Classification of indecomposable states on the infinite symmetric inverse semigroup invariant under the infinite symmetric group. Semifinite case

Abstract

Let N be a set of the natural numbers. Symmetric inverse semigroup R∞ is the semigroup of all infinite 0-1 matrices [gij] with at most one 1 in each row and each column such that gii=1 on the complement of a finite set. The binary operation in R∞ is the ordinary matrix multiplication. It is clear that infinite symmetric group S∞ is a subgroup of R∞. The map :[ gij][ gji] is an involution on R∞. We call a function f on R∞ positive definite if for all r1, r2, …, rn∈ R∞ the matrix [ f( rirj)] is Hermitian and positive semi-definite. A function f said to be indecomposable if the corresponding -representation πf is a factor-representation. A class of the S∞-invariant functions is defined by the condition f(rs)=f(sr) for all r∈ R∞ and s∈S∞. In this paper we classify all semifinite factor-representations of R∞ that correspond to the S∞-invariant positive definite functions.