In this paper, we show that Erwin Schroedinger's generalization of the
Einstein Podolsky Rosen argument can be connected to certain mathematical
theorems - Gleason's and also Kochen and Specker's - in a manner analogous to
the relation of EPR itself with Bell's theorem. In both cases, the conclusion
is quantum nonlocality, as we discuss. The "Schroedinger nonlocality" proofs
share some features with the Greenberger, Horne, and Zeilinger
quantum-nonlocality work, yet also differ in significant ways.
For clarity and completeness, we begin with a detailed discussion of the
topic of hidden variable theorems. We argue, in agreement with John S. Bell,
that 'impossibility' does not follow.
%0 Generic
%1 citeulike:73384
%A Hemmick, Douglas L.
%D 2004
%K hidden mechanic nonlocality quantum variables
%T Hidden Variables and Nonlocality in Quantum Mechanics
%U http://arxiv.org/abs/quant-ph/0412011
%X In this paper, we show that Erwin Schroedinger's generalization of the
Einstein Podolsky Rosen argument can be connected to certain mathematical
theorems - Gleason's and also Kochen and Specker's - in a manner analogous to
the relation of EPR itself with Bell's theorem. In both cases, the conclusion
is quantum nonlocality, as we discuss. The "Schroedinger nonlocality" proofs
share some features with the Greenberger, Horne, and Zeilinger
quantum-nonlocality work, yet also differ in significant ways.
For clarity and completeness, we begin with a detailed discussion of the
topic of hidden variable theorems. We argue, in agreement with John S. Bell,
that 'impossibility' does not follow.
@misc{citeulike:73384,
abstract = {In this paper, we show that Erwin Schroedinger's generalization of the
Einstein Podolsky Rosen argument can be connected to certain mathematical
theorems - Gleason's and also Kochen and Specker's - in a manner analogous to
the relation of EPR itself with Bell's theorem. In both cases, the conclusion
is quantum nonlocality, as we discuss. The "Schroedinger nonlocality" proofs
share some features with the Greenberger, Horne, and Zeilinger
quantum-nonlocality work, yet also differ in significant ways.
For clarity and completeness, we begin with a detailed discussion of the
topic of hidden variable theorems. We argue, in agreement with John S. Bell,
that 'impossibility' does not follow.},
added-at = {2007-08-18T13:22:24.000+0200},
author = {Hemmick, Douglas L.},
biburl = {https://www.bibsonomy.org/bibtex/23bf759c9852b0183eb149dbf5df978a6/a_olympia},
citeulike-article-id = {73384},
description = {citeulike},
eprint = {quant-ph/0412011},
interhash = {d0d7bfcd181a966f4483f4b458a14b3a},
intrahash = {3bf759c9852b0183eb149dbf5df978a6},
keywords = {hidden mechanic nonlocality quantum variables},
month = {December},
timestamp = {2007-08-18T13:22:55.000+0200},
title = {Hidden Variables and Nonlocality in Quantum Mechanics},
url = {http://arxiv.org/abs/quant-ph/0412011},
year = 2004
}