Multidegrees of Tame automorphisms with one prime number

Abstract

Let 3≤ d1≤ d2≤ d3 be integers. We show the following results: (1) If d2 is a prime number and d1(d1,d3)≠2, then (d1,d2,d3) is a multidegree of a tame automorphism if and only if d1=d2 or d3∈ d1N+d2N; (2) If d3 is a prime number and (d1,d2)=1, then (d1,d2,d3) is a multidegree of a tame automorphism if and only if d3∈ d1N+d2N. We also relate this investigation with a conjecture of Drensky and Yu, which concerns with the lower bound of the degree of the Poisson bracket of two polynomials, and we give a counter-example to this conjecture.