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Eurasian Mathematical Journal, 2018, Volume 9, Number 1, Pages 69–82
(Mi emj287)
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Generalized Hamel basis and basis extension in convex cones and uniquely divisible semigroups
I. V. Orlov
Department of Mathematics and Informatics,
Crimean Federal V. Vernadsky University,
4 Academician Vernadsky Ave.,
295007 Simferopol, Republic Crimea, Russia
Abstract:
In the work, a concept of sublinear independence in an arbitrary convex cone is introduced and the corresponding generalization of Hamel basis is studied. Applying these results to the cones generated by uniquely divisible semigroups ((UD)-semigroups) allows us to extend obtained results for the class of (UD)-semigroups. Some applications are considered.
Keywords and phrases:
Hamel basis, convex cone, sublinear independence, divisible semigroup, uniquely divisible semigroup, cancellation law.
Received: 23.08.2016
Revised: 16.04.2017
Citation:
I. V. Orlov, “Generalized Hamel basis and basis extension in convex cones and uniquely divisible semigroups”, Eurasian Math. J., 9:1 (2018), 69–82
Linking options:
https://www.mathnet.ru/eng/emj287 https://www.mathnet.ru/eng/emj/v9/i1/p69
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| Abstract page: | 283 | | Full-text PDF : | 111 | | References: | 40 |
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