Affine walled Brauer-Clifford superalgebras

Abstract

In this paper, a notion of affine walled Brauer-Clifford superalgebras BCr, t aff is introduced over an arbitrary integral domain R containing 2-1. These superalgebras can be considered as affinization of walled Brauer superalgebras in JK. By constructing infinite many homomorphisms from BCr, t aff to a class of level two walled Brauer-Clifford superagebras over C, we prove that BCr, t aff is free over R with infinite rank. We explain that any finite dimensional irreducible BCr, t aff -module over an algebraically closed field F of characteristic not 2 factors through a cyclotomic quotient of BCr, t aff , called a cyclotomic (or level k) walled Brauer-Clifford superalgebra BCk, r, t. Using a previous method on cyclotomic walled Brauer algebras in RSu1, we prove that BCk, r, t is free over R with super rank (kr+t2r+t-1 (r+t)!, kr+t2r+t-1 (r+t)!) if and only if it is admissible in the sense of Definition~6.4. Finally, we prove that the degenerate affine (resp., cyclotomic) walled Brauer-Clifford superalgebras defined by Comes-Kujawa in CK are isomorphic to our affine (resp., cyclotomic) walled Brauer-Clifford superalgebras.