M}, in O(n^2.5286 M) time. This algorithm is crucial in the preprocessing algorithm of our DSO. Our solution improves the O(n^2.6865 M) time bound in [Ren, ESA 2020], and matches the current best time bound for computing all-pairs shortest paths
Given an undirected, unweighted graph G on n nodes, there is an O(n^2*poly log(n))-time algorithm th...
Thorup and Zwick, in the seminal paper [Journal of ACM, 52(1), 2005, pp 1-24], showed that a weighte...
Let $G=(V,E)$ be an $n$-vertex connected graph of maximum degree $\Delta$. Given access to $V$ and a...
We present an improved oracle for the distance sensitivity problem. The goal is to preprocess a dire...
In this work we derandomize two central results in graph algorithms, replacement paths and distance ...
The Seventeenth Workshop on Algorithm Engineering and Experiments (ALENEX 2015), 5 January 2015Comp...
We initiate the study of counting oracles for various path problems in graphs. Distance oracles have...
Real life graphs and networks are prone to failure of nodes (vertices) and links (edges). In particu...
Given an undirected unweighted graph G and a source set S of |S|=? sources, we want to build a data ...
The paper \A Nearly Optimal Oracle for Avoiding Failed Vertices and Edges by Aaron Bernstein and Da...
Let s denote a distinguished source vertex of a non-negatively real weighted and undirected graph G ...
One of the most fundamental graph problems is finding a shortest path from a source to a target node...
For a directed graph G we consider queries of the form: "What is the shortest path distance from ver...
The shortest distance/path problems in planar graphs are among the most fundamental problems in grap...
Let s denote a distinguished source vertex of a non-negatively real weighted and undirected graph G ...
Given an undirected, unweighted graph G on n nodes, there is an O(n^2*poly log(n))-time algorithm th...
Thorup and Zwick, in the seminal paper [Journal of ACM, 52(1), 2005, pp 1-24], showed that a weighte...
Let $G=(V,E)$ be an $n$-vertex connected graph of maximum degree $\Delta$. Given access to $V$ and a...
We present an improved oracle for the distance sensitivity problem. The goal is to preprocess a dire...
In this work we derandomize two central results in graph algorithms, replacement paths and distance ...
The Seventeenth Workshop on Algorithm Engineering and Experiments (ALENEX 2015), 5 January 2015Comp...
We initiate the study of counting oracles for various path problems in graphs. Distance oracles have...
Real life graphs and networks are prone to failure of nodes (vertices) and links (edges). In particu...
Given an undirected unweighted graph G and a source set S of |S|=? sources, we want to build a data ...
The paper \A Nearly Optimal Oracle for Avoiding Failed Vertices and Edges by Aaron Bernstein and Da...
Let s denote a distinguished source vertex of a non-negatively real weighted and undirected graph G ...
One of the most fundamental graph problems is finding a shortest path from a source to a target node...
For a directed graph G we consider queries of the form: "What is the shortest path distance from ver...
The shortest distance/path problems in planar graphs are among the most fundamental problems in grap...
Let s denote a distinguished source vertex of a non-negatively real weighted and undirected graph G ...
Given an undirected, unweighted graph G on n nodes, there is an O(n^2*poly log(n))-time algorithm th...
Thorup and Zwick, in the seminal paper [Journal of ACM, 52(1), 2005, pp 1-24], showed that a weighte...
Let $G=(V,E)$ be an $n$-vertex connected graph of maximum degree $\Delta$. Given access to $V$ and a...