Abstract
We extend the topos-theoretic treatment given in previous papers (Butterfield, J. and Isham, C. J. (1999). International Journal of Theoretical Physics 38, 827–859; Hamilton, J., Butterfield, J., and Isham, C. J. (2000). International Journal of Theoretical Physics 39, 1413–1436; Isham, C. J. and Butterfield, J. (1998). International Journal of Theoretical Physics 37, 2669–2733) of assigning values to quantities in quantum theory. In those papers, the main idea was to assign a sieve as a partial and contextual truth value to a proposition that the value of a quantity lies in a certain set \(\Delta \subseteq \mathbb{R}\). Here we relate such sieve-valued valuations to valuations that assign to quantities subsets, rather than single elements, of their spectra (we call these “interval” valuations). There are two main results. First, there is a natural correspondence between these two kinds of valuation, which uses the notion of a state's support for a quantity (Section 3). Second, if one starts with a more general notion of interval valuation, one sees that our interval valuations based on the notion of support (and correspondingly, our sieve-valued valuations) are a simple way to secure certain natural properties of valuations, such as monotonicity (Section 4).
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Butterfield, J., Isham, C.J. Topos Perspective on the Kochen–Specker Theorem: IV. Interval Valuations. International Journal of Theoretical Physics 41, 613–639 (2002). https://doi.org/10.1023/A:1015276209768
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DOI: https://doi.org/10.1023/A:1015276209768