Quantum Coupon Collector

Abstract

We study how efficiently a k-element set S⊂eq[n] can be learned from a uniform superposition |S of its elements. One can think of |S=Σi∈ S|i/|S| as the quantum version of a uniformly random sample over S, as in the classical analysis of the ``coupon collector problem.'' We show that if k is close to n, then we can learn S using asymptotically fewer quantum samples than random samples. In particular, if there are n-k=O(1) missing elements then O(k) copies of |S suffice, in contrast to the (k k) random samples needed by a classical coupon collector. On the other hand, if n-k=(k), then (k k) quantum samples are~necessary. More generally, we give tight bounds on the number of quantum samples needed for every k and n, and we give efficient quantum learning algorithms. We also give tight bounds in the model where we can additionally reflect through |S. Finally, we relate coupon collection to a known example separating proper and improper PAC learning that turns out to show no separation in the quantum case.