Classical systems and observables in quantum mechanics

Neumann, Holger

doi:10.1007/bf01877752

“…It explores the convex structures of quantum mechanics with a special attention concentrated on the convex set of all states (pure and mixed) of a quantum system. The description of quantum mechanics from that point of view was most systematically explored by Ludwig [14] and further developed in [3][4][5][6]11,[15][16][17]19,21,22]; it now becomes one of main currents in the foundation of quantum theory. The synthesis of the convex and the algebraic approaches has been gradually achieved [3,5,6,[9][10][11]16,19].…”

Section: Introductionmentioning

confidence: 99%

Generalized quantum mechanics

Mielnik¹

1974

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A convex scheme of quantum theory is outlined where the states are not necessarily the density matrices in a Hubert space. The physical interpretation of the scheme is given in terms of generalized "impossibility principles". The geometry of the convex set of all pure and mixed states (called a statistical figure) is conditioned by the dynamics of the system. This provides a method of constructing the statistical figures for non-linear variants of quantum mechanics where the superposition principle is no longer valid. Examples of that construction are given and its possible significance for the interrelation between quantum theory and general relativity is discussed.

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“…Then every element Of RMo is a disjoint union of 'monomials" ~r a = n pxi-l(5-~, ~i E T. A vector-valued measure is defined on RMu if it is i=1 defined on these monomials. We put A u = RMo and define x fora E RMv,X EMu, × is a vectorvalued measure on RMo such that X(RMu) = My (compare also the proof of Theorem 8 (Neumann, 1971)). This completes the proof of the theorem.…”

Section: N } C X ( a )mentioning

confidence: 98%

“…On the other hand the connection between observables and the description of classical systems allows us to carry over results valid for classical systems to regions of quantum mechanical systems (Neumann, 1971).…”

Section: Introductionmentioning

confidence: 99%

A new physical characterisation of classical systems in quantum mechanics

Neumann

¹

1974

Int J Theor Phys

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2

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“…It explores the convex structures of quantum mechanics with a special attention concentrated on the convex set of all states (pure and mixed) of a quantum system. The description of quantum mechanics from that point of view was most systematically explored by Ludwig [14] and further developed in [3][4][5][6]11,[15][16][17]19,21,22]; it now becomes one of main currents in the foundation of quantum theory. The synthesis of the convex and the algebraic approaches has been gradually achieved [3,5,6,[9][10][11]16,19].…”

Section: Introductionmentioning

confidence: 99%

Generalized Quantum Mechanics

Wan¹

2006

From Micro to Macro Quantum Systems

0

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A convex scheme of quantum theory is outlined where the states are not necessarily the density matrices in a Hubert space. The physical interpretation of the scheme is given in terms of generalized "impossibility principles". The geometry of the convex set of all pure and mixed states (called a statistical figure) is conditioned by the dynamics of the system. This provides a method of constructing the statistical figures for non-linear variants of quantum mechanics where the superposition principle is no longer valid. Examples of that construction are given and its possible significance for the interrelation between quantum theory and general relativity is discussed.

show abstract

Classical systems and observables in quantum mechanics

Cited by 17 publications

References 3 publications

Generalized quantum mechanics

Generalized quantum mechanics

A new physical characterisation of classical systems in quantum mechanics

Generalized Quantum Mechanics

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