Rational Functions on the Projective Line from a Computational Viewpoint

Abstract

An explicit invariant-theoretic description of the moduli space M31 of degree-three rational maps on P1 is developed. A cubic map φ is represented, up to conjugation, by the pair of binary forms (f, g) ∈ V4 V2 arising from its Clebsch--Gordan decomposition. From this representation one constructs weighted projective invariants 0, ..., 5 that embed M31 into P5(2,2,3,3,4,6) onto the locus where the gcd of the weights of the non-zero coordinates equals 1, together with absolute invariants defined as weight-zero rational functions of the i, normalized by an additional invariant I6 of weight 6. These absolute invariants determine the isomorphism class uniquely. The stratification of M31 is described explicitly by equations in the absolute invariants or polynomial relations among the i. Computational illustrations demonstrate that the resulting invariants provide an effective feature set for automated classification of automorphism groups. The methods suggest natural extensions to higher degrees.

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