Multiples of integral points on elliptic curves
Abstract
If E is a minimal elliptic curve defined over , we obtain a bound C, depending only on the global Tamagawa number of E, such that for any point P∈ E(), nP is integral for at most one value of n>C. As a corollary, we show that if E/ is a fixed elliptic curve, then for all twists E' of E of sufficient height, and all torsion-free, rank-one subgroups ⊂eq E'(), contains at most 6 integral points. Explicit computations for congruent number curves are included.
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