Analytic Disks and the Projective Hull

Abstract

Let X be a complex manifold and c a simple closed curve in X. We address the question: What conditions on c ensure the existence of a 1-dimensional complex subvariety V with boundary c in X. When X = Cn, an answer to this question involves the polynomial hull of gamma. When X = Pn, complex projective space, the projective hull hatc of c comes into play. One always has V contained in hatc, and for analytic curves they conjecturally coincide. In this paper we establish an approximate analogue of this idea which holds without the analyticity of c. We characterize points in hatc as those which lie on a sequence of analytic disks whose boundaries converge down to c. This is in the spirit of work of Poletsky and of Larusson-Sigurdsson, whose work is essential here. The results are applied to construct a remarkable example of a closed curve c in P2, which is real analytic at all but one point, and for which the closure of hatc is W L where L is a projective line and W is an analytic (non-algebraic) subvariety of P2 - L. Furthermore, hatc itself is the union of W with only two points on L.