On the $Q$-deformed Heisenberg uncertainty relations and discrete time

Hrubý, Jaroslav. "On the $Q$-deformed Heisenberg uncertainty relations and discrete time." Proceedings of the 15th Winter School "Geometry and Physics". Palermo: Circolo Matematico di Palermo, 1996. [133]-152. <http://eudml.org/doc/220196>.

@inProceedings{Hrubý1996,
abstract = {The opportunity for verifying the basic principles of quantum theory and possible $q$-deformation appears in quantum cryptography (QC) – a new discipline of physics and information theory.The author, member of the group of cryptology of Praha, presents in this paper the possibility to verify the $q$-deformation of Heisenberg uncertainty relation $q$-deformed QM and possible discretization on the base of a model presented in the fourth section.In the seven sections, the author discusses these problems. First an introduction. The second section is on fractional supersymmetry and $q$-deformed quantum mechanics (QM). So he obtains fractional superspace. In section 3, he presents basic information on quantum cryptography (QC) used then for the verification of the $q$-deformation of QM in the null sector. In section 4, he presents a violation of quantum channel via $q$-deformation and in section 5 the $q$-deformed Heisenberg uncertainty relation in QC and a m!},
author = {Hrubý, Jaroslav},
booktitle = {Proceedings of the 15th Winter School "Geometry and Physics"},
keywords = {Proceedings; Geometry; Physics; Winter school; Srni (Czech Republic)},
location = {Palermo},
pages = {[133]-152},
publisher = {Circolo Matematico di Palermo},
title = {On the $Q$-deformed Heisenberg uncertainty relations and discrete time},
url = {http://eudml.org/doc/220196},
year = {1996},
}

TY - CLSWK
AU - Hrubý, Jaroslav
TI - On the $Q$-deformed Heisenberg uncertainty relations and discrete time
T2 - Proceedings of the 15th Winter School "Geometry and Physics"
PY - 1996
CY - Palermo
PB - Circolo Matematico di Palermo
SP - [133]
EP - 152
AB - The opportunity for verifying the basic principles of quantum theory and possible $q$-deformation appears in quantum cryptography (QC) – a new discipline of physics and information theory.The author, member of the group of cryptology of Praha, presents in this paper the possibility to verify the $q$-deformation of Heisenberg uncertainty relation $q$-deformed QM and possible discretization on the base of a model presented in the fourth section.In the seven sections, the author discusses these problems. First an introduction. The second section is on fractional supersymmetry and $q$-deformed quantum mechanics (QM). So he obtains fractional superspace. In section 3, he presents basic information on quantum cryptography (QC) used then for the verification of the $q$-deformation of QM in the null sector. In section 4, he presents a violation of quantum channel via $q$-deformation and in section 5 the $q$-deformed Heisenberg uncertainty relation in QC and a m!
KW - Proceedings; Geometry; Physics; Winter school; Srni (Czech Republic)
UR - http://eudml.org/doc/220196
ER -