Higher cotangent cohomology for Stanley-Reisner rings

Abstract

Inspired by work of Altmann and Christophersen, we study the graded pieces of the cotangent cohomology TiSK, i≥ 3 of the Stanley-Reisner ring SK associated to a simplicial complex K. We prove a localization formula allowing one to reduce to the case of negative weights. Our results give a complete description of T3 and T4 in terms of the topology of K whenever K is a flag complex. As an application, we give a sufficient criterion for the vanishing of T3 for simplicial spheres, classify two-spheres that have vanishing T3, and show that the boundary complex of the dual associahedron has vanishing T3. Our results make use of the arborescent resolutions considered by Hancharuk, Laurent-Gengoux, and Strobl. We give an alternative and self-contained treatment of these resolutions that may be of independent interest.