Every conformal minimal surface in R3 is isotopic to the real part of a holomorphic null curve
Abstract
In this paper, we show that for every conformal minimal immersion u:M R3 from an open Riemann surface M to R3 there exists a smooth isotopy ut:M3 (t∈ [0,1]) of conformal minimal immersions, with u0=u, such that u1 is the real part of a holomorphic null curve M C3 (i.e. u1 has vanishing flux). Furthermore, if u is nonflat then u1 can be chosen to have any prescribed flux and to be complete.
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