TY - JOUR
T1 - Complementary Observables in Quantum Mechanics
AU - Kiukas, Jukka
AU - Lahti, Pekka
AU - Pellonpaa, Juha-Pekka
AU - Ylinen, Kari
N1 - Funding Information:
Open access funding provided by University of Turku (UTU) including Turku University Central Hospital.
Publisher Copyright:
© 2019, The Author(s).
PY - 2019/6/15
Y1 - 2019/6/15
N2 - We review the notion of complementarity of observables in quantum mechanics, as formulated and studied by Paul Busch and his colleagues over the years. In addition, we provide further clarification on the operational meaning of the concept, and present several characterisations of complementarity—some of which new—in a unified manner, as a consequence of a basic factorisation lemma for quantum effects. We work out several applications, including the canonical cases of position–momentum, position–energy, number–phase, as well as periodic observables relevant to spatial interferometry. We close the paper with some considerations of complementarity in a noisy setting, focusing especially on the case of convolutions of position and momentum, which was a recurring topic in Paul’s work on operational formulation of quantum measurements and central to his philosophy of unsharp reality.
AB - We review the notion of complementarity of observables in quantum mechanics, as formulated and studied by Paul Busch and his colleagues over the years. In addition, we provide further clarification on the operational meaning of the concept, and present several characterisations of complementarity—some of which new—in a unified manner, as a consequence of a basic factorisation lemma for quantum effects. We work out several applications, including the canonical cases of position–momentum, position–energy, number–phase, as well as periodic observables relevant to spatial interferometry. We close the paper with some considerations of complementarity in a noisy setting, focusing especially on the case of convolutions of position and momentum, which was a recurring topic in Paul’s work on operational formulation of quantum measurements and central to his philosophy of unsharp reality.
KW - quantum observables
KW - positive operator measures
KW - effects
KW - complementarity
KW - joint measurability
KW - position - momentum pair
KW - position - energy pair
KW - momentum - energy pair
KW - time - energy pair
KW - phase - number pair
KW - Quantum observables
KW - Complementarity
KW - Positive operator measures
KW - Joint measurability
KW - Effects
KW - Position–momentum pair
KW - Phase–number pair
KW - Time–energy pair
KW - Momentum–energy pair
KW - Position–energy pair
UR - http://www.scopus.com/inward/record.url?scp=85065294924&partnerID=8YFLogxK
U2 - 10.1007/s10701-019-00261-3
DO - 10.1007/s10701-019-00261-3
M3 - Article
SN - 0015-9018
VL - 49
SP - 506
EP - 531
JO - Foundations of Physics
JF - Foundations of Physics
IS - 6
ER -