Metric 1-median selection with fewer queries

Abstract

Let h++\1\ be any function such that h(n) and n1/h(n) are computable from n in O(h(n)· n1+1/h(n)) time. We show that given any n-point metric space (M,d), the problem of finding argmini∈ M\,Σj∈ M\,d(i,j) (breaking ties arbitrarily) has a deterministic, O(h(n)· n1+1/h(n))-time, O(n1+1/h(n))-query, (2\,h(n))-approximation and nonadaptive algorithm. Our proofs modify those of Chang~Cha15, Cha15CMCT with the following improvements: (1) We improve Chang's~Cha15 query complexity of O(h(n)· n1+1/h(n)) to O(n1+1/h(n)), everything else being equal. (2) Chang's~Cha15CMCT unpublished work establishes our result only when n is a perfect (h(n))th power.