Normal form for Ritt's Second Theorem

Ritt's Second Theorem deals with composition collisions  g∘h=g⁎∘h⁎g∘h=g⁎∘h⁎ of univariate polynomials over a field, where degg=degh⁎. Joseph Fels Ritt (1922) presented two types of such decompositions. His main result here is that these comprise all possibilities, up to some linear transformations. We present a normal form for Ritt's Second Theorem, which is unique in many cases, and clarify the relation between the two types of examples. This yields an exact count of the number of such collisions in the “tame case”, where the characteristic of the (finite) ground field does not divide the degree of the composed polynomial.