the difference dimkTorcS(S/IΔ,k)c \dim_k \textrm{Tor}_c^S(S/ I_\Delta,k) - c, where cc is the codimension of Δ\Delta and S=k[x1,xn]S = k[x_1, \ldots x_n]. We show that this invariant admits surprisingly nice properties. For example, it is well-behaved when one glues two complexes together along a face. Furthermore, Δ\Delta is Cohen-Macaulay if td(Δ)0\textrm{td}(\Delta) \leq 0. On the other hand, if Δ\Delta is a simple graph (viewed as a one-dimensional complex), then td(Δ)0\textrm{td}(\Delta') \geq 0 for every induced subgraph Δ\Delta' of Δ\Delta if and only if Δ\Delta is chordal. Requiring connected induced subgraphs to have type defect zero allows us to define a class of graphs that we call treeish\textit{treeish}, and which we generalize to simplicial complexes. We then extend some of our chordality results to higher dimensions, proving sharp lower bounds for most Betti numbers of ideals with linear resolution, and classifying when equalities occur. As an application, we prove sharp lower bounds for Betti numbers of graded ideals (not necessarily monomial) with linear resolution.

Keywords

Cite

@article{arxiv.1704.01243,
  title  = {The Type Defect of a Simplicial Complex},
  author = {Hailong Dao and Jay Schweig},
  journal= {arXiv preprint arXiv:1704.01243},
  year   = {2019}
}

Comments

Several minor changes were made following suggestions by referees. Final version

R2 v1 2026-06-22T19:07:57.282Z