Abstract:
As is well known, every finite subgroup of the automorphism group of the polynomial algebra of rank two over a field of characteristic zero is conjugate to the subgroup of linear automorphisms. We show that this can fail for an arbitrary periodic subgroup. We construct an example of an Abelian $p$-subgroup of the automorphism group of the polynomial algebra of rank two over the field of complex numbers which is not conjugate to any subgroup of linear automorphisms.
Keywords:polynomial algebra of rank two, linear automorphism, $p$-subgroup, quasicyclic subgroup, algebra of formal power series.
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