TY - JOUR
T1 - Similarity-projection structures
T2 - The logical geometry of quantum physics
AU - Lehmann, Daniel
PY - 2009/1
Y1 - 2009/1
N2 - Similarity-Projection structures abstract the numerical properties of real scalar product of rays and projections in Hilbert spaces to provide a more general framework for Quantum Physics. They are characterized by properties that possess direct physical meaning. They provide a formal framework that subsumes both classical Boolean logic concerned with sets and subsets and quantum logic concerned with Hilbert space, closed subspaces and projections. They shed light on the role of the phase factors that are central to Quantum Physics. The generalization of the notion of a self-adjoint operator to SP-structures provides a novel notion that is free of linear algebra.
AB - Similarity-Projection structures abstract the numerical properties of real scalar product of rays and projections in Hilbert spaces to provide a more general framework for Quantum Physics. They are characterized by properties that possess direct physical meaning. They provide a formal framework that subsumes both classical Boolean logic concerned with sets and subsets and quantum logic concerned with Hilbert space, closed subspaces and projections. They shed light on the role of the phase factors that are central to Quantum Physics. The generalization of the notion of a self-adjoint operator to SP-structures provides a novel notion that is free of linear algebra.
KW - Measurement algebras
KW - Quantum Logic
KW - Similarity-Projection structures
UR - http://www.scopus.com/inward/record.url?scp=60449084573&partnerID=8YFLogxK
U2 - 10.1007/s10773-008-9801-3
DO - 10.1007/s10773-008-9801-3
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AN - SCOPUS:60449084573
SN - 0020-7748
VL - 48
SP - 261
EP - 281
JO - International Journal of Theoretical Physics
JF - International Journal of Theoretical Physics
IS - 1
ER -