The degree diameter problem involves finding the largest graph (in terms of the number of vertices) subject to constraints on the degree and the diameter of the graph. Beyond the degree constraint there is no restriction on the number of edges (apart from keeping the graph simple) so the resulting graph may be thought of as being embedded in the complete graph. In a generalization of this problem, the graph is considered to be embedded in some connected host graph, in this paper the honeycomb network. We consider embedding the graph in the kk-dimensional honeycomb grid and provide upper and lower bounds for the optimal graph. The particular cases of dimensions 2 and 3 are examined in detail
AbstractThe Degree/diameter problem asks for the largest graphs given diameter and maximum degree. T...
AbstractThis article deals with combinatorial problems motivated by the design of large interconnect...
A well-known fundamental problem in extremal graph theory is the degree/diameter problem, which is t...
The degree diameter problem involves finding the largest graph (in terms of number of vertices) subj...
The degree diameter problem explores the biggest graph (in terms of number of nodes) subject to some...
We present an optimal embedding of a honeycomb network (honeycomb mesh and honeycomb torus) of size ...
The problem of finding the largest connected subgraph of a given undirected host graph, subject to c...
The degree-diameter problem asks for the maximum number of vertices in agraph with maximum degree an...
We introduce the problem of finding the largest subgraph of a given weighted undirected graph (host ...
The problem of finding the largest connected subgraph of a given undirected host graph, subject to c...
We introduce the problem of finding the largest subgraph of a given weighted undirected graph (host ...
International audienceWe define the higher dimensional honeycomb graphs as a generalization of hexag...
Research Doctorate - Doctor of Philosophy (PhD)This thesis investigates and provides several answers...
We dene the higher dimensional honeycomb graphs as a generalization of hexagonal plane tessellation,...
Given a fixed diameter and maximum degree, the degree/diameter problem involves finding the maximum ...
AbstractThe Degree/diameter problem asks for the largest graphs given diameter and maximum degree. T...
AbstractThis article deals with combinatorial problems motivated by the design of large interconnect...
A well-known fundamental problem in extremal graph theory is the degree/diameter problem, which is t...
The degree diameter problem involves finding the largest graph (in terms of number of vertices) subj...
The degree diameter problem explores the biggest graph (in terms of number of nodes) subject to some...
We present an optimal embedding of a honeycomb network (honeycomb mesh and honeycomb torus) of size ...
The problem of finding the largest connected subgraph of a given undirected host graph, subject to c...
The degree-diameter problem asks for the maximum number of vertices in agraph with maximum degree an...
We introduce the problem of finding the largest subgraph of a given weighted undirected graph (host ...
The problem of finding the largest connected subgraph of a given undirected host graph, subject to c...
We introduce the problem of finding the largest subgraph of a given weighted undirected graph (host ...
International audienceWe define the higher dimensional honeycomb graphs as a generalization of hexag...
Research Doctorate - Doctor of Philosophy (PhD)This thesis investigates and provides several answers...
We dene the higher dimensional honeycomb graphs as a generalization of hexagonal plane tessellation,...
Given a fixed diameter and maximum degree, the degree/diameter problem involves finding the maximum ...
AbstractThe Degree/diameter problem asks for the largest graphs given diameter and maximum degree. T...
AbstractThis article deals with combinatorial problems motivated by the design of large interconnect...
A well-known fundamental problem in extremal graph theory is the degree/diameter problem, which is t...