A full p4r supercongruence tower for a level-three symmetric-cube hypergeometric sequence

Abstract

Let 2F1(1/3,1/3;1;27z)3=Σn0Anzn. We prove the full prime-power supercongruence tower Ampr Ampr-1p4r for p5, m1, r1. The level-three modular expansion used below was already recorded by Moy; the contribution here is the depth-preserving modulus p4r, extending the previously known depth-one modulus p4 case to all prime powers. The proof is modular. After replacing An by Bn=(-1)nAn, the generating function is realized on X0(3) by Σn0Bntn=η(τ)9/η(3τ)3 with t=η(3τ)12/η(τ)12. The logarithmic derivative C=(Σn0Bntn)\,(q/t)\,(dt/dq) is the Eisenstein series 3E5,χ0,χ3. Lagrange-Buermann gives Bm=CTq(C(q)/t(q)m). The new point is to replace the one-prime Hecke defect by the prime-power defect Tps+1(C/tmps+1)-Tps(C/tmps). Its i=0 Hecke layer is the sparse Cartier defect controlling Amps+1-Amps, while all remaining Hecke layers are divisible by the required power of p by induction. A Fricke involution argument on the two-dimensional space M5(Γ0(3),χ3)=Span\C,tC\ then kills the low-order part exactly and the principal part modulo p4(s+1).