Distinct distances on two lines
Abstract
Let P1 and P2 be two sets of points in the plane, so that P1 is contained in a line L1, P2 is contained in a line L2, and L1 and L2 are neither parallel nor orthogonal. Then the number of distinct distances determined by the pairs of P1xP2 is (|P1|2/3|P2|2/3,|P1|2, |P2|2). In particular, if |P1|=|P2|=m, then the number of these distinct distances is (m4/3), improving upon the previous bound (m5/4) of Elekes.
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