# Hodge theory in combinatorics

**Authors:** Matthew Baker

arXiv: 1705.07960 · 2017-06-05

## TL;DR

This paper surveys recent advances in combinatorial Hodge theory, including proofs of the Rota-Welsh conjecture, by translating algebraic geometry concepts into combinatorial frameworks.

## Contribution

It reviews the combinatorial proof of the Rota-Welsh conjecture, extending Hodge theory techniques beyond algebraic geometry to matroids.

## Key findings

- Proof of the Rota-Welsh conjecture using combinatorial methods
- Establishment of combinatorial analogues of Hard Lefschetz and Hodge-Riemann relations
- Development of inductive combinatorial proofs for key geometric principles

## Abstract

George Birkhoff proved in 1912 that the number of proper colorings of a finite graph G with n colors is a polynomial in n, called the chromatic polynomial of G. Read conjectured in 1968 that for any graph G, the sequence of absolute values of coefficients of the chromatic polynomial is unimodal: it goes up, hits a peak, and then goes down. Read's conjecture was proved by June Huh in a 2012 paper making heavy use of methods from algebraic geometry. Huh's result was subsequently refined and generalized by Huh and Katz, again using substantial doses of algebraic geometry. Both papers in fact establish log-concavity of the coefficients, which is stronger than unimodality.   The breakthroughs of Huh and Huh-Katz left open the more general Rota-Welsh conjecture where graphs are generalized to (not necessarily representable) matroids and the chromatic polynomial of a graph is replaced by the characteristic polynomial of a matroid. The Huh and Huh-Katz techniques are not applicable in this level of generality, since there is no underlying algebraic geometry to which to relate the problem. But in 2015 Adiprasito, Huh, and Katz announced a proof of the Rota-Welsh conjecture based on a novel approach motivated by but not making use of any results from algebraic geometry. The authors first prove that the Rota-Welsh conjecture would follow from combinatorial analogues of the Hard Lefschetz Theorem and Hodge-Riemann relations in algebraic geometry. They then implement an elaborate inductive procedure to prove the combinatorial Hard Lefschetz Theorem and Hodge-Riemann relations using purely combinatorial arguments.   We will survey these developments.

## Full text

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## Figures

5 figures with captions in the complete paper: https://tomesphere.com/paper/1705.07960/full.md

## References

29 references — full list in the complete paper: https://tomesphere.com/paper/1705.07960/full.md

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Source: https://tomesphere.com/paper/1705.07960