Universal sequences of lines in Rd

Abstract

One of the most important and useful examples in discrete geometry is a finite sequence of points on the moment curve γ(t)=(t,t2,t3,… ,td) or, more generally, on a strictly monotone curve in Rd. These sequences as well as the ambient curve itself can be described in terms of universality properties and we will study the question: "What is a universal sequence of oriented and unoriented lines in d-space'' We give partial answers to this question, and to the analogous one for k-flats. Given a large integer n, it turns out that, like the case of points the number of universal configurations is bounded by a function of d, but unlike the case for points, there are a large number of distinct universal finite sequences of lines. We show that their number is at least 2d-1-2 and at most (d-1)!. However, like for points, in all dimensions except d=4, there is essentially a unique continuous example of a universal family of lines. The case d=4 is left as an open question.

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