Order-3 pi-formulas, Apery-like kernels, and Clausen functoriality for Conservative Matrix Fields

Abstract

Raz, Shalyt, Leibtag, Kalisch, Weinbaum, Hadad, and Kaminer recently showed that formulas for π can be organized by canonical polynomial recurrences and partially unified by a rank-2 Conservative Matrix Field (CMF). We prove that each order-3 recurrence explicitly printed in the public Appendix~B.6 of their paper is a shifted summation lift of an explicit order-2 kernel, and identify all three kernels: the two π-kernels are explicit rescalings of the sporadic Ap\'ery-like sequences A036917 and A002895 (Domb numbers, case~(α)), while the Catalan kernel is a hypergeometric twist of the Gauss-square coefficient sequence at (a,b,c)=(12,1,32). We place these kernels in a unified Sym2 framework: the first π-kernel and the Catalan kernel come directly from Gauss-square coefficient sequences, while the Domb kernel is recovered by recasting the classical degree-3 Belyi pullback φ(x)=108x2/(1-4x)3 and the associated algebraic twist in CMF language. We write an explicit square-gauge matrix for the Gauss CMF, formulate the standard pullback--twist transport in CMF terms, and show that for rank-2 objects it is compatible with Sym2. We further prove an inverse classification: for a fixed Sym2-type Riemann scheme, the one-parameter family of Fuchsian operators contains a unique Sym2(Gauss) point, cut out by the closed-form condition λ0=2γ1γ2(1-2α) on the accessory parameter. Finally, a Belyi-pullback scan over 5040 configurations produces 11 additional integer sequences of the form [xn]λn\,2F1(a,b;c;φ(x))2; we prove their integrality and place them in the same Sym2-pullback framework.