It is shown the the tame subgroup TA3β(C) of the group
GA3β(C) of polynomials automorphisms of C3 can be
realized as the product of three subgroups, amalgamated along pairwise
intersections, in a manner that generalizes the well-known amalgamated free
product structure of TA2β(C) (which coincides with
GA2β(C) by Jung's Theorem). The result follows from defining
relations for TA3β(C) given by U. U. Umirbaev