Graph embedding problems have gained importance in the field of interconnection networks for parallel computer architectures. Interconnection networks provide an effective mechanism for exchanging data between processors in a parallel computing system. In this paper, we introduce a technique to obtain a lower bound for dilation of an embedding. Moreover, we give algorithms to compute exact dilation of embedding circulant network into a triangular grid, Tower of Hanoi graph and Sierpinski gasket graph, proving that the lower bound obtained is sharp
An embedding of the graph G in the graph H is a one-to-one association of the vertices of G with th...
[[abstract]]We present an algorithm to map the nodes of a 3-dimensional grid to the nodes of its opt...
In a geometric network G=(S,E), the graph distance between two vertices u,vS is the length of the sh...
AbstractWe prove exact results on dilations in cycles for important parallel computer interconnectio...
We present a new technique for the embedding of large cube-connected cycles networks (CCC) into smal...
We survey general results on congestion and dilation, and their special cases (cyclic) cutwidth and...
Various researchers have shown that the binary n- cube (or hypercube) can embed any r-ary m-cubes, ...
We prove several exact results for the dilation of well-known interconnection networks in cycles, na...
We consider one-to-one embeddings of the n-dimensional hypercube into grids with 2 n vertices and ...
We present an algorithm to map the nodes of a 3-dimensional grid to the nodes of its optimal hypercu...
Let S be a set of points in the plane. What is the minimum possible dilation of all plane graphs tha...
We present a new technique for the embedding of large cube-connected cycles networks (CCC) into smal...
Let S be a set of points in the plane. What is the minimum possible dilation of all plane graphs tha...
We consider several graph embedding problems which have a lot of important applications in parallel ...
AbstractWe consider efficient simulations of mesh connected networks (or good representations of arr...
An embedding of the graph G in the graph H is a one-to-one association of the vertices of G with th...
[[abstract]]We present an algorithm to map the nodes of a 3-dimensional grid to the nodes of its opt...
In a geometric network G=(S,E), the graph distance between two vertices u,vS is the length of the sh...
AbstractWe prove exact results on dilations in cycles for important parallel computer interconnectio...
We present a new technique for the embedding of large cube-connected cycles networks (CCC) into smal...
We survey general results on congestion and dilation, and their special cases (cyclic) cutwidth and...
Various researchers have shown that the binary n- cube (or hypercube) can embed any r-ary m-cubes, ...
We prove several exact results for the dilation of well-known interconnection networks in cycles, na...
We consider one-to-one embeddings of the n-dimensional hypercube into grids with 2 n vertices and ...
We present an algorithm to map the nodes of a 3-dimensional grid to the nodes of its optimal hypercu...
Let S be a set of points in the plane. What is the minimum possible dilation of all plane graphs tha...
We present a new technique for the embedding of large cube-connected cycles networks (CCC) into smal...
Let S be a set of points in the plane. What is the minimum possible dilation of all plane graphs tha...
We consider several graph embedding problems which have a lot of important applications in parallel ...
AbstractWe consider efficient simulations of mesh connected networks (or good representations of arr...
An embedding of the graph G in the graph H is a one-to-one association of the vertices of G with th...
[[abstract]]We present an algorithm to map the nodes of a 3-dimensional grid to the nodes of its opt...
In a geometric network G=(S,E), the graph distance between two vertices u,vS is the length of the sh...