13 found
Sort by:
  1. Peter Gibbins (1990). BACON Bytes Back. In J. E. Tiles, G. T. McKee & G. C. Dean (eds.), Evolving Knowledge in Natural Science and Artificial Intelligence. Pitman. 155.
    No categories
     
    My bibliography  
     
    Export citation  
  2. Peter Gibbins (1988). Incompleteness, Non Locality and Realism: A Prolegomenon to the Philosophy of Quantum Mechanics. Philosophical Books 29 (2):117-118.
    No categories
    Direct download (3 more)  
     
    My bibliography  
     
    Export citation  
  3. Peter Gibbins (1987). Particles and Paradoxes: The Limits of Quantum Logic. Cambridge University Press.
    Quantum theory is our deepest theory of the nature of matter. It is a theory that, notoriously, produces results which challenge the laws of classical logic and suggests that the physical world is illogical. This book gives a critical review of work on the foundations of quantum mechanics at a level accessible to non-experts. Assuming his readers have some background in mathematics and physics, Peter Gibbins focuses on the questions of whether the results of quantum theory require us to abandon (...)
    Direct download (3 more)  
     
    My bibliography  
     
    Export citation  
  4. Peter Gibbins (1984). Nancy Cartwright's New Philosophy of Physics. [REVIEW] British Journal for the Philosophy of Science 35 (4):390-402.
    Direct download (6 more)  
     
    My bibliography  
     
    Export citation  
  5. Peter Gibbins (1984). Review: Nancy Cartwright's New Philosophy of Physics. [REVIEW] British Journal for the Philosophy of Science 35 (4):390 - 401.
    Direct download (5 more)  
     
    My bibliography  
     
    Export citation  
  6. Peter Gibbins (1982). Reviews. [REVIEW] British Journal for the Philosophy of Science 33 (2):209-217.
    Direct download (3 more)  
     
    My bibliography  
     
    Export citation  
  7. Peter Gibbins & W. Newton-Smith (1982). "Or", "Not", and the Way Things Are. Aristotelian Society Supplementary Volume 56:51 - 81.
    No categories
    Direct download (2 more)  
     
    My bibliography  
     
    Export citation  
  8. Peter Gibbins (1981). A Note on Quantum Logic and the Uncertainty Principle. Philosophy of Science 48 (1):122-126.
    It is shown that the uncertainty principle has nothing directly to do with the non-localisability of position and momentum for an individual system on the quantum logical view. The product Δ x· Δ p for localisation of the ranges of position and momentum of an individual system→ ∞ , while the quantities Δ X and Δ P in the uncertainty principle $\Delta X\cdot \Delta P\geq \hslash /2$ , must be given a statistical interpretation on the quantum logical view.
    Direct download (5 more)  
     
    My bibliography  
     
    Export citation  
  9. Peter Gibbins (1981). Putnam on the Two-Slit Experiment. Erkenntnis 16 (2):235 - 241.
    Direct download (5 more)  
     
    My bibliography  
     
    Export citation  
  10. Peter Gibbins (1979). Material Implication, the Sufficiency Condition, and Conditional Proof. Analysis 39 (1):21 - 24.
    No categories
    Direct download (5 more)  
     
    My bibliography  
     
    Export citation  
  11. Peter Gibbins (1978). The Marxian Theories of Value and Exploitation Axiomatised. Theory and Decision 9 (3):285-293.
    Direct download (3 more)  
     
    My bibliography  
     
    Export citation  
  12. Peter Gibbins (1977). Opacity in the Labour Theory of Value. Journal of Value Inquiry 11 (3):218-221.
    Direct download (4 more)  
     
    My bibliography  
     
    Export citation  
  13. Peter Gibbins (1976). Use-Value and Exchange-Value. Theory and Decision 7 (3):171-179.
    Discussion of the relation between exchange-value and use-value (as defined inCapital I) is clarified by the construction of set-theoretical models of these concepts. Marx argues fallaciously for the independence of exchange-value and use-value. His fallacy is diagnosed as depending upon a mistaken assumption about the impossibility of inferring a certain linear order on a set from a certain (different) partial order on that set.
    No categories
    Direct download (3 more)  
     
    My bibliography  
     
    Export citation