Add to ORKGSuppose A is a finite set equipped with a probability measure P and let M be a ``mass'' function on A. We give a probabilistic characterization of the most efficient way in which A^n can be almost-covered using spheres of a fixed radius. An almost-covering is a subset C_n of A^n, such that the union of the spheres centered at the points of C_n has probability close to one with respect to the product measure P^n. An efficient covering is one with small mass M^n(C_n); n is typically large. With different choices for M and the geometry on A our results give various corollaries as special cases, including Shannon's data compression theorem, a version of Stein's lemma (in hypothesis testing), and a new converse to some measure concentration ineq...
AbstractIn a recent paper by the same author general improvements on the sphere covering bound for b...
The Vitali Covering Lemma states that, given a finite collection of balls in R^d, there exists a dis...
A judicious application of the Berry-Esseen theorem via suitable Augustin information measures is de...
Suppose A is a finite set, let P be a discrete probability distribution on A, and let M be an arbitr...
Suppose A is a finite set, let P be a discrete distribution on A, and let M be an arbitrary "mass" f...
Abstract — Suppose A is a finite set, let P be a discrete dis-tribution on A, and let M be an arbitr...
Let A be finite set equipped with a probability distribution P, and let M be a “mass” function on A....
We state and solve a general version of the rate-distortion problem. We show that its answer contain...
We present a method to obtain upper bounds on covering numbers. As applications of this method, we r...
Geometry in very high dimensions is full of surprises, many of the properties of high dimensional ge...
We show that the size of codes in projective space controls structural results for zeros of odd maps...
In a recent paper by the same author general improvements on the sphere covering bound for binary co...
This article presents an algebraic topology perspective on the problem of finding a complete coverag...
A spherical code is a finite set of points on the surface of a multidimensional unit radius sphere. ...
In a variety of reasoning tasks, one estimates the likelihood of events by means of volumes of sets ...
AbstractIn a recent paper by the same author general improvements on the sphere covering bound for b...
The Vitali Covering Lemma states that, given a finite collection of balls in R^d, there exists a dis...
A judicious application of the Berry-Esseen theorem via suitable Augustin information measures is de...
Suppose A is a finite set, let P be a discrete probability distribution on A, and let M be an arbitr...
Suppose A is a finite set, let P be a discrete distribution on A, and let M be an arbitrary "mass" f...
Abstract — Suppose A is a finite set, let P be a discrete dis-tribution on A, and let M be an arbitr...
Let A be finite set equipped with a probability distribution P, and let M be a “mass” function on A....
We state and solve a general version of the rate-distortion problem. We show that its answer contain...
We present a method to obtain upper bounds on covering numbers. As applications of this method, we r...
Geometry in very high dimensions is full of surprises, many of the properties of high dimensional ge...
We show that the size of codes in projective space controls structural results for zeros of odd maps...
In a recent paper by the same author general improvements on the sphere covering bound for binary co...
This article presents an algebraic topology perspective on the problem of finding a complete coverag...
A spherical code is a finite set of points on the surface of a multidimensional unit radius sphere. ...
In a variety of reasoning tasks, one estimates the likelihood of events by means of volumes of sets ...
AbstractIn a recent paper by the same author general improvements on the sphere covering bound for b...
The Vitali Covering Lemma states that, given a finite collection of balls in R^d, there exists a dis...
A judicious application of the Berry-Esseen theorem via suitable Augustin information measures is de...