A classification of restrictive polynomial correspondences

Abstract

In this manuscript, we study a special class of correspondences on P1 × P1 given by a polynomial relation, say P(z, w). We focus on what we call restrictive polynomial correspondence and characterise that it can be written as P (z, w) = g1(w) h1(z) + ·s + g(w) h(z), for some appropriate ∈ Z+, where gr and hr are polynomials. In particular, when = 2, we say P is irreducible and observe that the equation P(z, w) = 0 can be rewritten as R(z) = S(w), where R and S are rational maps of appropriate degree. Further, we also define an operation that, with the exception of degenerate cases, constructs a new irreducible restrictive polynomial correspondence from any two given irreducible restrictive polynomial correspondences.