The Projective Hull of Certain Curves in C2
Abstract
The projective hull X of a subset X in complex projective space Pn is an analogue of the classical polynomial hull of a set in Cn. If X is contained in an affine chart Cn on Pn, then the affine part of X is the set of points x in Cn for which there exists a constant M=Mx so that |p(x)| < Md sup|p(y)| : y in X for all polynomials p of degree less than or equal to d, and any d > 0. Let X(M) be the set of points x where Mx can be chosen < M. Using an argument of E. Bishop, we show the following. Let G be a compact real analytic curve (not necessarily connected) in C2. Then for any linear projection p: C2 --> C1, the set of points in G(M) lying above a point z in C1 is finite for almost all z. Using this, we prove the conjecture that for any compact stable real-analytic curve G in Pn, the set G-G is a 1-dimensional complex analytic subvariety of Pn-G.
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