Abstract. We consider the problem of determining whether a given set S in R n is approximately convex, i.e., if there is a convex set K ∈ R n such that the volume of their symmetric difference is at most ɛ vol(S) for some given ɛ. When the set is presented only by a membership oracle and a random oracle, we show that the problem can be solved with high probability using poly(n)(c/ɛ) n oracle calls and computation time. We complement this result with an exponential lower bound for the natural algorithm that tests convexity along “random ” lines. We conjecture that a simple 2-dimensional version of this algorithm has polynomial complexity.
AbstractWe consider the computation of the volume of the union of high-dimensional geometric objects...
It is a well known fact that for every polynomial time algorithm which gives an upper bound V (K) an...
How much can randomness help computation? Motivated by this general question and by volume computati...
Abstract. We consider the problem of determining whether a given set S in R n is approximately conve...
Abstract: "We discuss the problem of computing the volume of a convex body K in R[superscript n]. We...
International audienceA set S ⊂ Z^d is digital convex if conv(S) ∩ Z^d = S, where conv(S) denotes th...
A body K ? ?? is convex if and only if the line segment between any two points in K is completely co...
The paper gives various (positive and negative) results on the complexity of the problem of computin...
We experimentally study the fundamental problem of computing the volume of a convex polytope given a...
We experimentally study the fundamental problem of computing the volume of a convex polytope given a...
We discuss how well a given convex body B in a real d-dimensional vector space V can be approximated...
Given a polyhedron P in R d with n vertices, a halfspace volume query asks for the volume of P ∩ H f...
International audienceConvex bodies play a fundamental role in geometric computation, and approximat...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 2007.This electronic v...
Convexity has played a major role in a variety of fields over the past decades. Never-theless, the c...
AbstractWe consider the computation of the volume of the union of high-dimensional geometric objects...
It is a well known fact that for every polynomial time algorithm which gives an upper bound V (K) an...
How much can randomness help computation? Motivated by this general question and by volume computati...
Abstract. We consider the problem of determining whether a given set S in R n is approximately conve...
Abstract: "We discuss the problem of computing the volume of a convex body K in R[superscript n]. We...
International audienceA set S ⊂ Z^d is digital convex if conv(S) ∩ Z^d = S, where conv(S) denotes th...
A body K ? ?? is convex if and only if the line segment between any two points in K is completely co...
The paper gives various (positive and negative) results on the complexity of the problem of computin...
We experimentally study the fundamental problem of computing the volume of a convex polytope given a...
We experimentally study the fundamental problem of computing the volume of a convex polytope given a...
We discuss how well a given convex body B in a real d-dimensional vector space V can be approximated...
Given a polyhedron P in R d with n vertices, a halfspace volume query asks for the volume of P ∩ H f...
International audienceConvex bodies play a fundamental role in geometric computation, and approximat...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 2007.This electronic v...
Convexity has played a major role in a variety of fields over the past decades. Never-theless, the c...
AbstractWe consider the computation of the volume of the union of high-dimensional geometric objects...
It is a well known fact that for every polynomial time algorithm which gives an upper bound V (K) an...
How much can randomness help computation? Motivated by this general question and by volume computati...