Factorization number and subgroup commutativity degree via spectral invariants

Abstract

The factorization number F2(G) of a finite group G is the number of all possible factorizations of G=HK as product of its subgroups H and K, while the subgroup commutativity degree sd(G) of G is the probability of finding two commuting subgroups in G at random. It is known that sd(G) can be expressed in terms of F2(G). Denoting by L(G) the subgroups lattice of G, the non--permutability graph of subgroups L(G) of G is the graph with vertices in L(G) CL(G)(L(G)), where CL(G)(L(G)) is the smallest sublattice of L(G) containing all permutable subgroups of G, and edges obtained by joining two vertices X,Y such that XY≠ YX. The spectral properties of L(G) have been recently investigated in connection with F2(G) and sd(G). Here we show a new combinatorial formula, which allows us to express F2(G), and so sd(G), in terms of adjacency and Laplacian matrices of L(G).