Add to ORKGWe prove a theorem allowing us to find convex-ear decompositions for rankselected subposets of posets that are unions of Boolean sublattices in a coherent fashion. We then apply this theorem to geometric lattices and face posets of shellable complexes, obtaining new inequalities for their h-vectors. Finally, we use the latter decomposition to give a new interpretation to inequalities satisfied by the flag h-vectors of face posets of Cohen-Macaulay complexes.
AbstractIf Δ is a Cohen-Macaulay simplicial complex of dimension d - 1 and Δ′ is a Cohen-Macaulay su...
In this paper we describe the convex hulls of the sets of f- and β-vectors of different classes of s...
The flag Whitney numbers (also referred to as the flag f-numbers) of a geometric lattice count the n...
Possibly the most fundamental combinatorial invariant associated to a finite simplicial complex is i...
Possibly the most fundamental combinatorial invariant associated to a finite simplicial complex is i...
Let L be a supersolvable lattice with non-zero Möbius function. We show that the order complex of a...
AbstractChari proved that if Δ is a (d−1)-dimensional simplicial complex with a convex ear decomposi...
Thesis (Ph.D.)--University of Washington, 2022A key tool that combinatorialists use to study simplic...
This thesis consist of the following three papers. Convex hull of face vectors of colored complexes....
AbstractEvery arrangement H of affine hyperplanes in Rd determines a partition of Rd into open topol...
Starting from an unpublished conjecture of Kalai and from a conjecture of Eisenbud, Green and Harris...
The proper parts of face lattices of convex polytopes are shown to satisfy a strong form of the Cohe...
Starting from an unpublished conjecture of Kalai and from a conjecture of Eisenbud, Green and Harris...
AbstractIf Δ is a Cohen-Macaulay simplicial complex of dimension d - 1 and Δ′ is a Cohen-Macaulay su...
In this paper we verify a conjecture by Kozlov [D.N. Kozlov, Convex Hulls of f- and beta-vectors, Di...
AbstractIf Δ is a Cohen-Macaulay simplicial complex of dimension d - 1 and Δ′ is a Cohen-Macaulay su...
In this paper we describe the convex hulls of the sets of f- and β-vectors of different classes of s...
The flag Whitney numbers (also referred to as the flag f-numbers) of a geometric lattice count the n...
Possibly the most fundamental combinatorial invariant associated to a finite simplicial complex is i...
Possibly the most fundamental combinatorial invariant associated to a finite simplicial complex is i...
Let L be a supersolvable lattice with non-zero Möbius function. We show that the order complex of a...
AbstractChari proved that if Δ is a (d−1)-dimensional simplicial complex with a convex ear decomposi...
Thesis (Ph.D.)--University of Washington, 2022A key tool that combinatorialists use to study simplic...
This thesis consist of the following three papers. Convex hull of face vectors of colored complexes....
AbstractEvery arrangement H of affine hyperplanes in Rd determines a partition of Rd into open topol...
Starting from an unpublished conjecture of Kalai and from a conjecture of Eisenbud, Green and Harris...
The proper parts of face lattices of convex polytopes are shown to satisfy a strong form of the Cohe...
Starting from an unpublished conjecture of Kalai and from a conjecture of Eisenbud, Green and Harris...
AbstractIf Δ is a Cohen-Macaulay simplicial complex of dimension d - 1 and Δ′ is a Cohen-Macaulay su...
In this paper we verify a conjecture by Kozlov [D.N. Kozlov, Convex Hulls of f- and beta-vectors, Di...
AbstractIf Δ is a Cohen-Macaulay simplicial complex of dimension d - 1 and Δ′ is a Cohen-Macaulay su...
In this paper we describe the convex hulls of the sets of f- and β-vectors of different classes of s...
The flag Whitney numbers (also referred to as the flag f-numbers) of a geometric lattice count the n...