AbstractWe propose data structures for maintaining shortest paths in planar graphs in which the weight of an edge is modified. Our data structures allow us to compute, after an update, the shortest-path tree rooted at an arbitrary query node in time O(nlog logn) and to perform an update in O((logn)3). Our data structure can be applied also to the problem of maintaining the maximum flow problem in an s–t planar network.As far as the all-pairs shortest-path problem is concerned, we are interested in computing the shortest distances between q pairs of nodes. We show how to obtain an o(n2) algorithm for computing the shortest path between q pairs of nodes whenever q = o(n2). We also consider the dynamic version of the problem in which we allow ...
We describe algorithms for finding shortest paths and distances in a planar digraph which exploit th...
We address the problem of single-source shortest path computation in digraphs with non-negative edg...
We consider the problem of dynamically maintaining a solution of all pairs shortest paths in a direc...
AbstractWe propose data structures for maintaining shortest paths in planar graphs in which the weig...
We describe algorithms for finding shortest paths and distances in a planar digraph which exploit th...
We describe algorithms for finding shortest paths and distances in a planar digraph which exploit th...
AbstractIn this paper, we present an O(nlog3n) time algorithm for finding shortest paths in an n-nod...
AbstractWe present the first fully dynamic algorithm for maintaining all pairs shortest paths in dir...
We describe algorithms for finding shortest paths and distances in outerplanar and planar digraphs t...
AbstractWe give a linear-time algorithm for single-source shortest paths in planar graphs with nonne...
Abstract. We obtain the following results related to dynamic versions of the shortest-paths problem:...
We study novel combinatorial properties of graphs that allow us to devise a completely new approach...
We consider the problem of maintaining a solution to the All Pairs Shortest Paths Problem in a direc...
We describe Mgorithms for finding shortest paths and distances in a planar digraph which exploit the...
We describe algorithms for finding shortest paths and distances in a planar digraph which exploit th...
We address the problem of single-source shortest path computation in digraphs with non-negative edg...
We consider the problem of dynamically maintaining a solution of all pairs shortest paths in a direc...
AbstractWe propose data structures for maintaining shortest paths in planar graphs in which the weig...
We describe algorithms for finding shortest paths and distances in a planar digraph which exploit th...
We describe algorithms for finding shortest paths and distances in a planar digraph which exploit th...
AbstractIn this paper, we present an O(nlog3n) time algorithm for finding shortest paths in an n-nod...
AbstractWe present the first fully dynamic algorithm for maintaining all pairs shortest paths in dir...
We describe algorithms for finding shortest paths and distances in outerplanar and planar digraphs t...
AbstractWe give a linear-time algorithm for single-source shortest paths in planar graphs with nonne...
Abstract. We obtain the following results related to dynamic versions of the shortest-paths problem:...
We study novel combinatorial properties of graphs that allow us to devise a completely new approach...
We consider the problem of maintaining a solution to the All Pairs Shortest Paths Problem in a direc...
We describe Mgorithms for finding shortest paths and distances in a planar digraph which exploit the...
We describe algorithms for finding shortest paths and distances in a planar digraph which exploit th...
We address the problem of single-source shortest path computation in digraphs with non-negative edg...
We consider the problem of dynamically maintaining a solution of all pairs shortest paths in a direc...