The fundamental result of Li, Long, and Srinivasan on approximations of set systems has become a key tool across several communities such as learning theory, algorithms, computational geometry, combinatorics and data analysis. The goal of this paper is to give a modular, self-contained, intuitive proof of this result for finite set systems. The only ingredient we assume is the standard Chernoff's concentration bound. This makes the proof accessible to a wider audience, readers not familiar with techniques from statistical learning theory, and makes it possible to be covered in a single self-contained lecture in a geometry, algorithms or combinatorics course
In this note we present a new proof of a one-sided approximation of sets of finite perimeter
In mathematics, the term approximation usually means either interpolation on a point set or approxim...
Let ℱ n be a family of subsets of {1,…, n }. We propose a simple randomized algorithm to estimate...
In this thesis, we study approximations of set systems (X,S), where X is a base set and S consists o...
AbstractChebyshev approximation on an interval and on its closed subsets by a non-linear family with...
Given a set system (X, R) with VC-dimension d, the celebrated result of Haussler and Welzl (1987) sh...
AbstractA general minimax theorem for infinite games due to H. F. Bohnenblust, S. Karlin, and L. S. ...
International audienceShowing the existence of small-sized epsilon-nets has been the subject of inve...
The analysis of approximation techniques is a key topic in computational geometry, both for practica...
We study the approximability of Minimum Constraint Satisfaction Problems (Min CSPs) with a fixed fin...
AbstractA family in a linear space is to be simultaneously approximated by a finite-dimensional line...
AbstractThe degree of approximation of infinite-dimensional function classes using finite n-dimensio...
The hitting set problem is a well-known NP-hard optimization problem in which, given a set of elemen...
AbstractWe introduce a subclass of NP optimization problems which contains some NP-hard problems, e....
AbstractIt is proven that any set E consisting of finitely many intervals can be approximated with o...
In this note we present a new proof of a one-sided approximation of sets of finite perimeter
In mathematics, the term approximation usually means either interpolation on a point set or approxim...
Let ℱ n be a family of subsets of {1,…, n }. We propose a simple randomized algorithm to estimate...
In this thesis, we study approximations of set systems (X,S), where X is a base set and S consists o...
AbstractChebyshev approximation on an interval and on its closed subsets by a non-linear family with...
Given a set system (X, R) with VC-dimension d, the celebrated result of Haussler and Welzl (1987) sh...
AbstractA general minimax theorem for infinite games due to H. F. Bohnenblust, S. Karlin, and L. S. ...
International audienceShowing the existence of small-sized epsilon-nets has been the subject of inve...
The analysis of approximation techniques is a key topic in computational geometry, both for practica...
We study the approximability of Minimum Constraint Satisfaction Problems (Min CSPs) with a fixed fin...
AbstractA family in a linear space is to be simultaneously approximated by a finite-dimensional line...
AbstractThe degree of approximation of infinite-dimensional function classes using finite n-dimensio...
The hitting set problem is a well-known NP-hard optimization problem in which, given a set of elemen...
AbstractWe introduce a subclass of NP optimization problems which contains some NP-hard problems, e....
AbstractIt is proven that any set E consisting of finitely many intervals can be approximated with o...
In this note we present a new proof of a one-sided approximation of sets of finite perimeter
In mathematics, the term approximation usually means either interpolation on a point set or approxim...
Let ℱ n be a family of subsets of {1,…, n }. We propose a simple randomized algorithm to estimate...