Quantum Bounded Query Complexity
Abstract
We combine the classical notions and techniques for bounded query classes with those developed in quantum computing. We give strong evidence that quantum queries to an oracle in the class NP does indeed reduce the query complexity of decision problems. Under traditional complexity assumptions, we obtain an exponential speedup between the quantum and the classical query complexity of function classes. For decision problems and function classes we obtain the following results: o P||NP[2k] is included in EQP||NP[k] o P||NP[2(k+1)-2] is included in EQPNP[k] o FP||NP[2(k+1)-2] is included in FEQPNP[2k] o FP||NP is included in FEQPNP[O(log n)] For sets A that are many-one complete for PSPACE or EXP we show that FPA is included in FEQPA[1]. Sets A that are many-one complete for PP have the property that FP||A is included in FEQPA[1]. In general we prove that for any set A there is a set X such that FPA is included in FEQPX[1], establishing that no set is superterse in the quantum setting.
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