A Ramanujan Pell Elliptic K3 Surface and Primitive Five-Cube Near Misses
Abstract
We construct a trace-16 Ramanujan--Pell family of primitive positive five-cube near misses \[ an3+bn3+cn3+dn3+en3=tn3+(-1)n+1, \] obtained from a six-cube identity of quadratic forms and the negative Pell orbit generated by \(8+65\). The six coefficient sequences have rational recurrence generating functions with common reciprocal denominator \[ R(q)=1-257q-257q2+q3=(1+q)(1-258q+q2). \] The quadratic identity is derived from a conic source, explaining the constants, while the Pell mechanism accounts for both the alternating error term and the denominator. The same construction yields the Mordell curve \[ EK:\ y2=x3-432K(u)2, K(u)=(1-13u+26u2)3+(6+182u2)3. \] We prove that its minimal smooth projective model is an elliptic K3 surface with geometric fibre configuration \(6IV\); over \( Q\), the singular-fibre divisor is supported at one degree-two and one degree-four closed point. The section induced by the displayed decomposition of \(K\) has canonical height \(4/3\). The torsion groups over \( Q(u)\), \( Q(-3)(u)\), and \( Q(u)\) are respectively \(0\), \( Z/3 Z\), and \( Z/3 Z\). Over \( Q(-3)(u)\), the complex multiplication orbit of the section gives an Eisenstein Mordell--Weil sublattice and a visible generated rank-16 sublattice of the geometric Neron--Severi group of discriminant \(-108\); no fullness or primitivity is claimed. We identify the remaining free Mordell--Weil problem with an explicit equivariant Hom module, exhibit an anti-symplectic reciprocal involution, and show that \(w3=K(u)\) has a Fermat-cubic quotient. No modularity assertion is made for the recurrence functions.
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