A polynomial quantum computing algorithm for solving the dualization problem

Abstract

Given two prime monotone boolean functions f:\0,1\n \0,1\ and g:\0,1\n \0,1\ the dualization problem consists in determining if g is the dual of f, that is if f(x1, …, xn)= g(x1, … xn) for all (x1, … xn) ∈ \0,1\n. Associated to the dualization problem there is the corresponding decision problem: given two monotone prime boolean functions f and g is g the dual of f? In this paper we present a quantum computing algorithm that solves the decision version of the dualization problem in polynomial time.