A short proof of the first selection lemma and weak 1r-nets for moving points

Abstract

(i) We provide a short and simple proof of the first selection lemma. (ii) We also prove a selection lemma of a new type in d. For example, when d=2 assuming n is large enough we prove that for any set P of n points in general position there are (n4) pairs of segments spanned by P all of which intersect in some fixed triangle spanned by P. (iii) Finally, we extend the weak 1r-net theorem to a kinetic setting where the underlying set of points is moving polynomially with bounded description complexity. We establish that one can find a kinetic analog N of a weak 1r-net of cardinality O(rd(d+1)2dr) whose points are moving with coordinates that are rational functions with bounded description complexity. Moreover, each member of N has one polynomial coordinate.