Hyper-Catalan and Geode Recurrences and Three Conjectures of Wildberger

Abstract

The hyper-Catalan number C[m2,m3,m4,…] counts the number of subdivisions of a roofed polygon into m2 triangles, m3 quadrilaterals, m4 pentagons, etc. Its closed form has been known since Erd\'elyi and Etherington, 1940. In 2025, Wildberger and Rubine showed its generating sum S[t2,t3,t4,…] is a zero of the general geometric univariate polynomial. We use that to derive a recurrence for hyper-Catalans, which expresses each in terms of other hyper-Catalans with smaller indices, generalizing the well-known Catalan convolution sum. Wildberger notes the factorization S-1=(t2 + t3 + t4 + …)G, where the factor G is called the Geode. We derive a recurrence that let us express the Geode coefficients in terms of other hyper-Catalan and Geode coefficients, and ultimately in terms of hyper-Catalans alone. We use it to prove three conjectures of Wildberger, all closed forms for special cases of elements of G. While the recurrence allows us to expand each Geode coefficient as an integer combination of hyper-Catalans, enabling calculation, a closed-form for the general Geode coefficient remains unknown, as does what it counts.