Special classes of homomorphisms between generalized Verma modules for Uq(su(n,n))

Abstract

We study homomorphisms between quantized generalized Verma modules M(V)φ,1→M(V_1) for Uq(su(n,n)). There is a natural notion of degree for such maps, and if the map is of degree k, we write φk,1. We examine when one can have a series of such homomorphisms φ1_n-1,n φ1_n-2, n-1 ·s φ1,1 = Detq, where Detq denotes the map M(V) p→ Detq· p∈ M(V_n). If, classically, su(n,n) C= p-(su(n) su(n) C) p+, then = (L,R,λ) and n =(L,R,λ+2). The answer is then that must be one-sided in the sense that either L=0 or R=0 (non-exclusively). There are further demands on λ if we insist on Uq( g C) homomorphisms. However, it is also interesting to loosen this to considering only U-q( g C) homomorphisms, in which case the conditions on λ disappear. By duality, there result have implications on covariant quantized differential operators. We finish by giving an explicit, though sketched, determination of the full set of Uq( g C) homomorphisms φ1,1.