Approximation of holomorphic maps with a lower bound on the rank

Abstract

Let K be a closed polydisc or ball in n, and let Y be a quasi projective algebraic manifold which is Zariski locally equivalent to p, or a complement of an algebraic subvariety of codimension 2 in such manifold. If r is an integer satisfying (n-r+1) (p-r+1)≥ 2 then every holomorphic map from a neighborhood of K to Y with rank r at every point of K can be approximated uniformly on K by entire maps n Y with rank r at every point of n.

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