The Pieri Rule at Infinity

Abstract

We study the structure of tensor products of gl(∞) = gl(n)-modules L( λ) F where L( λ) is a simple integrable highest weight module and F is a simple integrable weight multiplicity-free module. Both L( λ) and F are infinite dimensional, in particular F can be a Fock module. Similar tensor products of gl(n)-modules are semisimple and their simple constituents are described by the classical Pieri rule. We prove that a gl(∞)-module M:= L( λ) F is semisimple only in relatively trivial cases, and is indecomposable otherwise. Our main results are a description of the simple constituents of M, and the construction of a linkage filtration on M that provides information on when two simple constituents of M are linked. Using the linkage filtration, we compute the socle and radical filtrations of M, and determine when M is rigid.