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Review: The First Order Predicate Calculus Based On The Logic Of Quantum Mechanics By Hermann Dishkant
Reviewed Works: The First Order Predicate Calculus Based on the Logic of Quantum Mechanics by Hermann Dishkant; Orthomodularity and Relevance by G. N. Georgacarakos; Equationally Definable Implication Algebras for Orthomodular Lattices by G. N. Georgacarakos; Is a Quantum Logic a Logic? by R. J. Greechie, S. P. Gudder; The Conditional in Abstract and Concrete Quantum Logic by Gary M. Hardegree, C. A. Hooker; Material Implication in Orthomodular (and Boolean) Lattices by Gary M. Hardegree; What is "Quantum-Logic"? by J. M. Jauch, C. Piron, P. G. O. Freund, C. J. Goebel, Y. Nambu; An Axiom System for the Modular Logic by Jerzy Kotas; On the Interpretation of the Lattice of Subspaces of the Hilbert Space as a Propositional Calculus by P. Mittelstaedt; Generalized Normal Logic by J. Jay Zeman
Review by: Alasdair Urquhart
The Journal of Symbolic Logic
Vol. 48, No. 1 (Mar., 1983), pp. 206-208
Published by: Association for Symbolic Logic
Stable URL: http://www.jstor.org/stable/2273336
Page Count: 3
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The Journal of Symbolic Logic © 1983 Association for Symbolic Logic