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Title variants
Languages of publication
Abstracts
We introduce three types of the four-component number systems which are constructed by joining the complex, binary and dual two-component numbers. We study their algebraic properties and rewrite the Euler and Moivre formulas for them. The most general multicomponent number system joining the complex, binary dual numbers is the eight-component number system, for which we determine the algebraic properties and the generalized Euler and Moivre formulas. Some applications of the multicomponent number systems in differential and integral calculus, which are of physical relevance, are also presented.
Keywords
Journal
Year
Volume
Issue
Pages
491-498
Physical description
Dates
published
1996-09
received
1996-02-13
(unknown)
1996-05-07
Contributors
author
- Department of Theoretical Physics, Palacký University, Svobody 26, 77146 Olomouc, Czech Republic
References
Document Type
Publication order reference
Identifiers
YADDA identifier
bwmeta1.element.bwnjournal-article-appv90z302kz
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