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Articolul urmator |
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SM ISO690:2012 CALIN, Iurie, ORLOV, Victor. A rational basis of GL(2; R)-comitants for the bidimensional polynomial system of differential equations of the fifth degree. In: Conference on Applied and Industrial Mathematics: CAIM 2018, 20-22 septembrie 2018, Iași, România. Chișinău, Republica Moldova: Casa Editorial-Poligrafică „Bons Offices”, 2018, Ediţia a 26-a, pp. 27-29. ISBN 978-9975-76-247-2. |
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Conference on Applied and Industrial Mathematics Ediţia a 26-a, 2018 |
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Conferința "Conference on Applied and Industrial Mathematics" Iași, România, Romania, 20-22 septembrie 2018 | |||||||
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Pag. 27-29 | |||||||
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Let us consider the system of di_erential equations of the _fth degree Qi(x; y); (1)where Pi(x; y); Qi(x; y) are homogeneous polynomials of degree i in x and y with real coe_cients. The following GL(2;R)-comitants [1] have the _rst degree with respect to the coe_cients of the system (1).Using the comitants (2) as elementary "bricks" and the notion of transvectant [2] the following GL(2;R)-comitants of the system (1) were constructed. |
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<meta name="citation_title" content="A rational basis of GL(2; R)-comitants for the bidimensional polynomial system of differential equations of the fifth degree"> <meta name="citation_author" content="Calin Iurie"> <meta name="citation_author" content="Orlov Victor"> <meta name="citation_publication_date" content="2018"> <meta name="citation_collection_title" content="Conference on Applied and Industrial Mathematics"> <meta name="citation_volume" content="Ediţia a 26-a"> <meta name="citation_firstpage" content="27"> <meta name="citation_lastpage" content="29"> <meta name="citation_pdf_url" content="https://ibn.idsi.md/sites/default/files/imag_file/27-29_36.pdf">