Approximately Jumping Towards the Origin
Abstract
Given an initial point x0 ∈ Rd and a sequence of vectors v1, v2, … in Rd, we define a greedy sequence by setting xn = xn-1 vn where the sign is chosen so as to minimize \|xn\|. We prove that if the vectors vi are chosen uniformly at random from Sd-1 then elements of the sequence are, on average, approximately at distance \|xn\| π d/8 from the origin. We show that the sequence (\|xn\|)n=1∞ has an invariant measure πd depending only on d and we determine its mean and study its decay for all d. We also investigate a completely deterministic example in d=2 where the vn are derived from the van der Corput sequence. Several additional examples are considered.
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