The elliptic curve $-4 x^3 + 4 x^2 y + 16 x - y^3 + 9 y$ goes through $21$ integer points in the range $-9$ to $9$. Is that the maximum?
Maximal small lattice points of an elliptic curve
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elliptic-curves
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0[-9,9] is arbitrary. Any non-tangent line going through two rational points on an elliptic curve will go through a third. Multiplying by the GCD gives an elliptic curve going through more integer lattice points, for a sufficiently large lattice. I was wondering about maxima on a small lattice, so I picked$[-9,9]$arbitrarily. – 2011-05-31
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This is a bit of a longshot, but have a look at Matthew Baker and Clayton Petsche, Global discrepancy and small points on elliptic curves, http://arxiv.org/pdf/math/0507228v1 and at some of the papers in the references that have titles that suggest they may be relevant to this problem.
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0There is a demonstration, [Elliptic Curves on a Small Lattice](http://demonstrations.wolfram.com/EllipticCurvesOnASmallLattice/) that gives equations for 5 elliptic curves with 21 lattice points on a [-9,9] lattice, and hundreds more with 20-15 points. – 2011-06-02