Constant Approximation of Fr\'echet Distance in Strongly Subquadratic Time
Abstract
Let τ and σ be two polygonal curves in Rd for any fixed d. Suppose that τ and σ have n and m vertices, respectively, and m n. While conditional lower bounds prevent approximating the Fr\'echet distance between τ and σ within a factor of 3 in strongly subquadratic time, the current best approximation algorithm attains a ratio of nc in strongly subquadratic time, for some constant c∈(0,1). We present a randomized algorithm with running time O(nm0.99(n/)) that approximates the Fr\'echet distance within a factor of 7+, with a success probability at least 1-1/n6. We also adapt our techniques to develop a randomized algorithm that approximates the discrete Fr\'echet distance within a factor of 7+ in strongly subquadratic time. They are the first algorithms to approximate the Fr\'echet distance and the discrete Fr\'echet distance within constant factors in strongly subquadratic time.
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