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<!DOCTYPE article PUBLIC "-//NLM//DTD JATS (Z39.96) Journal Archiving and Interchange DTD with OASIS Tables with MathML3 v1.4 20241031//EN" "https://jats.nlm.nih.gov/archiving/1.4/JATS-archive-oasis-article1-4-mathml3.dtd">
<article xmlns:xlink="http://www.w3.org/1999/xlink" xmlns:ali="http://www.niso.org/schemas/ali/1.0/" dtd-version="1.4" article-type="research-article" xml:lang="en"><front><journal-meta><journal-title-group><journal-title xml:lang="ru">Математическая физика и компьютерное моделирование</journal-title></journal-title-group><issn publication-format="print">2587-6325</issn><issn publication-format="electronic">2587-6902</issn></journal-meta><article-meta><article-id pub-id-type="doi">10.15688/mpcm.jvolsu.2024.3.3</article-id><article-categories><subj-group><subject>Other</subject></subj-group></article-categories><title-group><article-title xml:lang="ru">УСЛОВИЯ ПАРАБОЛИЧЕСКОГО И ГИПЕРБОЛИЧЕСКОГО ТИПОВ НЕПАРАМЕТРИЧЕСКОЙ ПОВЕРХНОСТИ</article-title><trans-title-group xml:lang="en"><trans-title>CONDITIONS OF PARABOLIC AND HYPERBOLIC TYPES OF NONPARAMETRIC SURFACE</trans-title></trans-title-group></title-group><contrib-group><contrib contrib-type="author"><name-alternatives><name xml:lang="ru"><surname>Кесельман</surname><given-names>Владимир Михайлович</given-names></name><name xml:lang="en"><surname>Keselman</surname><given-names>Vladimir</given-names></name></name-alternatives><xref ref-type="aff" rid="aff1"/><email>vmkes@yandex.ru</email></contrib><contrib contrib-type="author"><name-alternatives><name xml:lang="ru"><surname>Игонина</surname><given-names>Татьяна Романовна</given-names></name><name xml:lang="en"><surname>Igonina</surname><given-names>Tatyana</given-names></name></name-alternatives><xref ref-type="aff" rid="aff1"/><email>t-igonina@yandex.ru</email></contrib><contrib contrib-type="author"><name-alternatives><name xml:lang="ru"><surname>Козлова</surname><given-names>Ольга Юрьевна</given-names></name><name xml:lang="en"><surname>Kozlova</surname><given-names>Olga</given-names></name></name-alternatives><xref ref-type="aff" rid="aff1"/><email>olishka1991@mail.ru</email></contrib><contrib contrib-type="author"><name-alternatives><name xml:lang="ru"><surname>Параскевопуло</surname><given-names>Ольга Ригасовна</given-names></name><name xml:lang="en"><surname>Paraskevopulo</surname><given-names>Olga</given-names></name></name-alternatives><xref ref-type="aff" rid="aff1"/><email>olgapigpar@yandex.ru</email></contrib><aff-alternatives id="aff1"><aff xml:lang="en"><institution>RTU MIREA — Russia Technological University (Moscow, Russian Federation)</institution></aff><aff xml:lang="ru"><institution>РТУ МИРЭА — Российский технологический университет (Москва, Российская Федерация)</institution></aff></aff-alternatives></contrib-group><pub-date pub-type="epub" iso-8601-date="2024-12-15"><day>15</day><month>12</month><year>2024</year></pub-date><volume>27</volume><issue>3</issue><fpage>27</fpage><lpage>37</lpage><history><date date-type="received" iso-8601-date="2024-07-08"><day>08</day><month>07</month><year>2024</year></date><date date-type="accepted" iso-8601-date="2024-08-18"><day>18</day><month>08</month><year>2024</year></date></history><permissions><license xlink:href="https://creativecommons.org/licenses/by/4.0/" xlink:title="CC BY 4.0"><ali:license_ref>https://creativecommons.org/licenses/by/4.0/</ali:license_ref><license-p xml:lang="ru">CC BY 4.0</license-p></license></permissions><abstract xml:lang="en"><p>A nonparametric two-dimensional surface is considered, i.e. the graph of some smooth function 𝑓 = 𝑓(𝑥, 𝑦) defined over the entire plane. The surface type is defined in terms of the two-dimensional capacity of a compact set on the surface as follows. If the capacity of any non-degenerate continuum on the surface is zero, then the surface has a parabolic type, and if the capacity of any non-degenerate continuum on the surface is positive, then the surface has a hyperbolic type. The paper establishes integral conditions for the function 𝑓 defining the surface, under which the surface has one or another type. These conditions are expressed as conditions of convergence or divergence of the corresponding integrals and characterize the degree of growth (for ρ → +∞) of the partial derivatives |𝑓′ ρ | and |𝑓′ φ|, where ρ and φ are the polar coordinates of a point (𝑥, 𝑦) of the plane over which the surface lies. It turns out that if the degree of growth of the function |𝑓′ φ | is small, or more precisely, less than the growth of a linear function of ρ, then, regardless of the growth rate of |𝑓′ ρ |, the surface is of parabolic type. But if (for ρ → +∞) the growth of the function |𝑓′ φ| exceeds the linear growth of ρ, and at the same time exceeds the growth of |𝑓′ ρ|, then the surface is of hyperbolic type. Using the obtained conditions of the hyperbolic type of surface, the construction of an example of a nonparametric surface of hyperbolic type is described. This example complements the known examples of this type constructed by various famous mathematicians back in the late 50s of the last century. But the justifications of these examples, unlike the example proposed in this paper, do not rely (explicitly) on any general condition of the hyperbolic type of surface.</p></abstract><abstract xml:lang="ru" abstract-type="summary"><p>Для двумерной непараметрической поверхности, заданной над всей плоскостью, в терминах емкости определяется понятие типа поверхности (параболический и гиперболический) и устанавливаются как достаточные, так и необходимые условия типа, выраженные в виде условий сходимости или расходимости соответствующих интегралов. Строится пример непараметрической поверхности гиперболического типа.</p></abstract><kwd-group xml:lang="ru"><kwd>непараметрическая поверхность</kwd><kwd>риманово многообразие</kwd><kwd>емкость</kwd><kwd>параболический тип</kwd><kwd>гиперболический тип</kwd><kwd>объем геодезического шара</kwd></kwd-group><kwd-group xml:lang="en"><kwd>nonparametric surface</kwd><kwd>Riemannian manifold</kwd><kwd>capacity</kwd><kwd>parabolic type</kwd><kwd>hyperbolic type</kwd><kwd>volume of a geodesic ball</kwd></kwd-group></article-meta></front><back><ref-list><ref id="ref1"><mixed-citation publication-type="other" xml:lang="ru">Миклюков, В. М. Некоторые признаки параболичности и гиперболичности граничных множеств поверхностей / В. М. Миклюков // Изв. РАН. Сер. матем. — 1996. — Т. 60, № 4. — C. 111–158.</mixed-citation></ref><ref id="ref2"><mixed-citation publication-type="other" xml:lang="ru">Миклюков, В. М. Геометрический анализ. 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Monthly, 1977, vol. 84, no. 1, pp. 43-46.</mixed-citation></ref><ref id="ref18"><mixed-citation publication-type="other" xml:lang="en">Osserman R. Hyperbolic Surfaces of the Form 𝑧 = 𝑓(𝑋, 𝑦). Math. Annalen, 1961, vol. 144, pp. 77-79.</mixed-citation></ref></ref-list><ack xml:lang="ru"><p>Первый из авторов данной статьи, я испытываю огромную благодарность и глубочайшее уважение к Владимиру Михайловичу Миклюкову — своему
бесценному научному руководителю и Учителю!</p></ack></back></article>
