Group-theoretic generalisations of vertex and edge connectivities

Abstract

Let p be an odd prime. Let P be a finite p-group of class 2 and exponent p, whose commutator quotient P/[P,P] is of order pn. We define two parameters for P related to central decompositions. The first parameter, (P), is the smallest integer s for the existence of a subgroup S of P satisfying (1) S [P,P]=[S,S], (2) |S/[S,S]|=pn-s, and (3) S admits a non-trivial central decomposition. The second parameter, λ(P), is the smallest integer s for the existence of a central subgroup N of order ps, such that P/N admits a non-trivial central decomposition. While defined in purely group-theoretic terms, these two parameters generalise respectively the vertex and edge connectivities of graphs: For a simple undirected graph G, through the classical procedures of Baer (Trans. Am. Math. Soc., 1938), Tutte (J. Lond. Math. Soc., 1947) and Lov\'asz (B. Braz. Math. Soc., 1989), there is a p-group of class 2 and exponent p PG that is naturally associated with G. Our main results show that the vertex connectivity (G) is equal to (PG), and the edge connectivity λ(G) is equal to λ(PG). We also discuss the relation between (P) and λ(P) for a general p-group P of class 2 and exponent p, as well as the computational aspects of these parameters.