Translation functors and decomposition numbers for the periplectic Lie superalgebra p(n)

Abstract

We study the category Fn of finite-dimensional integrable representations of the periplectic Lie superalgebra p(n). We define an action of the Temperley--Lieb algebra with infinitely many generators and defining parameter 0 on the category Fn by translation functors. We also introduce combinatorial tools, called weight diagrams and arrow diagrams for p(n) resembling those for gl(m|n). Using the Temperley--Lieb algebra action and the combinatorics of weight and arrow diagrams, we then calculate the multiplicities of standard and costandard modules in indecomposable projective modules and classify the blocks of Fn. We also prove that indecomposable projective modules in this category are multiplicity-free.