Add to ORKGWe consider the degree-diameter problem for undirected and directed circulant graphs. To date, attempts to generate families of large circulant graphs of arbitrary degree for a given diameter have concentrated mainly on the diameter 2 case. We present a direct product construction yielding improved bounds for small diameters and introduce a new general technique for “stitching” together circulant graphs which enables us to improve the current best known asymptotic orders for every diameter. As an application, we use our constructions in the directed case to obtain upper bounds on the minimum size of a subset A of a cyclic group of order n such that the k-fold sumset kA is equal to the whole group. We also present a revised table of largest ...
The largest order n(d,k) of a graph of maximum degree d and diameter k cannot exceed the Moore bound...
AbstractFor a variety of infinite sets of positive integers d related to odd prime powers we describ...
Let CC(d,2) and AC(d,2) be the largest order of a Cayley graph of a cyclic and an Abelian group, res...
We consider the degree-diameter problem for undirected and directed circulant graphs. To date, attem...
This paper considers the degree-diameter problem for undirected circulant graphs. The focus is on ex...
The degree-diameter problem seeks to find the largest possible number of vertices in a graph having ...
This thesis concerns the analysis and construction of extremal circulant and other Abelian Cayley gr...
We consider the degree-diameter problem for Cayley graphs of dihedral groups. We find upper and lowe...
This paper discusses the most popular algebraic techniques and computational methods that have been ...
This paper discusses the most popular algebraic techniques and computational methods that have been...
AbstractLet CC(d,2) and AC(d,2) be the largest order of a Cayley graph of a cyclic and an Abelian gr...
We consider a number of problems in graph theory, with the unifying theme being the properties of gr...
AbstractLet Cd,k be the largest number of vertices in a Cayley graph of degree d and diameter k. We ...
We present families of large undirected and directed Cayley graphs whose construction is related to ...
In 1994, Dinneen and Hafner (Networks 24 No. 7, 359–367) published a table of largest orders of grap...
The largest order n(d,k) of a graph of maximum degree d and diameter k cannot exceed the Moore bound...
AbstractFor a variety of infinite sets of positive integers d related to odd prime powers we describ...
Let CC(d,2) and AC(d,2) be the largest order of a Cayley graph of a cyclic and an Abelian group, res...
We consider the degree-diameter problem for undirected and directed circulant graphs. To date, attem...
This paper considers the degree-diameter problem for undirected circulant graphs. The focus is on ex...
The degree-diameter problem seeks to find the largest possible number of vertices in a graph having ...
This thesis concerns the analysis and construction of extremal circulant and other Abelian Cayley gr...
We consider the degree-diameter problem for Cayley graphs of dihedral groups. We find upper and lowe...
This paper discusses the most popular algebraic techniques and computational methods that have been ...
This paper discusses the most popular algebraic techniques and computational methods that have been...
AbstractLet CC(d,2) and AC(d,2) be the largest order of a Cayley graph of a cyclic and an Abelian gr...
We consider a number of problems in graph theory, with the unifying theme being the properties of gr...
AbstractLet Cd,k be the largest number of vertices in a Cayley graph of degree d and diameter k. We ...
We present families of large undirected and directed Cayley graphs whose construction is related to ...
In 1994, Dinneen and Hafner (Networks 24 No. 7, 359–367) published a table of largest orders of grap...
The largest order n(d,k) of a graph of maximum degree d and diameter k cannot exceed the Moore bound...
AbstractFor a variety of infinite sets of positive integers d related to odd prime powers we describ...
Let CC(d,2) and AC(d,2) be the largest order of a Cayley graph of a cyclic and an Abelian group, res...