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dc.contributor.authorPetrichenko, M.-
dc.contributor.authorSerow, D. W.-
dc.date.accessioned2021-03-02T10:59:21Z-
dc.date.available2021-03-02T10:59:21Z-
dc.date.issued2020-
dc.identifier.citationNonlinear Phenomena in Complex Systems. - 2020. - Vol. 23. - № 1. - P. 97-101ru
dc.identifier.issn1561-4085-
dc.identifier.urihttps://elib.bsu.by/handle/123456789/256830-
dc.description.abstractNormal subgroup module f (module over the ring F = [f] 1, 2-diffeomorphisms) coincides with the kernel KerLf derivations along the field. The core consists of the trivial homomorphism (integrals of the system v = ˙x = f(t, x)) and bundles with zero switch group Lf , obtained from the condition ∇(ω ×f) = 0. There is the analog of the Liouville for trivial immersion. In this case, the core group Lf derivations along the field replenished elements V (z), such that ∇z = ω × f. Hence, the core group Lf updated elements helicoid (spiral) bundles, in particular, such that f = ∇U. System as an example Crocco shown that the canonical system does not permit the trivial embedding: the canonical system of equations are the closure of the class of systems that permit a submersion.ru
dc.language.isoenru
dc.publisherMinsk : Education and Upbringingru
dc.rightsinfo:eu-repo/semantics/restrictedAccessen
dc.subjectЭБ БГУ::ЕСТЕСТВЕННЫЕ И ТОЧНЫЕ НАУКИ::Физикаru
dc.titleCanonical Submersion and Lie Homomorphisms Normal Subgroupru
dc.typearticleen
dc.rights.licenseCC BY 4.0ru
dc.identifier.DOIhttps://doi.org/10.33581/1561-4085-2020-23-1-97-101-
Appears in Collections:2020. Volume 23. Number 1

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