Distinct distances on non-ruled surfaces and between circles

Abstract

We improve the current best bound for distinct distances on non-ruled algebraic surfaces in R3. In particular, we show that n points on such a surface span (n32/39-) distinct distances, for any >0. Our proof adapts the proof of Sz\'ekely for the planar case, which is based on the crossing lemma. As part of our proof for distinct distances on surfaces, we also obtain new results for distinct distances between circles in R3. Consider point sets P1 and P2 of respective sizes m and n, such that each set lies on a distinct circle in R3. We characterize the cases when the number of distinct distances between the two sets can be O(m+n). This includes a new configuration with a small number of distances. In any other case, we prove that the number of distinct distances is (\m2/3n2/3,m2,n2\).