2019
DOI: 10.1016/j.jfa.2018.05.019
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Wigner-type theorem on transition probability preserving maps in semifinite factors

Abstract: The Wigner's theorem, which is one of the cornerstones of the mathematical formulation of quantum mechanics, asserts that every symmetry of quantum system is unitary or anti-unitary. This classical result was first given by Wigner in 1931. Thereafter it has been proved and generalized in various ways by many authors. Recently, G. P. Gehér extended Wigner's and Molnár's theorems and characterized the transformations on the Grassmann space of all rank-n projections which preserve the transition probability. The … Show more

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Cited by 14 publications
(5 citation statements)
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“…It turns out that, despite the significantly weakened assumption on our map, the structure of these transformations is exactly the same as given by Molnár's theorem from the previous paragraph. We also note that in a recent interesting paper [16], Qian, Wang, Wu, and Yuan further generalized this result to the setting of semifinite factors.…”
Section: Book Reviewsmentioning
confidence: 61%
“…It turns out that, despite the significantly weakened assumption on our map, the structure of these transformations is exactly the same as given by Molnár's theorem from the previous paragraph. We also note that in a recent interesting paper [16], Qian, Wang, Wu, and Yuan further generalized this result to the setting of semifinite factors.…”
Section: Book Reviewsmentioning
confidence: 61%
“…As for the isometries with respect to the L 2 -norm, Gehér generalized the early work of Molnár [15] and proved that every (not necessarily surjective) L 2 -isometry on Grassmann spaces in B(H) is induced by a Jordan *-homomorphisms of B(H) [6]. This result was later generalized to the case of L 2 -isometry on Grassmann spaces in semifinite factors [20].…”
Section: Introduction and Statement Of The Main Resultsmentioning
confidence: 98%
“…Assume that p = 2. Proceed as in the proof of Lemma 1 in [15] (or see the proof of Lemma 2.2 in [20]), we can show that φ has a unique linear extension Φ on the linear span of P(M 1 ). More explicitly, Φ is defined as follows…”
Section: Surjective L P -Isometries Of the Grassmann Spacesmentioning
confidence: 88%
See 1 more Smart Citation
“…They made use of the idea of geodesics between two projections, which is also essential in our proof of Theorem 2.1. See also [16], [3], [13] and [10], [15], in which mappings between projection lattices with an assumption which is different from ours are studied.…”
Section: Introductionmentioning
confidence: 99%