The cycle structure of compositions of random involutions

Abstract

In this article we consider the cycle structure of compositions of pairs of involutions in the symmetric group Sn chosen uniformly at random. These can be modeled as modified 2-regular graphs, giving rise to exponential generating functions. A composition of two random involutions in Sn typically has about n(1/2) cycles, and the cycles are characteristically of length n(1/2). Compositions of two random fixed-point-free involutions, on the other hand, typically have about log n cycles and are closely related to permutations with all cycle lengths even. The number of factorizations of a random permutation into two involutions appears to be asymptotically lognormally distributed, which we prove for a closely related probabilistic model. This study is motivated by the observation that the number of involutions in [n] is (n!)(1/2) times a subexponential factor; more generally the number of permutations with all cycle lengths in a finite set S is n!(1-1/m) times a subexponential factor, and the typical number of k-cycles is nearly n(k/m)/k. Connections to pattern avoidance in involutions are also considered.