Contractions on ranks and quaternion types in clifford algebras

Dmitry S Shirokov; Широков Дмитрий Сергеевич

doi:10.14498/vsgtu1387

Contractions on ranks and quaternion types in clifford algebras

Authors: Shirokov D.S¹
Affiliations:
1. A. A. Kharkevich Institute for Information Transmission Problems, Russian Academy of Sciences
Issue: Vol 19, No 1 (2015)
Pages: 117-135
Section: Articles
URL: https://ogarev-online.ru/1991-8615/article/view/20435
DOI: https://doi.org/10.14498/vsgtu1387
ID: 20435

Cite item

Full Text

Abstract
Full Text
About the authors
References
Supplementary files
Statistics

Abstract

In this paper we consider expressions in real and complex Clifford algebras, which we call contractions or averaging. We consider contractions of arbitrary Clifford algebra element. Each contraction is a sum of several summands with different basis elements of Clifford algebra. We consider even and odd contractions, contractions on ranks and contractions on quaternion types. We present relation between these contractions and projection operations onto ﬁxed subspaces of Cliﬀord algebras - even and odd subspaces, subspaces of ﬁxed ranks and subspaces of ﬁxed quaternion types. Using method of contractions we present solutions of system of commutator equations in Clifford algebras. The cases of commutator and anticommutator are the most important. These results can be used in the study of different ﬁeld theory equations, for example, Yang-Mills equations, primitive ﬁeld equation and others.

Keywords

Clifford algebras, contractions, projection operations, quaternion type

Full Text

##article.viewOnOriginalSite##

About the authors

Dmitry S Shirokov

A. A. Kharkevich Institute for Information Transmission Problems, Russian Academy of Sciences

Email: dm.shirokov@gmail.com
(Cand. Phys. & Math. Sci.; dm.shirokov@gmail.com), Scientiﬁc Researcher, Lab. 7 “Bioelectric Information Processing” 19, Bolshoy Karetny per., Moscow, 127994, Russian Federation

References

Clifford W. K. Application of Grassmann's Extensive Algebra // American Journal of Mathematics, 1878. vol. 1, no. 4. pp. 350-358. doi: 10.2307/2369379.
Hamilton W. R. II. On quaternions, or on a new system of imaginaries in algebra // Philosophical Magazine Series 3, 1844. vol. 25, no. 163. pp. 489-495. doi: 10.1080/14786444408644923.
Grassmann H. Die Lineale Ausdehnungslehre ein neuer Zweig der Mathematik. Leipzig: Verlag von Otto Wigand, 1844. xxxii+282 pp., Internet Archive Identiﬁer: dielinealeausde00grasgoog
Grassmann H. Die Lineale Ausdehnungslehre ein neuer Zweig der Mathematik. Cambridge: Cambridge University Press, 2012. xxxii+282 pp. doi: 10.1017/CBO9781139237352
Lipschitz R. Untersuchungen über die Summen von Quadraten. Bonn: Max Cohen und Sohn, 1886. 147 pp.
Chevalley C. Collected works. vol. 2: The algebraic theory of spinors and Clifford algebras / eds. Pierre Cartier and Catherine Chevalley. Berlin: Springer, 1997. xiv+ 214 pp.
Dirac P. A. M. The Quantum Theory of the Electron // Proc. R. Soc. (A), 1928. vol. 117, no. 778. pp. 610-624. doi: 10.1098/rspa.1928.0023
Dirac P. A. M. The Quantum Theory of the Electron / Special Theory of Relativity / The Commonwealth and International Library: Selected Readings in Physics, 1970. pp. 237-256. doi: 10.1016/b978-0-08-006995-1.50017-x.
Hestenes D., Sobczyk G. Clifford Algebra to Geometric Calculus. A Uniﬁed Language for Mathematics and Physics. Reidel Publishing Company, 1984. 314 pp.
Марчук Н. Г. Уравнения теории поля и алгебры Клиффорда. Ижевск: РХД, 2009. 304 с.
Dixon J. D. Computing Irreducible Representations of Groups // Math. Comp., 1970. vol. 24, no. 111. pp. 707-712. doi: 10.2307/2004848.
Babai L., Friedl K. Approximate representation theory of ﬁnite groups // Foundations of Computer Science, 1991. pp. 733-742. doi: 10.1109/sfcs.1991.185442.
Shirokov D. S. Method of averaging in Clifford algebras, 2015. 15 pp., arXiv: 1412.0246 [math-ph]
Marchuk N. G., Shirokov D. S. New class of gauge invariant solutions of Yang-Mills equations, 2014. 35 pp., arXiv: 1406.6665 [math-ph]
Shirokov D. S. Method of generalized contractions and Pauli’s theorem in Clifford algebras, 2014. 14 pp., arXiv: 1409.8163 [math-ph]
Pauli W. Contributions mathématiques a la théorie des matrices de Dirac // Annales de l'institut Henri Poincar´, 1936. vol. 6, no. 2. pp. 109-136.
Широков Д. С. Обобщение теоремы Паули на случай алгебр Клиффорда // Докл. РАН, 2011. Т. 440, № 5. С. 1-4.
Широков Д. С. Теорема Паули при описании n-мерных спиноров в формализме алгебр Клиффорда // ТМФ, 2013. Т. 175, № 1. С. 11-34. doi: 10.4213/tmf8384.
Широков Д. С. Использование обобщённой теоремы Паули для нечётных элементов алгебры Клиффорда для анализа связей между спинорными и ортогональными группами произвольных размерностей // Вестн. Сам. гос. техн. ун-та. Сер. Физ.-мат. науки, 2013. № 1(30). С. 279-287. doi: 10.14498/vsgtu1176.
Marchuk N. G., Shirokov D. S. Unitary spaces on Cliﬀord algebras // Adv. Appl. Clifford Algebras, 2008. vol. 18, no. 2. pp. 237-254, arXiv: 0705.1641 [math-ph]. doi: 10.1007/s00006-008-0066-y.
Lounesto P. Cliﬀord Algebras and Spinors / London Mathematical Society Lecture Note Series. vol. 239. Cambridge: Cambridge University Press, 1997. ix+306 pp.
Lounesto P. Clifford Algebras and Spinors (second edition) / London Mathematical Society Lecture Note Series. vol. 286. Cambridge: Cambridge University Press, 2001. ix+338 pp. doi: 10.1017/cbo9780511526022
Широков Д. С. Классификация элементов алгебр Клиффорда по кватернионным типам // ДАН, 2009. Т. 427, № 6. С. 758-760.
Shirokov D. S. Quaternion typiﬁcation of Cliﬀord algebra elements // Adv. Appl. Clifford Algebras, 2012. vol. 22, no. 1. pp. 243-256. doi: 10.1007/s00006-011-0288-2.
Shirokov D. S. Development of the method of quaternion typiﬁcation of Clifford algebra elements // Adv. Appl. Clifford Algebras, 2012. vol. 22, no. 2. pp. 483-497, arXiv: 0903.3494 [math-ph]. doi: 10.1007/s00006-011-0304-6.

Supplementary files

Supplementary Files

Action

1. JATS XML

Download

Username
Password
Remember me

Forgot password?	Register

Username
Password
Remember me

Forgot password?	Register