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Let $ℳ^{d}$ be a d-dimensional normed space with norm ||·|| and let B be the unit ball in $ℳ^{d}$ . Let us fix a Lebesgue measure $V_{B}$ in $ℳ^{d}$ with $V_{B} (B) = 1$ . This measure will play the role of the volume in $ℳ^{d}$ . We consider an arbitrary simplex T in $ℳ^{d}$ with prescribed edge lengths. For the case d = 2, sharp upper and lower bounds of $V_{B} (T)$ are determined. For d ≥ 3 it is noticed that the tight lower bound of $V_{B} (T)$ is zero.

On braxtopes, a class of generalized simplices.

Bayer, Margaret M., Bisztriczky, Tibor (2008)

Beiträge zur Algebra und Geometrie

On Convex Bodies that Permit Packings of High Density.

H. Groemer (1990)

Discrete & computational geometry

On Convex Body Chasing.

J. Friedman, N. Linial (1993)

Discrete & computational geometry

On deformations of spherical isometric foldings

Ana M. Breda, Altino F. Santos (2010)

Czechoslovak Mathematical Journal

The behavior of special classes of isometric foldings of the Riemannian sphere $S^{2}$ under the action of angular conformal deformations is considered. It is shown that within these classes any isometric folding is continuously deformable into the standard spherical isometric folding $f_{s}$ defined by $f_{s} (x, y, z) = (x, y, | z |)$ .

On face vectors of trivalent maps

Stanislav Jendroľ (1986)

Mathematica Slovaca

On faces of a convex polyhedron in $ℝ^{3}$ with a small number of sides.

Kharazishvili, A. (2003)

Georgian Mathematical Journal

On face-vectors and vertex-vectors of polyhedral maps on orientable $2$ -manifolds

Stanislav Jendroľ (1993)

Mathematica Slovaca

On homotopy types of 2-dimensional polyhedra

Karol Borsuk, Anna Gmurczyk (1980)

Fundamenta Mathematicae

On hyperbolic virtual polytopes and hyperbolic fans

Gaiane Panina (2006)

Open Mathematics

Hyperbolic virtual polytopes arose originally as polytopal versions of counterexamples to the following A.D.Alexandrov’s uniqueness conjecture: Let K ⊂ ℝ3 be a smooth convex body. If for a constant C, at every point of ∂K, we have R 1 ≤ C ≤ R 2 then K is a ball. (R 1 and R 2 stand for the principal curvature radii of ∂K.) This paper gives a new (in comparison with the previous construction by Y.Martinez-Maure and by G.Panina) series of counterexamples to the conjecture. In particular, a hyperbolic...

On Hyperplanes and Polytopes.

K. Bezdek, T. Bisztriczky (1990)

Monatshefte für Mathematik

On Lattice Points in Polyhedral Cross-Sections.

N.M. Korneenko, N.N. Metelskij (1993)

Discrete & computational geometry

On lattice polytopes having interior lattice points.

J.M. Wills, J. Zaks, M.A. Perles (1982)

Elemente der Mathematik

On light subgraphs in plane graphs of minimum degree five

Stanislav Jendrol', Tomáš Madaras (1996)

Discussiones Mathematicae Graph Theory

A subgraph of a plane graph is light if the sum of the degrees of the vertices of the subgraph in the graph is small. It is well known that a plane graph of minimum degree five contains light edges and light triangles. In this paper we show that every plane graph of minimum degree five contains also light stars $K_{1, 3}$ and $K_{1, 4}$ and a light 4-path P₄. The results obtained for $K_{1, 3}$ and P₄ are best possible.

On longest circuits in certain non-regular planar graphs

Michal Tkáč (1995)

Mathematica Slovaca

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