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Operational Independence and Operational Separability in Algebraic Quantum Mechanics

Miklós Rédei

Foundations of Physics 40 (9-10):1439-1449 (2010)

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A categorial approach to relativistic locality.Miklós Rédei - 2014 - Studies in History and Philosophy of Science Part B: Studies in History and Philosophy of Modern Physics 48 (S1):137-146.details Relativistic locality is interpreted in this paper as a web of conditions expressing the compatibility of a physical theory with the underlying causal structure of spacetime. Four components of this web are distinguished: spatiotemporal locality, along with three distinct notions of causal locality, dubbed CL-Independence, CL-Dependence, and CL-Dynamic. These four conditions can be regimented using concepts from the categorical approach to quantum field theory initiated by Brunetti, Fredenhagen, and Verch (2003). A covariant functor representing a general quantum field theory is (...) Download Export citation Bookmark 4 citations
How local are local operations in local quantum field theory?Miklós Rédei & Giovanni Valente - 2010 - Studies in History and Philosophy of Science Part B: Studies in History and Philosophy of Modern Physics 41 (4):346-353.details Download Export citation Bookmark 11 citations
Hilbert's 6th Problem and Axiomatic Quantum Field Theory.Miklós Rédei - 2014 - Perspectives on Science 22 (1):80-97.details This paper has two parts, a historical and a systematic. In the historical part it is argued that the two major axiomatic approaches to relativistic quantum field theory, the Wightman and Haag-Kastler axiomatizations, are realizations of the program of axiomatization of physical theories announced by Hilbert in his 6th of the 23 problems discussed in his famous 1900 Paris lecture on open problems in mathematics, if axiomatizing physical theories is interpreted in a soft and opportunistic sense suggested in 1927 by (...) Download Export citation Bookmark 6 citations
Categorial subsystem independence as morphism co-possibility.Zalán Gyenis & Miklós Rédei - 2017 - Communications in Mathematical Physics.details This paper formulates a notion of independence of subobjects of an object in a general (i.e. not necessarily concrete) category. Subobject independence is the categorial generalization of what is known as subsystem independence in the context of algebraic relativistic quantum field theory. The content of subobject independence formulated in this paper is morphism co-possibility: two subobjects of an object will be defined to be independent if any two morphisms on the two subobjects of an object are jointly implementable by a (...) Download Export citation Bookmark

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