How many faces does a (simplicial) polyhedron have?
From MaRDI portal
Publication:6561735
zbMath1546.52011MaRDI QIDQ6561735
Publication date: 25 June 2024
Published in: La Gaceta de la Real Sociedad Matemática Española (Search for Journal in Brave)
Combinatorial properties of polytopes and polyhedra (number of faces, shortest paths, etc.) (52B05) Simplicial sets and complexes in algebraic topology (55U10)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Many triangulated odd-dimensional spheres
- Hard Lefschetz theorem for simple polytopes
- The algebra of continuous piecewise polynomials
- Upper bounds for configurations and polytopes in \({\mathbb{R}}^ d\)
- Many triangulated spheres
- The number of faces of a simplicial convex polytope
- A proof of the sufficiency of McMullen's conditions for f-vectors of simplicial convex polytopes
- Cohen-Macaulay quotients of polynomial rings
- On simple polytopes
- Some properties of enumeration in the theory of modular systems.
- The relations connecting the angle-sums and volume of a polytope in space of \(n\) dimensions.
- L'analysis situs et la géométrie algébrique.
- Über die \textit{Euler}schen Polyederrelationen.
- Combinatorics and commutative algebra.
- Weights on polytopes
- The numbers of faces of simplicial polytopes
- The number of polytopes, configurations and real matroids
- The Upper Bound Conjecture and Cohen-Macaulay Rings
- Lectures on Polytopes
- A Combinatorial Analogue of Poincaré's Duality Theorem
- The maximum numbers of faces of a convex polytope
This page was built for publication: How many faces does a (simplicial) polyhedron have?
