For a strongly connected digraph D the minimum ,cardinality of an arc-cut over all arc-cuts restricted arc-connectivity λ′(D) is defined as the S satisfying that D - S has a non-trivial strong component D1 such th...For a strongly connected digraph D the minimum ,cardinality of an arc-cut over all arc-cuts restricted arc-connectivity λ′(D) is defined as the S satisfying that D - S has a non-trivial strong component D1 such that D - V(D1) contains an arc. Let S be a subset of vertices of D. We denote by w+(S) the set of arcs uv with u ∈ S and v S, and by w-(S) the set of arcs uv with u S and v ∈ S. A digraph D = (V, A) is said to be λ′-optimal if λ′(D) =ξ′(D), where ξ′(D) is the minimum arc-degree of D defined as ξ(D) = min {ξ′(xy) : xy ∈ A}, and ξ′(xy) = min(|ω+({x,y})|, |w-({x,y})|, |w+(x) ∪ w- (y) |, |w- (x) ∪ω+ (y)|}. In this paper a sufficient condition for a s-geodetic strongly connected digraph D to be λ′-optimal is given in terms of its diameter. Furthermore we see that the h-iterated line digraph Lh(D) of a s-geodetic digraph is λ′-optimal for certain iteration h.展开更多
基金Supported by the Ministry of Education and Science, Spainthe European Regional Development Fund (ERDF) under project MTM2008-06620-C03-02the Andalusian Government under project P06-FQM-01649
文摘For a strongly connected digraph D the minimum ,cardinality of an arc-cut over all arc-cuts restricted arc-connectivity λ′(D) is defined as the S satisfying that D - S has a non-trivial strong component D1 such that D - V(D1) contains an arc. Let S be a subset of vertices of D. We denote by w+(S) the set of arcs uv with u ∈ S and v S, and by w-(S) the set of arcs uv with u S and v ∈ S. A digraph D = (V, A) is said to be λ′-optimal if λ′(D) =ξ′(D), where ξ′(D) is the minimum arc-degree of D defined as ξ(D) = min {ξ′(xy) : xy ∈ A}, and ξ′(xy) = min(|ω+({x,y})|, |w-({x,y})|, |w+(x) ∪ w- (y) |, |w- (x) ∪ω+ (y)|}. In this paper a sufficient condition for a s-geodetic strongly connected digraph D to be λ′-optimal is given in terms of its diameter. Furthermore we see that the h-iterated line digraph Lh(D) of a s-geodetic digraph is λ′-optimal for certain iteration h.
