Cycle Space Constructions for Exhaustions of Flag Domains

Abstract

In the study of complex flag manifolds, flag domains and their cycle spaces, a key point is the fact that the cycle space MD of a flag domain D is a Stein manifold. That fact has a long history. The earliest approach relied on construction of a strictly plurisubharmonic function on MD, starting with a q--convex exhaustion function on D, where q is the dimension of a particular maximal compact subvariety of D (we use the normalization that 0--convex means Stein). Construction of that exhaustion function on D required that D be measurable. In that case the exhaustion on D was transferred to MD, using a special case of a method due to Barlet. Here we do the opposite: we use an incidence method to construct a canonical plurisubharmonic exhaustion function on MD and use it in turn to construct a canonical q--convex exhaustion function on D. This promises to have strong consequences for cohomology vanishing theorems and the construction of admissible representations of real reductive Lie groups.