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Communication Open Access August 30, 2023

Spin Structures and non-Relativistic Spin Operators

Plamen Netchev 1,*
1
Independent research, Bulgaria
Publihed in: Current Research in Public Health (Volume 2, Issue 1, 2023)
Page(s): 38-42
DOI: 10.31586/ujpr.2023.664
Received
March 24, 2023
Revised
July 01, 2023
Accepted
August 29, 2023
Published
August 30, 2023
Keywords
Irreducible representations; tangent bundle; angular momentum; spin; 2-covering; spin structure; manifold orientation; left-handed bias
Creative Commons

This is an Open Access article, distributed under the terms of the Creative Commons Attribution 4.0 International License (http://creativecommons.org/licenses/by/4.0/), which permits unrestricted use, distribution and reproduction in any medium or format, provided the original work is properly cited.
Copyright: Copyright © The Author(s), 2023. Published by Scientific Publications
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Cite This Article

APA Style
Netchev, P. (2023). Spin Structures and non-Relativistic Spin Operators. Current Research in Public Health, 2(1), 38-42. https://doi.org/10.31586/ujpr.2023.664
ACS Style
Netchev, P. Spin Structures and non-Relativistic Spin Operators. Current Research in Public Health 2023 2(1), 38-42. https://doi.org/10.31586/ujpr.2023.664
Chicago/Turabian Style
Netchev, Plamen. 2023. "Spin Structures and non-Relativistic Spin Operators". Current Research in Public Health 2, no. 1: 38-42. https://doi.org/10.31586/ujpr.2023.664
AMA Style
Netchev P. Spin Structures and non-Relativistic Spin Operators. Current Research in Public Health. 2023; 2(1):38-42. https://doi.org/10.31586/ujpr.2023.664 
@Article{crph664,
AUTHOR = {Netchev, Plamen},
TITLE = {Spin Structures and non-Relativistic Spin Operators},
JOURNAL = {Current Research in Public Health},
VOLUME = {2},
YEAR = {2023},
NUMBER = {1},
PAGES = {38-42},
URL = {https://www.scipublications.com/journal/index.php/UJPR/article/view/664},
ISSN = {2831-5162},
DOI = {10.31586/ujpr.2023.664},
ABSTRACT = {In Quantum Physics, the spin and angular momentum operators are magnitudes introduced by means of a vector transformation law. However, interpreting the eigenvalues of its Z "components" as projections on said axis leads to certain contradictions supposedly avoided by a mandatory (presented as a freely selected) Z's orientation. It is shown that an oriented physical space almost forces us to project the angular momentum's and spin's eigenvalues onto its orientation's 3-form, which sidesteps entering into inconsistencies. The final conclusion is that this "rare" magnitude called spin, downright naturally comes in and plays thanks to the orientation of our three-dimensional space.},
}
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%A Netchev, Plamen
%D 2023
%J Current Research in Public Health

%@ 2831-5162
%V 2
%N 1
%P 38-42

%T Spin Structures and non-Relativistic Spin Operators
%M doi:10.31586/ujpr.2023.664
%U https://www.scipublications.com/journal/index.php/UJPR/article/view/664

TY  - JOUR
AU  - Netchev, Plamen
TI  - Spin Structures and non-Relativistic Spin Operators
T2  - Current Research in Public Health
PY  - 2023
VL  - 2
IS  - 1
SN  - 2831-5162
SP  - 38
EP  - 42
UR  - https://www.scipublications.com/journal/index.php/UJPR/article/view/664
AB  - In Quantum Physics, the spin and angular momentum operators are magnitudes introduced by means of a vector transformation law. However, interpreting the eigenvalues of its Z "components" as projections on said axis leads to certain contradictions supposedly avoided by a mandatory (presented as a freely selected) Z's orientation. It is shown that an oriented physical space almost forces us to project the angular momentum's and spin's eigenvalues onto its orientation's 3-form, which sidesteps entering into inconsistencies. The final conclusion is that this "rare" magnitude called spin, downright naturally comes in and plays thanks to the orientation of our three-dimensional space.
DO  - Spin Structures and non-Relativistic Spin Operators
TI  - 10.31586/ujpr.2023.664
ER  -