Title: Shellability of complexes over lattices
| Speaker: | Tovohery Randrianarisoa |
| Affiliation: | Umeå University |
| Location: | Please email Sabrina Lato for Zoom link |
Abstract: In this work, we introduce the notion of power lattices, which are a more general class of ranked lattices with additional properties. Then we generalize the concept of shellable simplicial complexes in the lattice of subsets to P-shellable P-complexes in a power lattice P. We show that when the P-complex is P-shellable, its order complex is a shellable simplicial complex. We demonstrate that these P-complexes can be constructed by generalizing the concept of matroids to matroids in a power lattice P. This provides various constructions of posets with desirable topological and algebraic properties. In the particular class of lattices of multiset subsets, we show how to construct shellable 'multicomplexes' from weighted graphs. Finally, we illustrate how shellable multicomplexes give rise to rings that are sequentially Cohen-Macaulay.