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Luisa Dalla Chiara’s books. Sperimentare la logica by. Roberto Giuntini, M. Luisa Dalla Chiara.
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Personal Name: Dalla Chiara, Maria Luisa 1938- Verfasser (DE-588)139437215. General Note: M. L. Dalla Chiara, professor at the University of Florence; R. Giuntini and F. Paoli teach at the University of Cagliari. bibliography (pp. 163-167), bibl. references and notes. University textbook. Personal Name: Giuntini, Roberto Verfasser (DE-588)112595804. Personal Name: Paoli, Francesco Verfasser (DE-588)122056639. Download now Sperimentare la logica
Maria Luisa Dalla Chiara, Roberto Giuntini. Roberto Giuntini, Antonio Ledda, Francesco Paoli. We continue the algebraic investigation of PBZ -lattices, a notion introduced in Giuntini et al. (Stud
Maria Luisa Dalla Chiara, Roberto Giuntini. We investigate some forms of quantum logic arising from the standard and the unsharp approach. (Stud.
Semantic Scholar profile for Maria Luisa Dalla Chiara, with fewer than 50 highly influential citations. Maria Luisa Dalla Chiara, Roberto Giuntini, Richard Greechie. Reasoning in quantum theory : sharp and unsharp quantum logics. Maria Luisa Dalla Chiara, Roberto Giuntini, R. J. Greechie.
Maria Luisa Dalla Chiara. Maria Luisa Dalla Chiara Maria Luisa Dalla Chiara. Quantum logic represents a singular point in the class of non-classical logics. Maria Luisa Dalla Chiara. In contemporary science uncertainty is often represented as an intrinsic feature of natural and of human phenomena. In recent times, a particular attention has been devoted to thesignificance of Quantum Theory for other disciplines. The articlescollected in this issue discuss some interesting cases,characterized by an interaction between Quantum Theory andother fields.
Shi and Aharonov have shown that the Toffoli gate and the Hadamard gate give rise to an approximately universal set of quantum computational gates. Quantum MV-algebras (QMV-algebras) are a non lattice-theoretic generalization of MV-algebras (multi-valued algebras) and a non-idempotent generalization of orthomodular lattices. In his celebrated book Mathematische Grundlagen der Quantenmechanik (von Neumann, 1932),1 John von Neumann proposed an axiomatic version of sharp QT.