Wild multidegrees of the form (d,d2,d3) for given d greather than or equal to 3

Abstract

Let d be any number greather than or equal to 3. We show that the intersection of the set mdeg(Aut(C3))\ mdeg(Tame(C3)) with (d1,d2,d3) : d=d1 =< d2 =< d3 has infinitely many elements, where mdeg h = (deg h1,...,deg hn) denotes the multidegree of a polynomial mapping h=(h1,...,hn):Cn ---> Cn. In other words, we show that there is infiniltely many wild multidegrees of the form (d,d2,d3), with fixed d >= 3 and d =< d2 =< d3, where a sequences (d1,...,dn) is a wild multidegree if there is a polynomial automorphism F of Cn with mdeg F=(d1,...,dn), and there is no tame autmorphim of Cn with the same multidegree.