English

The Poincar\'e-extended ab-index

Combinatorics 2024-12-10 v5

Abstract

Motivated by a conjecture concerning Igusa local zeta functions for intersection posets of hyperplane arrangements, we introduce and study the Poincar\'e-extended ab-index, which generalizes both the ab-index and the Poincar\'e polynomial. For posets admitting R-labelings, we give a combinatorial description of the coefficients of the extended ab-index, proving their nonnegativity. In the case of intersection posets of hyperplane arrangements, we prove the above conjecture of the second author and Voll as well as another conjecture of the second author and K\"uhne. We also define the pullback ab-index generalizing the cd-index of face posets for oriented matroids. Our results recover, generalize and unify results from Billera-Ehrenborg-Readdy, Bergeron-Mykytiuk-Sottile-van Willigenburg, Saliola-Thomas, and Ehrenborg. This connection allows us to translate our results into the language of quasisymmetric functions, and-in the special case of symmetric functions-make a conjecture about Schur positivity. A proof of this conjecture now appears an appendix by Ricky Ini Liu.

Keywords

Cite

@article{arxiv.2301.05904,
  title  = {The Poincar\'e-extended ab-index},
  author = {Galen Dorpalen-Barry and Joshua Maglione and Christian Stump},
  journal= {arXiv preprint arXiv:2301.05904},
  year   = {2024}
}

Comments

v5: incorporated referee feedback, version to appear in JLMS; v4: Added an appendix from Ricky Ini Liu with a proof of Conjecture 3.5

R2 v1 2026-06-28T08:11:41.732Z