Quantum Computation of Fuzzy Numbers

We study the possibility of performing fuzzy set operations on a quantum computer. After giving a brief overview of the necessary quantum computational and fuzzy set theoretical concepts we demonstrate how to encode the membership function of a digitized fuzzy number in the state space of a quantum register by using a suitable superposition of tensor product states that form a computational basis. We show that a standard quantum adder is capable to perform Kaufmann's addition of fuzzy numbers in the course of only one run by acting at once on all states in the superposition, which leads to a considerable gain in the number of required operations with respect to performing such addition on a classical computer.