Integral distances from (two) lattice points

Abstract

.We completely characterize pairs of lattice points P1≠ P2 in the plane with the property that there are infinitely many lattice points Q whose distance from both P1 and P2 is integral. In particular we show that it suffices that P2-P1≠ ( 1, 2), ( 2, 1), and we show that |P1-P2|>20 suffices for having infinitely many such Q outside any finite union of lines. We use only elementary arguments, the crucial ingredient being a theorem of Gauss which does not appear to be often applied. We further include related remarks (and open questions), also for distances from an arbitrary prescribed finite set of lattice points % P1,… ,Pr.