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 Paley’s construction of Hadamard matrices to design a more specific problem that uses the Legendre symbol χ (which indicates if an element of a finite field GF(p k) is a quadratic residue or not). It is shown how for a shifted Legendre function fs(x) = χ(x+s), the unknown s ∈ GF(p k) can be obtained exactly with only two quantum calls to fs. This is in sharp contrast with the observation that any classical, probabilistic procedure requires at least k log p queries to solve the same problem. 1

Citations