We present a truly subquadratic size distance oracle for reporting, in constant time, the exact shortest-path distance between any pair of vertices of an undirected, unweighted planar graph G. For any ? > 0, our distance oracle requires O(n^{5/3+?}) space and is capable of answering shortest-path distance queries exactly for any pair of vertices of G in worst-case time O(log (1/?)). Previously no truly sub-quadratic size distance oracles with constant query time for answering exact shortest paths distance queries existed
The Seventeenth Workshop on Algorithm Engineering and Experiments (ALENEX 2015), 5 January 2015Comp...
Many graph processing algorithms require determination of shortest-path distances between arbitrary ...
A Euclidean t-spanner for a point set V ? ?^d is a graph such that, for any two points p and q in V,...
We present new and improved data structures that answer exact node-to-node distance queries in plana...
Distance oracles are data structures that provide fast (possibly approximate) answers to shortest-pa...
The shortest distance/path problems in planar graphs are among the most fundamental problems in grap...
We present a simple exact distance oracle for the point-to-point shortest distance problem in planar...
Thorup and Zwick, in the seminal paper [Journal of ACM, 52(1), 2005, pp 1-24], showed that a weighte...
We initiate the study of counting oracles for various path problems in graphs. Distance oracles have...
An O(sqrt {n}) query time and O(n^{1.5}) size oracle for counting shortest paths is proposed. Given ...
Thorup [FOCS'01, JACM'04] and Klein [SODA'01] independently showed that there exists a $(1+\epsilon)...
Given an arbitrary real constant epsilon > 0, and a geometric graph G in d-dimensional Euclidean spa...
Given an undirected, unweighted graph G on n nodes, there is an O(n^2*poly log(n))-time algorithm th...
We present the first near-linear-time (1 + epsilon)-approximation algorithm for the diameter of a we...
Given an undirected graph G with m edges, n vertices, and non-negative edge weights, and given an in...
The Seventeenth Workshop on Algorithm Engineering and Experiments (ALENEX 2015), 5 January 2015Comp...
Many graph processing algorithms require determination of shortest-path distances between arbitrary ...
A Euclidean t-spanner for a point set V ? ?^d is a graph such that, for any two points p and q in V,...
We present new and improved data structures that answer exact node-to-node distance queries in plana...
Distance oracles are data structures that provide fast (possibly approximate) answers to shortest-pa...
The shortest distance/path problems in planar graphs are among the most fundamental problems in grap...
We present a simple exact distance oracle for the point-to-point shortest distance problem in planar...
Thorup and Zwick, in the seminal paper [Journal of ACM, 52(1), 2005, pp 1-24], showed that a weighte...
We initiate the study of counting oracles for various path problems in graphs. Distance oracles have...
An O(sqrt {n}) query time and O(n^{1.5}) size oracle for counting shortest paths is proposed. Given ...
Thorup [FOCS'01, JACM'04] and Klein [SODA'01] independently showed that there exists a $(1+\epsilon)...
Given an arbitrary real constant epsilon > 0, and a geometric graph G in d-dimensional Euclidean spa...
Given an undirected, unweighted graph G on n nodes, there is an O(n^2*poly log(n))-time algorithm th...
We present the first near-linear-time (1 + epsilon)-approximation algorithm for the diameter of a we...
Given an undirected graph G with m edges, n vertices, and non-negative edge weights, and given an in...
The Seventeenth Workshop on Algorithm Engineering and Experiments (ALENEX 2015), 5 January 2015Comp...
Many graph processing algorithms require determination of shortest-path distances between arbitrary ...
A Euclidean t-spanner for a point set V ? ?^d is a graph such that, for any two points p and q in V,...