There is no tame automorphism of C^3 with muldidegree (3,4,5)

Details There is no tame automorphism of C^3 with muldidegree (3,4,5) There is no tame automorphism of C^3 with muldidegree (3,4,5)

2009-04-08

arxiv.org/abs/0904.1265v1

Proc. Am. Math. Soc., 139, no. 3 (2011) 769-775

Mathematics

Algebraic Geometry

Scientific paper

Let F=(F_1,...,F_n):C^n --> C^n be any polynomial mapping. By multidegree of F, denoted mdeg F, we call the sequence of positive integers (deg F_1,...,F_n). In this paper we addres the following problem: for which sequence (d_1,...,d_n) there is an automorphism or tame automorphism F:C^n --> C^n with mdeg F=(d_1,...,d_n}. We proved, among other things, that there is no tame automorphism F:C^3 --> C^3 with mdeg F=(3,4,5).

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