Extremal Problems for the Family of k-Strongly Connected Digraphs

Abstract

Let D be a family of digraphs. A digraph D is D-saturated if it contains no member of D as a subdigraph, but for any arc e in the complement of D, the digraph D + e contains some member of D as a subdigraph. The saturation number sat(n,D) and the extremal number ex(n,D) are the minimum number and the maximum number of arcs among all n-vertex D-saturated digraphs. For a positive integer k, let Dk denote the family of k-strongly connected digraphs. In this paper, firstly, we prove that sat(n,Dk)=(k-1)(2n-k)+n-k+12. Then for n≥ 3(k-1), we prove that ex(n,Dk)≤ n-k+12+176(k-1)(n-k+1). In addition, we conjecture that for sufficiently large n, ex(n,Dk)=n2+32(k-43)(n-k+1).