On algebras of double cosets of symmetric groups with respect to Young subgroups

Abstract

We consider the subalgebra in the group algebra of the symmetric group G=Sn1+…+n consisting of all functions invariant with respect to left and right shifts by elements of the Young subgroup H:=Sn1× … × Sn. We discuss structure constants of the algebra and construct an algebra with continuous parameters n1 extrapolating algebras , it can be also can be rewritten as an asymptotic algebra as nj∞ (for fixed ). We show that there is a natural map from the Lie algebra of the group of pure braids to (and therefore this Lie algebra acts in spaces of multiplicities of the quasiregular representation of the group G in functions on G/H).