2020 Help me understand this report
The quantum version of the shifted power method and its application in quadratic binary optimization
Abstract: In this paper, we present a direct quantum adaptation of the classical shifted power method. The method is very similar to the iterative phase estimation algorithm; however, it does not require any initial estimate of an eigenvector, and as in the classical case its convergence and the required number of iterations are directly related to the eigengap. If the amount of the gap is in the order of 1/poly(n) , then the algorithm can converge to the dominant eigenvalue in O(poly(n)) time. The method can be potenti…
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2021
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