Efficient Quantum Algorithms related to Autocorrelation Spectrum
Abstract
In this paper, we propose efficient probabilistic algorithms for several problems regarding the autocorrelation spectrum. First, we present a quantum algorithm that samples from the Walsh spectrum of any derivative of . Informally, the autocorrelation coefficient of a Boolean function at some point measures the average correlation among the values and . The derivative of a Boolean function is an extension of autocorrelation to correlation among multiple values of . The Walsh spectrum is well-studied primarily due to its connection to the quantum circuit for the Deutsch-Jozsa problem. We extend the idea to "Higher-order Deutsch-Jozsa" quantum algorithm to obtain points corresponding to large absolute values in the Walsh spectrum of a certain derivative of . Further, we design an algorithm to sample the input points according to squares of the autocorrelation coefficients. Finally we provide a different set of algorithms for estimating the square of a particular coefficient or cumulative sum of their squares.
Cite
@article{arxiv.1808.04448,
title = {Efficient Quantum Algorithms related to Autocorrelation Spectrum},
author = {Debajyoti Bera and Subhamoy Maitra and SAPV Tharrmashastha},
journal= {arXiv preprint arXiv:1808.04448},
year = {2019}
}
Comments
Accepted in Indocrypt 2019