Holomorphic automorphisms of Markov-type surfaces

Abstract

Every complex surface of Markov type, i.e.\ the variety given by x2 + y2 + z2 + Exyz - Ax - By - Cz - D = 0, has the symplectic density property and the Hamiltonian density property. We prove a singular symplectic version of the Anders\'en--Lempert theorem for normal reduced affine complex varieties and apply it to describe the holomorphic symplectic automorphisms of a complex surface of Markov type. To this end, we also investigate the germs of vector fields in isolated singularities of type Ak and Dk. Moreover, we show that any injective self-map of the set of ordered Markov triples can be realized by a holomorphic symplectic automorphism.

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