Extremal graphs with no subgraph admitting k+1 edge-disjoint spanning trees

Abstract

A graph G is τk-maximal if G contains no subgraph admitting k+1 edge-disjoint spanning trees, while the addition of any edge in the complement of G yields a subgraph that admits k+1 edge-disjoint spanning trees. In this paper, we prove that for any integers k≥ 1 and n≥ 2k+2, every τk-maximal graph of order n satisfies |E(G)|≤ (k+1)(n-1)-1. Furthermore, we construct a family of τk-maximal graphs on n 2k+2 vertices that have exactly (k+1)(n-1)-1 edges, which establishes the tightness of the upper bound. Then we conjecture that every τk-maximal graph on n vertices has exactly (k+1)(n-1)-1 edges, and we verify the conjecture for the case k=1.