A characteristic feature of quantum computation is the use of reversible logical operations. These correspond to quantum logical gates that are mathematically represented by unitary operators defined on convenient Hilbert spaces. Two questions arise: 1) to what extent is quantum computation bound to the use of reversible logical operations? 2) How to identify the logical operations that admit a quantum computational simulation by means of appropriate gates? We introduce the notion of quantum computational simulation of a binary function defined on the real interval [0,1], and we prove that for any binary Boolean function there exists a unique fuzzy extension admitting a quantum computational simulation. As a consequence, the Lukasiewicz con...
This book provides a general survey of the main concepts, questions and results that have been devel...
This book provides a general survey of the main concepts, questions and results that have been devel...
We construct reversible Boolean circuits efficiently simulating reversible Turing machines. Both the...
In this paper we discuss an approach to quantum computation where the basic information units (qubit...
Reversible logical operations implemented via reversible logic gates (that can be realized in practi...
In the first chapter we introduce new forms of quantum logic suggested by quantum computation, calle...
The theory of logical gates in quantum computation has suggested new forms of quantum logic, called ...
We apply residuated structures associated with fuzzy logic to develop certain aspects of information...
Quantum computational logics provide a fertile common ground for a unified treatment of vagueness an...
We apply residuated structures associated with fuzzy logic to develop certain aspects of 6 informat...
In this paper we solve the problem how to axiomatize a system of quantum computational gates known a...
Quantum computation and quantum computational logics give rise to some non-standard probability spac...
AbstractThe (meta)logic underlying classical theory of computation is Boolean (two-valued) logic. Qu...
The (meta)logic underlying classical theory of computation is Boolean (two-valued) logic. Quantum lo...
A rotation-based synthesis framework for reversible logic is proposed. We develop a canonical rep-re...
This book provides a general survey of the main concepts, questions and results that have been devel...
This book provides a general survey of the main concepts, questions and results that have been devel...
We construct reversible Boolean circuits efficiently simulating reversible Turing machines. Both the...
In this paper we discuss an approach to quantum computation where the basic information units (qubit...
Reversible logical operations implemented via reversible logic gates (that can be realized in practi...
In the first chapter we introduce new forms of quantum logic suggested by quantum computation, calle...
The theory of logical gates in quantum computation has suggested new forms of quantum logic, called ...
We apply residuated structures associated with fuzzy logic to develop certain aspects of information...
Quantum computational logics provide a fertile common ground for a unified treatment of vagueness an...
We apply residuated structures associated with fuzzy logic to develop certain aspects of 6 informat...
In this paper we solve the problem how to axiomatize a system of quantum computational gates known a...
Quantum computation and quantum computational logics give rise to some non-standard probability spac...
AbstractThe (meta)logic underlying classical theory of computation is Boolean (two-valued) logic. Qu...
The (meta)logic underlying classical theory of computation is Boolean (two-valued) logic. Quantum lo...
A rotation-based synthesis framework for reversible logic is proposed. We develop a canonical rep-re...
This book provides a general survey of the main concepts, questions and results that have been devel...
This book provides a general survey of the main concepts, questions and results that have been devel...
We construct reversible Boolean circuits efficiently simulating reversible Turing machines. Both the...