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Publication:3209632
zbMath0722.46010MaRDI QIDQ3209632
Publication date: 1989
Title: zbMATH Open Web Interface contents unavailable due to conflicting licenses.
a separable real or complex inner product space is complete if and only if its orthomodular orthocomplemented orthoposet of all splitting subspaces possesses at least one statemeasure-theoretic characterization of Hilbert spaces among inner product spaces
Hilbert and pre-Hilbert spaces: geometry and topology (including spaces with semidefinite inner product) (46C05) Characterizations of Hilbert spaces (46C15) Complemented lattices, orthocomplemented lattices and posets (06C15) Complemented modular lattices, continuous geometries (06C20)
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State on splitting subspaces and completeness of inner product spaces ⋮ Bibliography on quantum logics and related structures
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