Group-Valued Measures on the Lattice of Closed Subspaces of a Hilbert Space

Harding, John; Jager, Ekaterina; Smith, D. A.

doi:10.1007/s10773-005-3981-x

Cited by 6 publications

(3 citation statements)

References 16 publications

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“…It was shown in [14], that there is no ℤ 2 -coloring of vectors in ℝ 4 and consequently no ℤ 2 -coloring in dimensions greater than four, see [11]. We show that there is no nonconstant ℤ 2 -coloring even for ℝ 3 , which was an open question, formulated, e.g., in [6,10]. The existence of a ℤ 2 -coloring in ℝ 2 is trivial; hence we answer the only remaining case.…”

Section: Introductionmentioning

confidence: 71%

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Generalised Kochen–Specker Theorem in Three Dimensions

Voráček

Navara

2021

Found Phys

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We show that there is no non-constant assignment of zeros and ones to points of a unit sphere in $$\mathbb{R}^3$$ R 3 such that for every three pairwisely orthogonal vectors, an odd number of them is assigned 1. This is a new strengthening of the Bell–Kochen–Specker theorem, which proves the non-existence of hidden variables in quantum theories.

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Section: Introductionmentioning

confidence: 71%

“…It was proved in the sixties that they are impossible in dimensions more than two. One of the elegant proofs [2] allowed to prove also the non-existence of ℤ 2 -colorings in dimensions greater than three [6,11]. The case of dimension three remained an open problem.…”

Section: Discussionmentioning

confidence: 99%

Generalised Kochen–Specker Theorem in Three Dimensions

Voráček

Navara

2021

Found Phys

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“…Remark 3.6. A question related to the existence of a 0,1-valued measure on the projection lattice P(H) was raised in [17]. Does there exist a non-constant Z 2 -valued state on P(H) when H has dimension three?…”

Section: The Topos Approach Over V(n ) *mentioning

confidence: 99%

Topos Quantum Theory with Short Posets

Harding

Heunen

2020

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Topos quantum mechanics, developed by Isham et. al. [2,6,7,14,15,23,24,25,26], creates a topos of presheaves over the poset V(N ) of Abelian von Neumann subalgebras of the von Neumann algebra N of bounded operators associated to a physical system, and established several results, including: (a) a connection between the Kochen-Specker theorem and the nonexistence of a global section of the spectral presheaf; (b) a version of the spectral theorem for self-adjoint operators; (c) a connection between states of N and measures on the spectral presheaf; and (d) a model of dynamics in terms of V(N ). We consider a modification to this approach using not the whole of the poset V(N ), but only its elements V(N ) * of height at most two. This produces a different topos with different internal logic. However, the core results (a)-(d) established using the full poset V(N ) are also established for the topos over the smaller poset, and some aspects simplify considerably. Additionally, this smaller poset has appealing aspects reminiscent of projective geometry.

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Orthomodular Posets Related to Z 2-Valued States

Matoušek

Pták

2013

Int J Theor Phys

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Group-Valued Measures on the Lattice of Closed Subspaces of a Hilbert Space

Cited by 6 publications

References 16 publications

Generalised Kochen–Specker Theorem in Three Dimensions

Generalised Kochen–Specker Theorem in Three Dimensions

Topos Quantum Theory with Short Posets

Orthomodular Posets Related to Z 2-Valued States

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