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Quantum Algorithms for Weighing Matrices and Quadratic Residues
Abstract: In this article we investigate how we can employ the structure of combinatorial objects like Hadamard matrices and weighing matrices to device new quantum algorithms. We show how the properties of a weighing matrix can be used to construct a problem for which the quantum query complexity is significantly lower than the classical one. It is pointed out that this scheme captures both Bernstein & Vazirani's inner-product protocol, as well as Grover's search algorithm.In the second part of the article we consider …
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Cited by 24 publications
References 31 publications
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