AbstractDe Bruijn and Kautz graphs have been intensively studied as perspective interconnection networks of massively parallel computers. One of the crucial parameters of an interconnection network is its bisection width. It has an influence on both communication properties of the network and the algorithmic design. We prove optimal bounds on the edge and vertex bisection widths of the k-ary n-dimensional de Bruijn digraph. This generalizes known results for k = 2 and improves the upper bound for the vertex bisection width. We extend the method to prove optimal upper and lower bounds on the edge and vertex bisection widths of Kautz graphs
Motivated by the work on the domination number of directed de Bruijn graphsand some of its generaliz...
AbstractWe derive new upper bounds on the bisection width of graphs which have a regular vertex degr...
AbstractIn this paper we provide an explicit way to compute asymptotically almost sure upper bounds ...
AbstractDe Bruijn and Kautz graphs have been intensively studied as perspective interconnection netw...
International audienceMotivated by the work on the domination number of directed de Bruijn graphs an...
The restricted edge-connectivity of a graph is an important parameter to measure fault-tolerance of ...
AbstractThe communication overhead is a major bottleneck for the execution of a process graph on a p...
AbstractWe prove that, for any p≤d, there exists a spanning directed p-ary tree of depth at most D⌈l...
AbstractA new way to expand De Bruijn and Kautz graphs is presented. It consists of deleting superfl...
AbstractWe prove lower and upper bounds on bisection width of transposition graphs. This class of gr...
Abstract. The bisection width of interconnection networks has always been im-portant in parallel com...
A connected graph is said to be super edge-connected if every minimum edge-cut isolates a vertex. Th...
AbstractIn this paper, we show that: (i) For n-dimensional undirected binary de Bruijn graphs, UB(n)...
A bisection of a graph is a bipartition of its vertex set in which the number of vertices in the two...
We deal with global communication on connected graphs. First, we consider the case of the total exch...
Motivated by the work on the domination number of directed de Bruijn graphsand some of its generaliz...
AbstractWe derive new upper bounds on the bisection width of graphs which have a regular vertex degr...
AbstractIn this paper we provide an explicit way to compute asymptotically almost sure upper bounds ...
AbstractDe Bruijn and Kautz graphs have been intensively studied as perspective interconnection netw...
International audienceMotivated by the work on the domination number of directed de Bruijn graphs an...
The restricted edge-connectivity of a graph is an important parameter to measure fault-tolerance of ...
AbstractThe communication overhead is a major bottleneck for the execution of a process graph on a p...
AbstractWe prove that, for any p≤d, there exists a spanning directed p-ary tree of depth at most D⌈l...
AbstractA new way to expand De Bruijn and Kautz graphs is presented. It consists of deleting superfl...
AbstractWe prove lower and upper bounds on bisection width of transposition graphs. This class of gr...
Abstract. The bisection width of interconnection networks has always been im-portant in parallel com...
A connected graph is said to be super edge-connected if every minimum edge-cut isolates a vertex. Th...
AbstractIn this paper, we show that: (i) For n-dimensional undirected binary de Bruijn graphs, UB(n)...
A bisection of a graph is a bipartition of its vertex set in which the number of vertices in the two...
We deal with global communication on connected graphs. First, we consider the case of the total exch...
Motivated by the work on the domination number of directed de Bruijn graphsand some of its generaliz...
AbstractWe derive new upper bounds on the bisection width of graphs which have a regular vertex degr...
AbstractIn this paper we provide an explicit way to compute asymptotically almost sure upper bounds ...