In this paper we consider the decremental single-source shortest paths (SSSP) problem, where given a graph G and a source node s the goal is to maintain shortest distances between s and all other nodes in G under a sequence of online adversarial edge deletions. In their seminal work, Even and Shiloach [JACM 1981] presented an exact solution to the problem in unweighted graphs with only O(mn) total update time over all edge deletions. Their classic algorithm was the state of the art for the decremental SSSP problem for three decades, even when approximate shortest paths are allowed. The first improvement over the Even-Shiloach algorithm was given by Bernstein and Roditty [SODA 2011], who for the case of an unweighted and undirected graph pr...
We consider the problem of updating a single source shortest path tree in either a directed or an un...
We provide the first deterministic data structure that given a weighted undirected graph undergoing ...
For any fixed 1 > [epsilon] > 0 we present a fully dynamic algorithm for maintaining (2 + [epsilon])...
© 2020 ACM. In the dynamic Single-Source Shortest Paths (SSSP) problem, we are given a graph G=(V,E)...
Abstract. We obtain the following results related to dynamic versions of the shortest-paths problem:...
Given a directed, weighted graph G = (V, E) undergoing edge insertions, the incremental single-sourc...
We revisit the classic problem of dynamically maintaining shortest paths between all pairs of nodes ...
We study dynamic (1 + ∊)-approximation algorithms for the single-source shortest paths problem in an...
We give new partially-dynamic algorithms for the all-pairs shortest paths problem in weighted direct...
We address the problem of single-source shortest path computation in digraphs with non-negative edg...
We study the exact fully dynamic shortest paths problem. For real-weighted directed graphs, we show ...
AbstractWe present the first fully dynamic algorithm for maintaining all pairs shortest paths in dir...
AbstractWe propose a fully dynamic distributed algorithm for the all-pairs shortest paths problem on...
In this paper, we develop deterministic fully dynamic algorithms for computing approximate distances...
We address the problem of single-source shortest path computation in digraphs with non-negative edge...
We consider the problem of updating a single source shortest path tree in either a directed or an un...
We provide the first deterministic data structure that given a weighted undirected graph undergoing ...
For any fixed 1 > [epsilon] > 0 we present a fully dynamic algorithm for maintaining (2 + [epsilon])...
© 2020 ACM. In the dynamic Single-Source Shortest Paths (SSSP) problem, we are given a graph G=(V,E)...
Abstract. We obtain the following results related to dynamic versions of the shortest-paths problem:...
Given a directed, weighted graph G = (V, E) undergoing edge insertions, the incremental single-sourc...
We revisit the classic problem of dynamically maintaining shortest paths between all pairs of nodes ...
We study dynamic (1 + ∊)-approximation algorithms for the single-source shortest paths problem in an...
We give new partially-dynamic algorithms for the all-pairs shortest paths problem in weighted direct...
We address the problem of single-source shortest path computation in digraphs with non-negative edg...
We study the exact fully dynamic shortest paths problem. For real-weighted directed graphs, we show ...
AbstractWe present the first fully dynamic algorithm for maintaining all pairs shortest paths in dir...
AbstractWe propose a fully dynamic distributed algorithm for the all-pairs shortest paths problem on...
In this paper, we develop deterministic fully dynamic algorithms for computing approximate distances...
We address the problem of single-source shortest path computation in digraphs with non-negative edge...
We consider the problem of updating a single source shortest path tree in either a directed or an un...
We provide the first deterministic data structure that given a weighted undirected graph undergoing ...
For any fixed 1 > [epsilon] > 0 we present a fully dynamic algorithm for maintaining (2 + [epsilon])...