Extremal descendant integrals on moduli spaces of curves: An inequality discovered and proved in collaboration with AI

Abstract

For the pure -class intersection numbers D(e)= τe1 ·s τen g on the moduli space Mg,n of stable curves, we determine for which choices of e=(e1, …, en) the value of D(e) becomes extremal. The intersection number is minimal for powers of a single -class (i.e. all ei but one vanish), whereas maximal values are obtained for balanced vectors (|ei - ej| ≤ 1 for all i,j). The proof uses the nefness of the -classes combined with Khovanskii--Teissier log-concavity. Apart from the mathematical content, this paper is also meant as an experiment in collaborations between human mathematicians and AI models: the proof of the above result was found and formulated by the AI models GPT-5 and Gemini 3 Pro. Large parts of the paper were drafted by Claude Opus 4.5, and a part of the argument was formalized in Lean with the help of Claude Code and GPT-5.2. The paper aims for maximal transparency on the authorship of different sections and the employed AI tools (including prompts and conversation logs).

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