Exponent-one blockers and a Mordell-Weil construction of Euler bricks

Abstract

A body cuboid is a rectangular parallelepiped with integer edges and integer face diagonals; if its space diagonal is also integer, it is a perfect cuboid, whose existence is a long-standing open problem. We make two contributions to the study of body cuboids parametrised by two coprime Pythagorean pairs (a,b) and (m,n) in Euclid form (Master-Hits). The first is a verified exponent-one blocker phenomenon: for every Master-Hit, the space-diagonal norm f1 := (W1 U2)2 + (U1 V2)2 admits a prime divisor of exponent exactly one which is coprime to a fixed list of 29 canonical expressions in the parameters. This is strictly stronger than the existence of any odd-exponent prime divisor: a prime of exponent 3, 5, … would obstruct f1 from being a square but carry an extra square factor; the observed obstruction is always primitive. The phenomenon is verified on all 151,575 Master-Hits whose f1 has been fully factorised. Two natural strengthenings fail: the largest outside-parameter prime need not be a blocker, and the smallest outside-parameter blocker need not have exponent one. The second contribution uses the elliptic fibration of the Master-Hit variety over the (m,n)-plane. For coprime (m,n) the Master-Hit equation defines a genus-one quartic Hm,n; a quartic-to-Weierstrass normalisation gives an elliptic model Em,n with a rational function τ returning t2. Our generator enumerates bounded Mordell-Weil combinations on Em,n(Q), lifts the points satisfying τ(P) ∈ Q>0 to admissible Euclid pairs (a,b), and certifies each via exact integer arithmetic. From 61,829 classical Master-Hits we generate 1,222,841 further ones \"uber 411 fibres. None of the resulting 1,284,670 Master-Hits is a perfect cuboid; all fully factored records satisfy the exponent-one blocker phenomenon.