Center conditions and phase portraits in a cubic di_erential system with invariant algebraic curves

Cozma Dumitru; Dascalescu Anatolii; Repeşco Vadim

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Articolul urmator

262

Ultima descărcare din IBN:
2023-11-17 16:08

SM ISO690:2012

COZMA, Dumitru, DASCALESCU, Anatolii, REPEŞCO, Vadim. Center conditions and phase portraits in a cubic di_erential system with invariant algebraic curves. In: Conference on Applied and Industrial Mathematics: CAIM 2017, 14-17 septembrie 2017, Iași. Chișinău: Casa Editorial-Poligrafică „Bons Offices”, 2017, Ediţia 25, pp. 16-17. ISBN 978-9975-76-247-2.

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Conference on Applied and Industrial Mathematics
Ediţia 25, 2017

Conferința "Conference on Applied and Industrial Mathematics"
Iași, Romania, 14-17 septembrie 2017

Center conditions and phase portraits in a cubic di_erential system with invariant algebraic curves

Pag. 16-17

Cozma Dumitru, Dascalescu Anatolii, Repeşco Vadim

Tiraspol State University

Disponibil în IBN: 22 septembrie 2022

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Rezumat

We consider the cubic system of di erential equations in which variables and coecients are assumed to be real. The origin O(0; 0) is a singular point of a center or focus type for (1). In this talk we present conditions for the origin to be a center for system (1) with a certain number of invariant algebraic curves and construct the global phase portraits.