Add to ORKGA k-geodetic digraph G is a digraph in which, for every pair of vertices u and v (not necessarily distinct), there is at most one walk of length at most k from u to v. If the diameter of G is k, we say that G is strongly geodetic. Let N(d,k) be the smallest possible order for a k-geodetic digraph of minimum out-degree d, then N(d,k) is at most 1+d+d^2+...+d^k=M(d,k), where M(d,k) is the Moore bound obtained if and only if G is strongly geodetic. Thus strongly geodetic digraphs only exist for d=1 or k=1, hence for d,k >1 we wish to determine if N(d,k)=M(d,k)+1 is possible. A k-geodetic digraph with minimum out-degree d and order M(d,k)+1 is denoted as a (d,k,1)-digraph or said to have excess 1.In this paper we will prove that a (d,k,1)-di...
Abstract. It is well known that Moore digraphs of degree d > 1 and diameter k > 1 do not exist...
AbstractA digraph G = (V, E) with diameter D is said to be s-geodetic, for 1 ⩽ s ⩽ D, if between any...
Abstract. It is well known that Moore digraphs of degree d > 1 and diameter k > 1 do not exist...
A k-geodetic digraph G is a digraph in which, for every pair of vertices u and v (not necessarily di...
A k-geodetic digraph with minimum out-degree d has excess ϵ if it has order M(d,k)+ϵ, where M(d,k) r...
The degree/diameter problem for directed graphs is the problem of determining the largest possible o...
We consider three problems in extremal graph theory, namely the degree/diameter problem, the degree/...
AbstractAn almost Moore digraph is a digraph of diameter k⩾2, maximum out-degree d⩾2 and order n=d+d...
Moore digraphs, that is digraphs with out-degree d, diameter k and order equal to the Moore bound M(...
<pre>The degree/diameter problem for directed graphs is the problem of determining the largest possi...
The Moore bound for a diregular digraph of degree d and diameter k is M d;k = 1 + d + : : : + d k ...
Since Moore digraphs do not exist for k ≠ 1 and d ≠ 1, the problem of finding digraphs of out-degree...
AbstractIn the context of the degree/diameter problem for directed graphs, it is known that the numb...
AbstractIt was conjectured by Caccetta and Häggkvist in 1978 that the girth of every digraph with n ...
AbstractA digraph G = (V, E) with diameter D is said to be s-geodetic, for 1 ⩽ s ⩽ D, if between any...
Abstract. It is well known that Moore digraphs of degree d > 1 and diameter k > 1 do not exist...
AbstractA digraph G = (V, E) with diameter D is said to be s-geodetic, for 1 ⩽ s ⩽ D, if between any...
Abstract. It is well known that Moore digraphs of degree d > 1 and diameter k > 1 do not exist...
A k-geodetic digraph G is a digraph in which, for every pair of vertices u and v (not necessarily di...
A k-geodetic digraph with minimum out-degree d has excess ϵ if it has order M(d,k)+ϵ, where M(d,k) r...
The degree/diameter problem for directed graphs is the problem of determining the largest possible o...
We consider three problems in extremal graph theory, namely the degree/diameter problem, the degree/...
AbstractAn almost Moore digraph is a digraph of diameter k⩾2, maximum out-degree d⩾2 and order n=d+d...
Moore digraphs, that is digraphs with out-degree d, diameter k and order equal to the Moore bound M(...
<pre>The degree/diameter problem for directed graphs is the problem of determining the largest possi...
The Moore bound for a diregular digraph of degree d and diameter k is M d;k = 1 + d + : : : + d k ...
Since Moore digraphs do not exist for k ≠ 1 and d ≠ 1, the problem of finding digraphs of out-degree...
AbstractIn the context of the degree/diameter problem for directed graphs, it is known that the numb...
AbstractIt was conjectured by Caccetta and Häggkvist in 1978 that the girth of every digraph with n ...
AbstractA digraph G = (V, E) with diameter D is said to be s-geodetic, for 1 ⩽ s ⩽ D, if between any...
Abstract. It is well known that Moore digraphs of degree d > 1 and diameter k > 1 do not exist...
AbstractA digraph G = (V, E) with diameter D is said to be s-geodetic, for 1 ⩽ s ⩽ D, if between any...
Abstract. It is well known that Moore digraphs of degree d > 1 and diameter k > 1 do not exist...