International audienceThe existence of Macbeath regions is a classical theorem in convex geometry ("A Theorem on non-homogeneous lattices'', Annals of Math, 1952). We refer the reader to the survey of I. Barany for several applications~\cite{B07}. Recently there have been some striking applications of Macbeath regions in discrete and computational geometry. In this paper, we study Macbeath's problem in a more general setting, and not only for the Lebesgue measure as is the case in the classical theorem. We prove near-optimal generalizations for several basic geometric set systems. The problems and techniques used are closely linked to the study of epsilon-nets for geometric set systems
Dobrinen and Simpson [4] introduced the notions of almost everywhere domination and uni-form almost ...
International audienceWe consider linear optimization over a nonempty convex semialgebraic feasible ...
We study the problem of maximizing a monotone non-decreasing function {Mathematical expression} subj...
The existence of Macbeath regions is a classical theorem in convex geometry (“A Theorem on non-homog...
International audienceThe existence of Macbeath regions is a classical theorem in convex geometry ("...
International audienceThe existence of Macbeath regions is a classical theorem in convex geometry [1...
The analysis of approximation techniques is a key topic in computational geometry, both for practica...
International audienceThe packing lemma of Haussler states that given a set system $(X, R)$ with bou...
We study the connections between three seemingly different combinatorial structures - uniform bracke...
The packing lemma of Haussler states that given a set system (X,R) with bounded VC dimension, if eve...
This thesis mainly focuses on geometric measure theory with applications to some shape optimization ...
International audienceIn this article, we generalize a localization theorem of Lovasz and Simonovits...
AbstractIn this article, we generalize a localization theorem of Lovász and Simonovits [Random walks...
Convex geometries form a subclass of closure systems with unique criticals, or UC-systems. We show t...
We present a natural reverse Minkowski-type inequality for lattices, which gives upper bounds on the...
Dobrinen and Simpson [4] introduced the notions of almost everywhere domination and uni-form almost ...
International audienceWe consider linear optimization over a nonempty convex semialgebraic feasible ...
We study the problem of maximizing a monotone non-decreasing function {Mathematical expression} subj...
The existence of Macbeath regions is a classical theorem in convex geometry (“A Theorem on non-homog...
International audienceThe existence of Macbeath regions is a classical theorem in convex geometry ("...
International audienceThe existence of Macbeath regions is a classical theorem in convex geometry [1...
The analysis of approximation techniques is a key topic in computational geometry, both for practica...
International audienceThe packing lemma of Haussler states that given a set system $(X, R)$ with bou...
We study the connections between three seemingly different combinatorial structures - uniform bracke...
The packing lemma of Haussler states that given a set system (X,R) with bounded VC dimension, if eve...
This thesis mainly focuses on geometric measure theory with applications to some shape optimization ...
International audienceIn this article, we generalize a localization theorem of Lovasz and Simonovits...
AbstractIn this article, we generalize a localization theorem of Lovász and Simonovits [Random walks...
Convex geometries form a subclass of closure systems with unique criticals, or UC-systems. We show t...
We present a natural reverse Minkowski-type inequality for lattices, which gives upper bounds on the...
Dobrinen and Simpson [4] introduced the notions of almost everywhere domination and uni-form almost ...
International audienceWe consider linear optimization over a nonempty convex semialgebraic feasible ...
We study the problem of maximizing a monotone non-decreasing function {Mathematical expression} subj...