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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.

Helmut Groemer (1972)

Mathematische Annalen

Even astral configurations.

Berman, Leah Wrenn (2004)

The Electronic Journal of Combinatorics [electronic only]

Evolutes and isoperimetric deficit in two-dimensional spaces of constant curvature

Julià Cufí, Agustí Reventós (2014)

Archivum Mathematicum

We relate the total curvature and the isoperimetric deficit of a curve $γ$ in a two-dimensional space of constant curvature with the area enclosed by the evolute of $γ$ . We provide also a Gauss-Bonnet theorem for a special class of evolutes.

We show that discrete exponentials form a basis of discrete holomorphic functions on a finite critical map. On a combinatorially convex set, the discrete polynomials form a basis as well.

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Euclidean Convexity Cannot be Compactified.

Euclidean Number Fields of Large Degree

Euclidean perimeter of classes of optimal convex lattice $2 k$ -gons.

Eulers Charakteristik und die Beschränktheit konvexer Polyeder.

Euler's Polyhedron Formula

Eulersche Charakteristik, Projektionen und Quermaßintegrale.

Even astral configurations.

Evolutes and isoperimetric deficit in two-dimensional spaces of constant curvature

Examples of convex functions and classifications of normed spaces.

Existence et unicité du maximum d'une forme linéaire sur un ensemble de matrices diagonales

Existence of open quasiconvex subsets dense in a given space

Existence theorems for some optimal control problems

Expectation and variance of the volume covered by a large number of independent random sets

Expectation of Random Polytopes.

Explicit Ramsey graphs and Erdős distance problems over finite Euclidean and non-Euclidean spaces.

Exponentials Form a Basis of Discrete Holomorphic Functions on a Compact

Extendable Shelling, Simplicial and Toric h-vector of Some Polytopes

Extension and Selection theorems in Topological spaces with a generalized convexity structure

Extension of Cm, omega-Smooth Functions by Linear Operators.

Extension Spaces of Oriented Matroids.

Currently displaying 81 – 100 of 117