Power Products in Elliptic Divisibility Sequences and Prime-Incidence Obstructions

Abstract

Let E/ Q be an elliptic curve, let P∈ E( Q) be non-torsion, and let (Dn) be the associated elliptic divisibility sequence. For a fixed prime ρ, we study when an arbitrary finite product \[ Πi=1k Dni \] can be a ρ-th power in Q×. The main result is that, under the hypothesis that D1 is divisible by 2 or 3, such product relations impose rigid restrictions on the large prime divisors of the indices ni. More precisely, for every B 2, all sufficiently large prime divisors which occur as simple largest prime divisors of the indices and whose complementary cofactors are B-smooth must occur in ρ-balanced blocks. Equivalently, the corresponding prime-incidence rows over Fρ have pairwise disjoint supports, are linearly independent, and satisfy the packing bound \[ |Λ*| k/ρ . \] In particular, if ni=i ai, where the i are sufficiently large primes and the ai are B-smooth, then a ρ-th power product relation can hold only if each prime occurs among the i with multiplicity divisible by ρ. The proof combines Silverman's valuation law, a fixed finite-prime-set consequence of Reynolds' finiteness theorem, and the Hasse bound. The case ρ=2 gives the corresponding square-product obstruction.