The polynomially convex embedding dimension of real manifolds of dimension ≤ 11

Abstract

We show that any compact smooth real n-dimensional manifold M with n≤ 11 can be smoothly embedded into Cn+1 as a polynomially convex set. In general, there is no such embedding into Cn. This solves a problem by Izzo and Stout for n≤ 11. Additionally, we show that the image M of M in Cn+1 is stratified totally real. As a consequence, by a result in [13], each continuous complex-valued functions on M is the uniform limit on M of holomorphic polynomials in Cn+1. Our proof is based on the jet transversality theorem and a slight improvement of a perturbation result by the first and the third author.

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