Add to ORKGExistence of nicely bounded sections of two symmetric convex bodies K and L implies that the intersection of random rotations of K and L is nicely bounded. For L = subspace, this main result immediately yields the unexpected phenomenon: "If K has one nicely bounded section, then most sections of K are nicely bounded". This 'existence implies randomness' consequence was proved independently in [Giannopoulos, Milman and Tsolomitis]. The main result represents a new connection between the local asymptotic convex geometry (study of sections of convex bodies) and the global asymptotic convex geometry (study of convex bodies as a whole). The method relies on the new 'isoperimetry of w...
AbstractWe study the diameters of sections of convex bodies in RN determined by a random N×n matrix ...
We establish a close relationship between isoperimetric inequalities for convex bodies and asymptoti...
AbstractWe extend a theorem of Groemer on the expected volume of a random polytope in a convex body....
Existence of nicely bounded sections of two symmetric convex bodies K and L implies that th...
In the paper "Isoperimetry of waists and local versus global asymptotic convex geometries",...
In the paper "Isoperimetry of waists and local versus global asymptotic convex geometries",...
AbstractWe study two properties of random high dimensional sections of convex bodies. In the first p...
AbstractSharpening work of the first two authors, for every proportion λ∈(0,1) we provide exact quan...
We study the diameters of sections of convex bodies in RN de-termined by a random N × n matrix Γ, ei...
AbstractWe study the diameters of sections of convex bodies in RN determined by a random N×n matrix ...
Abstract. We study two properties of random high dimensional sec-tions of convex bodies. In the firs...
Abstract. We study two properties of random high dimensional sec-tions of convex bodies. In the firs...
In this paper we study geometry of compact, not necessarily centrally sym-metric, convex bodies in R...
AbstractLet K be an isotropic convex body in Rn and let Zq(K) be the Lq-centroid body of K. For ever...
Abstract. Let K ⊂ Rn be a centrally symmetric isotropic convex body. We prove that for random F ∈ Gn...
AbstractWe study the diameters of sections of convex bodies in RN determined by a random N×n matrix ...
We establish a close relationship between isoperimetric inequalities for convex bodies and asymptoti...
AbstractWe extend a theorem of Groemer on the expected volume of a random polytope in a convex body....
Existence of nicely bounded sections of two symmetric convex bodies K and L implies that th...
In the paper "Isoperimetry of waists and local versus global asymptotic convex geometries",...
In the paper "Isoperimetry of waists and local versus global asymptotic convex geometries",...
AbstractWe study two properties of random high dimensional sections of convex bodies. In the first p...
AbstractSharpening work of the first two authors, for every proportion λ∈(0,1) we provide exact quan...
We study the diameters of sections of convex bodies in RN de-termined by a random N × n matrix Γ, ei...
AbstractWe study the diameters of sections of convex bodies in RN determined by a random N×n matrix ...
Abstract. We study two properties of random high dimensional sec-tions of convex bodies. In the firs...
Abstract. We study two properties of random high dimensional sec-tions of convex bodies. In the firs...
In this paper we study geometry of compact, not necessarily centrally sym-metric, convex bodies in R...
AbstractLet K be an isotropic convex body in Rn and let Zq(K) be the Lq-centroid body of K. For ever...
Abstract. Let K ⊂ Rn be a centrally symmetric isotropic convex body. We prove that for random F ∈ Gn...
AbstractWe study the diameters of sections of convex bodies in RN determined by a random N×n matrix ...
We establish a close relationship between isoperimetric inequalities for convex bodies and asymptoti...
AbstractWe extend a theorem of Groemer on the expected volume of a random polytope in a convex body....