Ehrhart clutters: regularity and max-flow min-cut.
Ein einfacher Beweis des Satzes von Euler-Schläfli.
Ein elementarer und konstruktiver Beweis für die Zerlegungsgleichheit der Hill'schen Tetraeder mit einem Quader.
Ein Subtraktionssatz der Polyederalgebra
Ein Zerlegungssatz für punktsymmetrische konvexe Vielecke.
Eine Charakterisierung der Polyeder.
Eine Familie von geschlossenen gleichflächigen Polyedern, die fast beweglich sind.
Embedding a Polytope in a Lattice.
Enumeration of integral tetrahedra.
Equidecomposability of Polyhedra with Reference to Crystallographic Groups.
Equidissections of centrally symmetric octagons.
Equifacetted 3-Spheres as Topes of Non-polytopal Matroid Polytopes.
Equivariant classification of 2-torus manifolds
We consider locally standard 2-torus manifolds, which are a generalization of small covers of Davis and Januszkiewicz and study their equivariant classification. We formulate a necessary and sufficient condition for two locally standard 2-torus manifolds over the same orbit space to be equivariantly homeomorphic. This leads us to count the equivariant homeomorphism classes of locally standard 2-torus manifolds with the same orbit space.
Equivariant fiber polytopes.
Eulers Charakteristik und die Beschränktheit konvexer Polyeder.
Euler's Polyhedron Formula
Euler's polyhedron theorem states for a polyhedron p, thatV - E + F = 2,where V, E, and F are, respectively, the number of vertices, edges, and faces of p. The formula was first stated in print by Euler in 1758 [11]. The proof given here is based on Poincaré's linear algebraic proof, stated in [17] (with a corrected proof in [18]), as adapted by Imre Lakatos in the latter's Proofs and Refutations [15].As is well known, Euler's formula is not true for all polyhedra. The condition on polyhedra considered...
Eulersche Charakteristik, Projektionen und Quermaßintegrale.
Extendable Shelling, Simplicial and Toric h-vector of Some Polytopes
Extension Spaces of Oriented Matroids.
Exterior Algebra and Projections of Polytopes.