Landen transforms as families of (commuting) rational self-maps of projective space

Abstract

The classical (m,k)-Landen transform Fm,k is a self-map of the field of rational functions C(z) obtained by forming a weighted average of a rational function over twists by m'th roots of unity. Identifying the set of rational maps of degree d with an affine open subset of P2d+1, we prove that Fm,0 induces a dominant rational self-map Rd,m,0 of P2d+1 of algebraic degree m, and for 0 < k < m, the transform Fm,k induces a dominant rational self-map Rd,m,k of algebraic degree m of a certain hyperplane in P2d+1. We show in all cases that Rd,m,k extends nicely to a map of P2d+1 over Spec(Z), and that Rd,m,0 : m 0 is a commuting family of maps.