We study dynamic (1 + ∊)-approximation algorithms for the single-source shortest paths problem in an unweighted undirected n-node m-edge graph under edge deletions. The fastest algorithm for this problem is an algorithm with O(n2+o(1)) total update time and constant query time by Bernstein and Roditty (SODA 2011). In this paper, we improve the total update time to O(n1.8+o(1) + m1+o(1)) while keeping the query time constant. This running time is essentially tight when m = Ω(n1.8) since we need Ω(m) time even in the static setting. For smaller values of m, the running time of our algorithm is subquadratic, and is the first that breaks through the quadratic time barrier. In obtaining this result, we develop a fast algorithm for what we call c...
Let G be a directed graph with n vertices, subject to dynamic updates, and such that each edge weigh...
We address the problem of single-source shortest path computation in digraphs with non-negative edge...
Given a directed, weighted graph G = (V, E) undergoing edge insertions, the incremental single-sourc...
We study dynamic (1 + ∊)-approximation algorithms for the single-source shortest paths problem in an...
We consider the problem of updating a single source shortest path tree in either a directed or an un...
For any fixed 1 > [epsilon] > 0 we present a fully dynamic algorithm for maintaining (2 + [epsilon])...
Abstract. We obtain the following results related to dynamic versions of the shortest-paths problem:...
We present a hierarchical scheme for efficiently maintaining all-pairs approximate shortest paths in...
© 2020 ACM. In the dynamic Single-Source Shortest Paths (SSSP) problem, we are given a graph G=(V,E)...
In this paper we consider the decremental single-source shortest paths (SSSP) problem, where given a...
We present improved algorithms for maintaining transitive closure and all-pairs shortest paths/dista...
We consider the problem of maintaining the distances and the shortest paths from a single source in ...
We present improved algorithms for maintaining transitive closure and all-pairs shortest paths/dista...
We consider the problem of maintaining a solution to the All Pairs Shortest Paths Problem in a direc...
We address the problem of single-source shortest path computation in digraphs with non-negative edg...
Let G be a directed graph with n vertices, subject to dynamic updates, and such that each edge weigh...
We address the problem of single-source shortest path computation in digraphs with non-negative edge...
Given a directed, weighted graph G = (V, E) undergoing edge insertions, the incremental single-sourc...
We study dynamic (1 + ∊)-approximation algorithms for the single-source shortest paths problem in an...
We consider the problem of updating a single source shortest path tree in either a directed or an un...
For any fixed 1 > [epsilon] > 0 we present a fully dynamic algorithm for maintaining (2 + [epsilon])...
Abstract. We obtain the following results related to dynamic versions of the shortest-paths problem:...
We present a hierarchical scheme for efficiently maintaining all-pairs approximate shortest paths in...
© 2020 ACM. In the dynamic Single-Source Shortest Paths (SSSP) problem, we are given a graph G=(V,E)...
In this paper we consider the decremental single-source shortest paths (SSSP) problem, where given a...
We present improved algorithms for maintaining transitive closure and all-pairs shortest paths/dista...
We consider the problem of maintaining the distances and the shortest paths from a single source in ...
We present improved algorithms for maintaining transitive closure and all-pairs shortest paths/dista...
We consider the problem of maintaining a solution to the All Pairs Shortest Paths Problem in a direc...
We address the problem of single-source shortest path computation in digraphs with non-negative edg...
Let G be a directed graph with n vertices, subject to dynamic updates, and such that each edge weigh...
We address the problem of single-source shortest path computation in digraphs with non-negative edge...
Given a directed, weighted graph G = (V, E) undergoing edge insertions, the incremental single-sourc...