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Abstract Let be a finite group acting on a connected open Riemann surface by holomorphic automorphisms and acting on a Euclidean space by orthogonal transformations. We identify a necessary and sufficient condition for the existence of a ‐equivariant conformal minimal immersion . We show in particular that such a map always exists if acts without fixed points on . Furthermore, every finite group arises in this way for some open Riemann surface and . We obtain an analogous result for minimal surfaces having complete ends with finite total Gaussian curvature, and for discrete groups acting on properly discontinuously and acting on by rigid transformations.
Franc Forstnerič (Fri,) studied this question.
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