Multiplicative dependence in the denominators of points of elliptic curves
Abstract
Let E1, …, Es be s, not necessary distinct, elliptic curves over Q. We give upper bounds on the frequency of s-tuples of points in E1(Q)× … × Es(Q) whose denominators or x-coordinates are multiplicatively dependent. More precisely, we give such bounds in two scenarios: one in which we fix s non-torsion Q-rational points Pi ∈ Ei(Q) and arbitrary Q-rational points Qi ∈ Ei(Q), i =1, …, s, and we count s-tuples \[ (n1P1+Q1,…, nsPs+Qs) ∈ E1(Q) × … × Es(Q) \] with n1, …, ns in an arbitrary interval of length N, and the second in which we count points (P1,…,Ps) ∈ E1(Q) × … × Es(Q) of bounded canonical height.
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