Supergroup OSP(2,2n) and super Jacobi polynomials

Abstract

Coefficients of super Jacobi polynomials of type B(1,n) are rational functions in three parameters k,p,q. At the point (-1,0,0) these coefficient may have poles. Let us set q=0 and consider pair (k,p) as a point of A2. If we apply blow up procedure at the point (-1,0) then we get a new family of polynomials depending on parameter t∈ P. If t=∞ then we get supercharacters of Kac modules for Lie supergroup OSP(2,2n) and supercharacters of irreducible modules can be obtained for nonnegative integer t depending on highest weight. Besides we obtained supercharcters of projective covers as specialisation of some nonsingular modification of super Jacobi polynomials.