We prove lower bounds on the complexity of maintaining fully dynamic $k$-edge or $k$-vertex connectivity in plane graphs and in $(k-1)$-vertex connected graphs. We show an amortized lower bound of $\Omega(\log n/k(\log\log n + \log b))$ per edge insertion or deletion or per query operation in the cell probe model, where $b$ is the word size of the machine and $n$ is the number of vertices in $G$. We also show an amortized lower bound of $\Omega(\log n/(\log\log n + \log b))$ per operation for fully dynamic planarity testing in embedded graphs. These are the first lower bounds for dynamic connectivity problems
Deterministic fully dynamic graph algorithms are presented for connectivity and minimum spanning for...
We consider graphs whose vertices may be in one of two different states: either on or off . We wish ...
Dynamic connectivity is an extremely well-studied problem, but so far the most compelling progress h...
We prove lower bounds on the complexity of maintaining fully dynamic $k$-edge or $k$-vertex connecti...
We prove lower bounds on the complexity of maintaining fully dynamic k-edge or k-vertex connectivity...
International audienceA dynamic graph algorithm is a data structure that answers queries about a pro...
Dynamic connectivity is one of the most fundamental problems in dynamic graphalgorithms. We present ...
We show an algorithm for dynamic maintenance of connectivity information in an undirected planar gra...
We give new deterministic bounds for fully-dynamic graph connectivity. Our data structure supports u...
We study the complexity of the dynamic partial sum problem in the cell-probe model. We give the mode...
We show an algorithm for dynamic maintenance of connectivity information in an undirected planar gra...
This paper studies the problem of maintaining the 2-edge-connected components of a graph undergoing ...
Abstract We introduce new models for dynamic computation based on the cell probe model of Fredman an...
We state a new sampling lemma and use it to improve the running time of dynamic graph algorithms. F...
We present fully dynamic algorithms for maintaining the biconnected components in general and plane...
Deterministic fully dynamic graph algorithms are presented for connectivity and minimum spanning for...
We consider graphs whose vertices may be in one of two different states: either on or off . We wish ...
Dynamic connectivity is an extremely well-studied problem, but so far the most compelling progress h...
We prove lower bounds on the complexity of maintaining fully dynamic $k$-edge or $k$-vertex connecti...
We prove lower bounds on the complexity of maintaining fully dynamic k-edge or k-vertex connectivity...
International audienceA dynamic graph algorithm is a data structure that answers queries about a pro...
Dynamic connectivity is one of the most fundamental problems in dynamic graphalgorithms. We present ...
We show an algorithm for dynamic maintenance of connectivity information in an undirected planar gra...
We give new deterministic bounds for fully-dynamic graph connectivity. Our data structure supports u...
We study the complexity of the dynamic partial sum problem in the cell-probe model. We give the mode...
We show an algorithm for dynamic maintenance of connectivity information in an undirected planar gra...
This paper studies the problem of maintaining the 2-edge-connected components of a graph undergoing ...
Abstract We introduce new models for dynamic computation based on the cell probe model of Fredman an...
We state a new sampling lemma and use it to improve the running time of dynamic graph algorithms. F...
We present fully dynamic algorithms for maintaining the biconnected components in general and plane...
Deterministic fully dynamic graph algorithms are presented for connectivity and minimum spanning for...
We consider graphs whose vertices may be in one of two different states: either on or off . We wish ...
Dynamic connectivity is an extremely well-studied problem, but so far the most compelling progress h...