The generalized 4-connectivity of bubble-sort graphs

Abstract

For S⊂eq V(G) with |S| 2, let G (S) denote the maximum number of internally disjoint trees connecting S in G. For 2 k n, the generalized k-connectivity k(G) of an n-vertex connected graph G is defined to be k(G)= \G(S): S∈ V(G) and |S|=k\. The generalized k-connectivity can serve for measuring the fault tolerance of an interconnection network. The bubble-sort graph Bn for n 2 is a Cayley graph over the symmetric group of permutations on [n] generated by transpositions from the set \[1,2],[2,3],…, [n-1,n]\. In this paper, we show that for the bubble-sort graphs Bn with n 3, 4(Bn)=n-2.