Lower Bounds for Convexity Testing

Abstract

We consider the problem of testing whether an unknown and arbitrary set S ⊂eq Rn (given as a black-box membership oracle) is convex, versus -far from every convex set, under the standard Gaussian distribution. The current state-of-the-art testing algorithms for this problem make 2O(n)· poly(1/) non-adaptive queries, both for the standard testing problem and for tolerant testing. We give the first lower bounds for convexity testing in the black-box query model: - We show that any one-sided tester (which may be adaptive) must use at least n(1) queries in order to test to some constant accuracy >0. - We show that any non-adaptive tolerant tester (which may make two-sided errors) must use at least 2(n1/4) queries to distinguish sets that are 1-close to convex versus 2-far from convex, for some absolute constants 0<1<2. Finally, we also show that for any constant c>0, any non-adaptive tester (which may make two-sided errors) must use at least n1/4 - c queries in order to test to some constant accuracy >0.

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