A. V. Greshnov, “On finding the exact values of the constant in a $(1,q_2)$-generalized triangle inequality for Box-quasimetrics on $2$-step Carnot groups with $1$-dimensional center”, Sib. Èlektron. Mat. Izv., 18:2 (2021), 1251

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Sibirskie Èlektronnye Matematicheskie Izvestiya [Siberian Electronic Mathematical Reports], 2021, Volume 18, Issue 2, Pages 1251–1260
DOI: https://doi.org/10.33048/semi.2021.18.095 (Mi semr1436)

This article is cited in 1 scientific paper (total in 1 paper)

Real, complex and functional analysis

On finding the exact values of the constant in a $(1,q_2)$-generalized triangle inequality for Box-quasimetrics on $2$-step Carnot groups with $1$-dimensional center

A. V. Greshnov

Sobolev Institute of Mathematics, 4, Koptyuga ave., Novosibirsk, 630090, Russia

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DOI: https://doi.org/10.33048/semi.2021.18.095

Abstract: For $2$-step Carnot groups with $1$-dimensional center, a method for defining the exact values of the constant $q_2$ in a $(1,q_2)$-generalized triangle inequality for their Box-quasimetrics is developed. The exact values of the constant $q_2$ are defined for $4$-, $5$-, and $6$-dimensional $2$-step Carnot groups with $3$-dimensional horisontal subbundle.

Keywords: $(q_1,q_2)$-quasimetric spase, Carnot group, exact value, Box-quasimetric.

Funding agency	Grant number
Ministry of Science and Higher Education of the Russian Federation	0314-2019-0006
The study was carried out within the framework of the State Contract of the Sobolev Institute of Mathematics (Project no. 0314-2019-0006).

Received August 15, 2021, published November 18, 2021

Bibliographic databases:

Document Type: Article

UDC: 517.518

MSC: 43A80

Language: English

Citation: A. V. Greshnov, “On finding the exact values of the constant in a $(1,q_2)$-generalized triangle inequality for Box-quasimetrics on $2$-step Carnot groups with $1$-dimensional center”, Sib. Èlektron. Mat. Izv., 18:2 (2021), 1251–1260

Citation in format AMSBIB

\Bibitem{Gre21}

\by A.~V.~Greshnov

\paper On finding the exact values of the constant in a $(1,q_2)$-generalized triangle inequality for Box-quasimetrics on $2$-step Carnot groups with $1$-dimensional center

\jour Sib. \`Elektron. Mat. Izv.

\yr 2021

\vol 18

\issue 2

\pages 1251--1260

\mathnet{http://mi.mathnet.ru/semr1436}

\crossref{https://doi.org/10.33048/semi.2021.18.095}

\isi{https://gateway.webofknowledge.com/gateway/Gateway.cgi?GWVersion=2&SrcApp=Publons&SrcAuth=Publons_CEL&DestLinkType=FullRecord&DestApp=WOS_CPL&KeyUT=000734395000015}

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https://www.mathnet.ru/eng/semr/v18/i2/p1251

This publication is cited in the following 1 articles:

Citing articles in Google Scholar: Russian citations, English citations
Related articles in Google Scholar: Russian articles, English articles

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References:	11

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