AbstractA new way to expand De Bruijn and Kautz graphs is presented. It consists of deleting superfluous sets of edges (i.e., those whose removal does not increase the diameter) and adding new vertices and new edges preserving the maximum degree and the diameter. The number of vertices added to the Kautz graph, for a fixed maximum degree greater than four, is exponential on the diameter. Tables with lower bounds for the order of superfluous sets of edges and the number of vertices that can be added, are presented
AbstractIn this paper, we prove the existence of ranking and unranking algorithms on d-ary de Bruijn...
AbstractIn this paper we consider the total domination number and the total bondage number for digra...
AbstractThe concept of expansion of a graph has proved to be an efficient tool in the study of media...
AbstractA new way to expand De Bruijn and Kautz graphs is presented. It consists of deleting superfl...
AbstractDe Bruijn and Kautz graphs have been intensively studied as perspective interconnection netw...
AbstractWe introduce a method of division of vectors to extend the definitions of de Bruijn graphs a...
AbstractThis article deals with combinatorial problems motivated by the design of large interconnect...
AbstractWe give here a complete description of the spectrum of de Bruijn and Kautz graphs. It is wel...
We study the complexity of approximating the vertex expansion of graphs G = (V, E), defined as φV de...
AbstractWe study the problem of testing the expansion of graphs with bounded degree d in sublinear t...
AbstractWe denote by ex(n;{C3,C4,…,Cs}) or fs(n) the maximum number of edges in a graph of order n a...
We study the problem of testing the expansion of graphs with bounded degree d in sublinear time. A g...
This research paper was completed and submitted at Nipissing University, and is made freely accessib...
Additional file 1. Supplementary material for “Scalable, ultra-fast, and low-memory construction of ...
在Moor-Shannon网络模型中,边连通度和限制边连通度较大的网络一般有较好的可靠性和容错性.本文证明:除两种平凡情形外,无向Kautz网络的拓扑结构,无向Kautz图UK(2,n)是超级限制边连...
AbstractIn this paper, we prove the existence of ranking and unranking algorithms on d-ary de Bruijn...
AbstractIn this paper we consider the total domination number and the total bondage number for digra...
AbstractThe concept of expansion of a graph has proved to be an efficient tool in the study of media...
AbstractA new way to expand De Bruijn and Kautz graphs is presented. It consists of deleting superfl...
AbstractDe Bruijn and Kautz graphs have been intensively studied as perspective interconnection netw...
AbstractWe introduce a method of division of vectors to extend the definitions of de Bruijn graphs a...
AbstractThis article deals with combinatorial problems motivated by the design of large interconnect...
AbstractWe give here a complete description of the spectrum of de Bruijn and Kautz graphs. It is wel...
We study the complexity of approximating the vertex expansion of graphs G = (V, E), defined as φV de...
AbstractWe study the problem of testing the expansion of graphs with bounded degree d in sublinear t...
AbstractWe denote by ex(n;{C3,C4,…,Cs}) or fs(n) the maximum number of edges in a graph of order n a...
We study the problem of testing the expansion of graphs with bounded degree d in sublinear time. A g...
This research paper was completed and submitted at Nipissing University, and is made freely accessib...
Additional file 1. Supplementary material for “Scalable, ultra-fast, and low-memory construction of ...
在Moor-Shannon网络模型中,边连通度和限制边连通度较大的网络一般有较好的可靠性和容错性.本文证明:除两种平凡情形外,无向Kautz网络的拓扑结构,无向Kautz图UK(2,n)是超级限制边连...
AbstractIn this paper, we prove the existence of ranking and unranking algorithms on d-ary de Bruijn...
AbstractIn this paper we consider the total domination number and the total bondage number for digra...
AbstractThe concept of expansion of a graph has proved to be an efficient tool in the study of media...