Cell modules for the Temperley-Lieb algebra in mixed characteristic

Abstract

We study the representation theory of the Temperley-Lieb algebra TLnk(δ) in mixed characteristic, i.e. over an arbitrary field k of characteristic p and where δ satisfies some minimal polynomial mδ. In particular, we completely describe the submodule structure of cell modules for TLn and give their Alperin diagrams. The proof is entirely diagrammatic and does not appeal to the role of TLn as the endomorphism algebra of tensor powers of the fundamental representation of Uq(sl2). We also investigate two-dimensional Jantzen-like filtrations of the cell modules related to the mixed characteristic.