On multidegree of tame and wild automorphisms of C3

Abstract

In this note we show that the set mdeg(Aut(C3)) mdeg(Tame(C3)) is not empty. Moreover we show that this set has infinitely many elements. Since for the famous Nagata's example N of wild automorphism, mdeg N =(5,3,1) is an element of mdeg(Tame(C3)) and since for other known examples of wild automorphisms the multidegree is of the form (1,d2,d3) (after permutation if neccesary), then we give the very first exmple of wild automorphism F of C3 such that mdeg F does not belong to mdeg(Tame(C3)). We also show that, if d1,d2 are odd numbers such that gcd (d1,d2) =1, then (d1,d2,d3) belongs to mdeg(Tame(C3)) if and only if d3 is a linear combination of d1,d2 with natural coefficients. This a crucial fact that we use in the proof of the main result.