All links are semiholomorphic

Abstract

Semiholomorphic polynomials are functions f:C2 that can be written as polynomials in complex variables u, v and the complex conjugate v. We prove the semiholomorphic analogoue of Akbulut's and King's "All knots are algebraic", that is, every link type in the 3-sphere arises as the link of a weakly isolated singularity of a semiholomorphic polynomial. Our proof is constructive, which allows us to obtain an upper bound on the polynomial degree of the constructed functions.

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