A Quantum Time-Space Tradeoff for Directed st-Connectivity
Abstract
Directed st-connectivity (DSTCON) is the problem of deciding if there exists a directed path between a pair of distinguished vertices s and t in an input directed graph. This problem appears in many algorithmic applications, and is also a fundamental problem in complexity theory, due to its NL-completeness. We show that for any S≥ 2(n), there is a quantum algorithm for DSTCON using space S and time T≤ 212(n)(n/S)+o(2(n)), which is an (up to quadratic) improvement over the best classical algorithm for any S=o(n). Of the S total space used by our algorithm, only O(2(n)) is quantum space - the rest is classical. This effectively means that we can trade off classical space for quantum time.
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