# Algebraic $h$-vectors of simplicial complexes through local cohomology,   part 1

**Authors:** Connor Sawaske

arXiv: 1907.12620 · 2019-07-31

## TL;DR

This paper offers a topological formula for the algebraic $h$-vector component of any simplicial complex's Stanley--Reisner ring after linear reduction, broadening understanding beyond special classes.

## Contribution

It introduces a topological expression for the $h_{d-1}$-vector component applicable to all simplicial complexes, extending previous results limited to specific classes.

## Key findings

- Provides a compact topological formula for $h_{d-1}$ of any complex.
- Develops tools for extending Hilbert series computations to other coefficients.
- Broadens the scope of algebraic and topological analysis of simplicial complexes.

## Abstract

Given an infinite field $\mathbb{k}$ and a simplicial complex $\Delta$, a common theme in studying the $f$- and $h$-vectors of $\Delta$ has been the consideration of the Hilbert series of the Stanley--Reisner ring $\mathbb{k}[\Delta]$ modulo a generic linear system of parameters $\Theta$. Historically, these computations have been restricted to special classes of complexes (most typically triangulations of spheres or manifolds). We provide a compact topological expression of $h_{d-1}^\mathfrak{a}(\Delta)$, the dimension over $\mathbb{k}$ in degree $d-1$ of $\mathbb{k}[\Delta]/(\Theta)$, for any complex $\Delta$ of dimension $d-1$. In the process, we provide tools and techniques for the possible extension to other coefficients in the Hilbert series.

## Full text

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## References

15 references — full list in the complete paper: https://tomesphere.com/paper/1907.12620/full.md

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Source: https://tomesphere.com/paper/1907.12620