Regular immersions directed by algebraically elliptic cones

Abstract

Let M be an open Riemann surface and A be the punctured cone in Cn\0\ on a smooth projective variety Y in Pn-1. Recently, Runge approximation theorems with interpolation for holomorphic immersions Mn, directed by A, have been proved under the assumption that A is an Oka manifold. We prove analogous results in the algebraic setting, for regular immersions directed by A from a smooth affine curve M into Cn. The Oka property is naturally replaced by the stronger assumption that A is algebraically elliptic, which it is if Y is uniformly rational. Under this assumption, a homotopy-theoretic necessary and sufficient condition for approximation and interpolation emerges. We show that this condition is satisfied in many cases of interest.

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