Quantum search with variable times

Abstract

Since Grover's seminal work, quantum search has been studied in great detail. In the usual search problem, we have a collection of n items and we would like to find a marked item. We consider a new variant of this problem in which evaluating the i-th item may take a different number of time steps for different i. Let ti be the number of time steps required to evaluate the i-th item. If the numbers ti are known in advance, we give an algorithm that solves the problem in O(t12+t22+...+tn2) steps. This is optimal, as we also show a matching lower bound. The case, when ti are not known in advance, can be solved with a polylogarithmic overhead. We also give an application of our new search algorithm to computing read-once functions.

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