On the Quartic Invariant of Odd Degree Binary Forms

Abstract

We determine the squarefree part of the scalar factor that arises when the quartic invariant of the generic binary form F of odd degree 2n+1 is expressed as the discriminant of the unique quadratic covariant (F,F)2n. This squarefree part is exactly p when n+2 is a power of an odd prime p, and 1 otherwise. Equivalently, for each prime p: v2(S(n)) is always even, and for odd p, vp(S(n)) is odd if and only if n+2 is a power of p. This generalizes the classical identity disc(H(F))=-3·disc(F) for binary cubics, which dates back to the work of Cayley and Sylvester in the 1850s. The proof, which involves substantial explicit coefficient analysis and p-adic deformation arguments, was developed using an AI-assisted research workflow: the author's earlier partial attempts were completed through systematic collaboration with Claude Code (Anthropic) and Codex (OpenAI), and key arithmetic lemmas were formally verified in Lean~4 using Aristotle (Harmonic). We describe this workflow in detail as a case study in AI-assisted mathematical research. We also discuss representation-theoretic, geometric, and arithmetic interpretations of the quadratic covariant.

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