Add to ORKGGiven n vectors with dimension m in Boolean domain, how to find two vectors whose pairwise Hamming distance is minimum? This problem is known as the Closest Pair Problem. If these vectors are generated uniformly at random except two of them are correlated with Pearson-correlation coefficient, then the problem is called the Light Bulb Problem. In this work, we propose a novel coding-based scheme for the Closest Pair Problem. We design both randomized and deterministic algorithms, which achieve the best-known running time when the length of input vectors m is small and the minimum distance is very small compared to m. When applied to the Light Bulb Problem, our result yields state-of-the-art deterministic running time when the Pearson-correla...
The minimum distance of an error-correcting code is an important concept in information theory. Henc...
Given a set S of n points in k-dimensional space, and an L t metric, the dynamic closest pair proble...
Given a set of n points in R^d, the (monochromatic) Closest Pair problem asks to find a pair of dist...
Given n vectors with dimension m in Boolean domain, how to find two vectors whose pairwise Hamming d...
We study the Closest Pair Problem in Hamming metric, which asks to find the pair with the smallest H...
AbstractWe present a linear time randomized sieve algorithm for the closest-pair problem. The algori...
The Closest Pair problem aims to identify the closest pair (using some similarity measure, e.g., Euc...
We present a conceptually simple, randomized incremental algorithm for finding the closest pair in a...
The Light Bulb Problem is one of the most basic problems in data analysis. One is given as input n v...
We describe a new randomized data structure, the sparse partition, for solving the dynamic closest-p...
Abstract—Determining the minimum distance of a linear code is one of the most important problems in ...
Consider a metric space (P, dist) with N points whose doubling dimension is a constant. We present a...
In this paper we show that if the input points to the geometric closest pair problem are given with ...
textabstractWe present a new efficient algorithm for the search version of the approximate Closest V...
© Copyright 2018 by SIAM. Point location problems for n points in d-dimensional Euclidean space (and...
The minimum distance of an error-correcting code is an important concept in information theory. Henc...
Given a set S of n points in k-dimensional space, and an L t metric, the dynamic closest pair proble...
Given a set of n points in R^d, the (monochromatic) Closest Pair problem asks to find a pair of dist...
Given n vectors with dimension m in Boolean domain, how to find two vectors whose pairwise Hamming d...
We study the Closest Pair Problem in Hamming metric, which asks to find the pair with the smallest H...
AbstractWe present a linear time randomized sieve algorithm for the closest-pair problem. The algori...
The Closest Pair problem aims to identify the closest pair (using some similarity measure, e.g., Euc...
We present a conceptually simple, randomized incremental algorithm for finding the closest pair in a...
The Light Bulb Problem is one of the most basic problems in data analysis. One is given as input n v...
We describe a new randomized data structure, the sparse partition, for solving the dynamic closest-p...
Abstract—Determining the minimum distance of a linear code is one of the most important problems in ...
Consider a metric space (P, dist) with N points whose doubling dimension is a constant. We present a...
In this paper we show that if the input points to the geometric closest pair problem are given with ...
textabstractWe present a new efficient algorithm for the search version of the approximate Closest V...
© Copyright 2018 by SIAM. Point location problems for n points in d-dimensional Euclidean space (and...
The minimum distance of an error-correcting code is an important concept in information theory. Henc...
Given a set S of n points in k-dimensional space, and an L t metric, the dynamic closest pair proble...
Given a set of n points in R^d, the (monochromatic) Closest Pair problem asks to find a pair of dist...
