On a flow of operators associated to virtual permutations

Abstract

Kerov, Olshanski and Vershik introduced the so-called virtual permutations, defined as families of permutations (σN)N ≥ 1, σN in the symmetric group of order N, such that the cycle structure of σN can be deduced from the structure of σN+1 simply by removing the element N+1. The virtual permutations, and in particular the probability measures on the corresponding space which are invariant by conjugation, have been studied in a details by Tsilevich. In the present article, we prove that for a large class of such invariant measures (containing in particular the Ewens measure of any parameter θ ≥ 0), it is possible to associate a flow (Tα)α ∈ R of random operators on a suitable functional space. Moreover, if (σN)N ≥ 1 is a random virtual permutation following a distribution in the class described above, the operator Tα can be interpreted as the limit, in a sense which has to be made precise, of the permutation σNαN, where N goes to infinity and αN is equivalent to α N. In relation with this interpretation, we prove that the eigenvalues of the infinitesimal generator of (Tα)α ∈ R are equal to the limit of the rescaled eigenangles of the permutation matrix associated to σN.