Add to ORKGIn [7] the notion of minimal pairs of convex compact subsets of a Hausdorff topological vector space was introduced and it was conjectured, that minimal pairs in an equivalence class of the Hörmander-Rådström lattice are unique up to translation. We prove this statement for the two-dimensional case. To achieve this we prove a necessary and sufficient condition in terms of mixed volumes that a translate of a convex body in ℝn is contained in another convex body. This generalizes a theorem of Weil (cf. [10])
AbstractThe traditional solution to the Minkowski problem for polytopes involves two steps. First, t...
In this note, we study the geometric structure of compact convex sets in 2-dimensional asymmetric no...
AbstractWe characterize those metrizable compact convex sets K that contain a Bauer simplex B such t...
Pairs of compact convex sets naturally arise in quasidierential calculus as a sub- and superdierenti...
In this paper the notion of convex pairs of convex bounded subsets of a Hausdorff topological vector...
The existence of a minimal element in every equivalence class of pairs of bounded closed convex sets...
AbstractWe classify n-dimensional pairs of dual lattices by their minimal vectors. This leads to the...
We examine minimality in asymmetry classes of convex compact sets with respect to inclusion. We prov...
In this note we examine the volume of the convex hull of two congruent copies of a convex body in Eu...
To Erwin Lutwak on the occasion of his 65th birthday ABSTRACT. Let K and L be compact convex sets in...
Abstract. We show that if d ≥ 4 is even, then one can find two essentially different convex bodies s...
Abstract. In this note we examine the volume of the convex hull of two congruent copies of a convex ...
Given two convex d-polytopes P and Q in Rd for d ≥ 3, we study the problem of bundling P and Q in a ...
We define what is called Blaschke difference for polytopes as an inverse operation to Blaschke addit...
Abstract. For a convex body K, let us denote by t(K) the largest number for which there exists a pac...
AbstractThe traditional solution to the Minkowski problem for polytopes involves two steps. First, t...
In this note, we study the geometric structure of compact convex sets in 2-dimensional asymmetric no...
AbstractWe characterize those metrizable compact convex sets K that contain a Bauer simplex B such t...
Pairs of compact convex sets naturally arise in quasidierential calculus as a sub- and superdierenti...
In this paper the notion of convex pairs of convex bounded subsets of a Hausdorff topological vector...
The existence of a minimal element in every equivalence class of pairs of bounded closed convex sets...
AbstractWe classify n-dimensional pairs of dual lattices by their minimal vectors. This leads to the...
We examine minimality in asymmetry classes of convex compact sets with respect to inclusion. We prov...
In this note we examine the volume of the convex hull of two congruent copies of a convex body in Eu...
To Erwin Lutwak on the occasion of his 65th birthday ABSTRACT. Let K and L be compact convex sets in...
Abstract. We show that if d ≥ 4 is even, then one can find two essentially different convex bodies s...
Abstract. In this note we examine the volume of the convex hull of two congruent copies of a convex ...
Given two convex d-polytopes P and Q in Rd for d ≥ 3, we study the problem of bundling P and Q in a ...
We define what is called Blaschke difference for polytopes as an inverse operation to Blaschke addit...
Abstract. For a convex body K, let us denote by t(K) the largest number for which there exists a pac...
AbstractThe traditional solution to the Minkowski problem for polytopes involves two steps. First, t...
In this note, we study the geometric structure of compact convex sets in 2-dimensional asymmetric no...
AbstractWe characterize those metrizable compact convex sets K that contain a Bauer simplex B such t...