Let K be a field of characteristic zero. We characterize coordinates and ta
me coordinates in K[z][x, y], i.e. the images of x respectively under all a
utomorphisms and under the tame automorphisms of K[z][x; y]. We also constr
uct a new large class of wild automorphisms of K[z][x; y] which maps x to a
concrete family of nice looking polynomials. We show that a subclass of th
is class is stably tame, i.e. becomes tame when we extend its automorphisms
to automorphisms of K[z][x, y, t].