Cubic diferential systems with an invariant straight line of maximal multiplicity A Suba, O Vacaras Annals of the University of Craiova-Mathematics and Computer Science Series …, 2015 | 28 | 2015 |
Cubic differential systems with two affine real non-parallel invariant straight lines of maximal multiplicity O Vacaraş Buletinul Academiei de Ştiinţe a Republicii Moldova. Matematica 79 (3), 79-101, 2015 | 13 | 2015 |
Center problem for cubic differential systems with the line at infinity and an affine real invariant straight line of total multiplicity four A Șubă, O Vacaraș Буковинський математичний журнал 9 (2), 2021 | 6 | 2021 |
Quartic differential systems with an invariant straight line of maximal multiplicity A Suba, O Vacaraş Buletinul Academiei de Ştiinţe a Republicii Moldova. Matematica 86 (1), 76-91, 2018 | 5 | 2018 |
Cubic differential systems with a straight line of maximal multiplicity A Suba, O Vacaraş Conference of Mathematical Society of the Republic of Moldova 3, 291-294, 2014 | 5 | 2014 |
Maximal multiplicity of the line at infinity for quartic differential systems O Vacaraş Acta et commentationes (Ştiinţe Exacte și ale Naturii) 6 (2), 70-77, 2018 | 3 | 2018 |
Cubic Systems with an Invariant Line at Infinity of the Maximal Geometric Multiplicity. A Șubă, O Vacaraș International Conference on Applied Mathematics (ICAM-2013), p.30, 2013 | 3* | 2013 |
Sisteme cubice de ecuaţii diferenţiale cu două şi trei drepte invariante de multiplicitate maximală: 111.02–Ecuaţii diferenţiale: Autoref. tz. de doct. în şt. matematice O Vacaraş Chişinău, 2017 | 2 | 2017 |
Maximal multiplicity of the line at infinity for cubic differential systems with two real parallel invariant straight lines O Vacaraș International Conference: Mathematics & Information Technologies: Research …, 2016 | 2 | 2016 |
Maximal multiplicity of the line at infinity for cubic differential systems with two real non-parallel invariant straight lines. A Șubă, O Vacaraș International scientific conference Differential-Functional equations and …, 2016 | 2 | 2016 |
Cubic differential systems with two non-parallel real invariant straight lines of maximal multiplicity. A Șubă, O Vacaraș International Conference: Mathematics and Information Technologies …, 2015 | 2 | 2015 |
Cubic differential systems with two affine real invariant straight lines, both of multiplicity three, and the line of infinity of multiplicity one O Vacaraş Învățămîntul superior din Republica Moldova la 85 de ani 1, 53-54, 2015 | 2 | 2015 |
Cubic systems with a real invariant straight line of maximal integrable multiplicity O Vacaraș International Conference: Mathematics & Information Technologies: Research …, 2013 | 2 | 2013 |
Cubic differential systems with a straight line of maximal geometric multiplicity. A Șubă, O Vacaraș Conference on Applied and Industrial Mathematics, p.58, 2013 | 2* | 2013 |
Cubic systems with a straight line of maximal infinitesimal multiplicity O Vacaraș The International Conference of Young Researchers, p.127, 2012 | 2 | 2012 |
Cubic systems with a straight line of maximal algebraic multiplicity O Vacaraș Conference on Applied and Industrial Mathematics, p.218, 2012 | 2 | 2012 |
Limite de șiruri, funcții și aplicațiile lor pentru studierea seriilor la convergență: Indicații metodice pentru lecțiile practice V CERNII, O VACARAȘ, A ȚURCANU Universitatea Tehnică a Moldovei, 2024 | | 2024 |
Quartic differential systems with a non-degenerate monodromic critical point and multiple line at infinity A Suba, O Vacaraş Acta et commentationes (Ştiinţe Exacte și ale Naturii) 16 (2), 25-34, 2023 | | 2023 |
QUARTIC DIFFERENTIAL SYSTEMS WITH A NON-DEGENERATE MONODROMIC CRITICAL POINT AND MULTIPLE LINE AT INFINITY O Vacaraş, A Subă | | 2023 |
Algebră liniară și geometrie analitică. Lucrare metodică I Jardan, L Dohotaru, A Popescu, O Vacaraș Editura Tehnica-UTM, Chișinău, 2023 | | 2023 |