We introduce some conservative gates for finite-valued logics which are able to realize all the main connectives of the many-valued logics of Lukasiewicz, the MV-algebras of Chang and Brower-Zadeh algebras. After a brief exposition of the motivations for this work, the gates are defined and their properties are explored. Finally, a possible quantum realization of them is proposed, using three techniques: a "brute force" method - an extension of the Conditional Quantum Control argument, and a new technique which we call the Constants Method. For all these techniques, the unitary operator which describes the gate is a sum of local operators.
(2004). Quantum conservative gates for finite-valued logics [journal article - articolo]. In INTERNATIONAL JOURNAL OF THEORETICAL PHYSICS. Retrieved from https://hdl.handle.net/10446/243829
Quantum conservative gates for finite-valued logics
Leporini, Roberto
2004-01-01
Abstract
We introduce some conservative gates for finite-valued logics which are able to realize all the main connectives of the many-valued logics of Lukasiewicz, the MV-algebras of Chang and Brower-Zadeh algebras. After a brief exposition of the motivations for this work, the gates are defined and their properties are explored. Finally, a possible quantum realization of them is proposed, using three techniques: a "brute force" method - an extension of the Conditional Quantum Control argument, and a new technique which we call the Constants Method. For all these techniques, the unitary operator which describes the gate is a sum of local operators.| File | Dimensione del file | Formato | |
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