The following pages link to Subdivisions of toric complexes (Q2487139):
Displaying 24 items.
- A finite subdivision rule for the \(n\)-dimensional torus (Q387575) (← links)
- On the Koszul property of toric face rings (Q405387) (← links)
- Gröbner bases and Betti numbers of monoidal complexes (Q841521) (← links)
- Cohomology of partially ordered sets and local cohomology of section rings (Q854100) (← links)
- On toric face rings (Q878675) (← links)
- The Veronese construction for formal power series and graded algebras (Q1015174) (← links)
- Local \(h\)-vectors of quasi-geometric and barycentric subdivisions (Q1716005) (← links)
- On the real-rootedness of the local \(h\)-polynomials of edgewise subdivisions (Q1733935) (← links)
- Enumerative \(g\)-theorems for the Veronese construction for formal power series and graded algebras (Q1761475) (← links)
- Seminormality and local cohomology of toric face rings (Q1952154) (← links)
- Gamma-positivity in combinatorics and geometry (Q1993954) (← links)
- Real-rootedness of variations of Eulerian polynomials (Q2002048) (← links)
- Derangements, Ehrhart theory, and local \(h\)-polynomials (Q2182261) (← links)
- The subdivision schemes of Besicovitch and Cantor (Q2210351) (← links)
- Binomial Eulerian polynomials for colored permutations (Q2305997) (← links)
- Combinatorics and Algebra of Geometric Subdivision Operations (Q2974697) (← links)
- On Canonical Modules of Toric Face Rings (Q3638221) (← links)
- Asymptotic syzygies of Stanley-Reisner rings of iterated subdivisions (Q4600427) (← links)
- Interlacing polynomials and the veronese construction for rational formal power series (Q4960359) (← links)
- The local $h$-polynomial of the edgewise subdivision of the simplex (Q4972030) (← links)
- Compactifications of subvarieties of tori (Q5756315) (← links)
- Subdivisions of shellable complexes (Q5918440) (← links)
- On the \(f\)-vectors of \(r\)-multichain subdivisions (Q6098093) (← links)
- On the homeomorphism and homotopy type of complexes of multichains (Q6170059) (← links)
