| 1 | Sapagovas, Mifodijus; Novickij, Jurij. On stability in the maximum norm of difference scheme for nonlinear parabolic equation with nonlocal condition // Nonlinear analysis: modelling and control. Vilnius : Vilniaus universiteto leidykla. ISSN 1392-5113. eISSN 2335-8963. 2023, vol. 28, no. 2, p. [1-12]. DOI: 10.15388/namc.2023.28.31562. |
| 2 | Sapagovas, Mifodijus; Novickij, Jurij; Čiupaila, Regimantas. Stability analysis of the Peaceman-Rachford method for parabolic equations with nonlocal conditions // Electronic journal of diferential equations. San Marcos : Texas State University. ISSN 1072-6691. 2022, vol. 2022, no. 44, p. 1-15. DOI: 10.58997/ejde.2022.44. |
| 3 | Sapagovas, Mifodijus; Novickij, Jurij. Alternating direction method for the wave equation with integral boundary conditions // Applied numerical mathematics. Amsterdam : Elsevier B.V. ISSN 0168-9274. eISSN 1873-5460. 2022, vol. 182, p. 1-13. DOI: 10.1016/j.apnum.2022.07.017. |
| 4 | Štikonas, Artūras; Sapagovas, Mifodijus; Novickij, Jurij. Stability analysis of a weighted difference scheme for two-dimensional hyperbolic equations with integral conditions // Mathematical modelling and analysis [MMA2019] : 24th international conference, May 28–31, 2019, Tallinn, Estonia : abstracts. Tallinn : Tallinn University of Technology, 2019. ISBN 9789949834396. p. 76. Prieiga per internetą: <https://www.ttu.ee/institutes/department-of-cybernetics/conferences-19/mathematical-modelling-and-analysis-2019/>. |
| 5 | Sapagovas, Mifodijus; Novickij, Jurij; Štikonas, Artūras. Stability analysis of a weighted difference scheme for two-dimensional hyperbolic equations with integral conditions // Electronic journal of diferential equations. San Marcos : Texas State University. ISSN 1072-6691. 2019, vol. 2 019, no 4, p. 1-13. Prieiga per internetą: <https://ejde.math.txstate.edu/Volumes/2019/04/abstr.html> [žiūrėta 2019-01-11]. |
| 6 | Novickij, Jurij; Štikonas, Artūras; Skučaitė, Agnė. On the stability of a weighted finite difference scheme for hyperbolic equation with integral boundary conditions // Numerical mathematics and advanced applications ENUMATH 2015 / Editors: Bülent Karasözen, Murat Manguoğlu, Münevver Tezer-Sezgin, Serdar Göktepe, Ömür Uğur . Ser.: Lecture notes in computational science and engineering. Vol. 112. ISSN 1439-7358. Cham : Springer International Publishing Switzerland, 2016. ISBN 9783319399270. eISBN 9783319399294. p. 617-626. DOI: 10.1007/978-3-319-39929-4_59. |
| 7 | Novickij, Jurij; Skučaitė, Agnė; Štikonas, Artūras. Spectrum analysis of the weighted finite difference scheme for the wave equation with the nonlocal integral boundary conditions // European conference on numerical mathematics and advanced applications, Ankara, 14-18 September 2015 : book of abstracts. Ankara : Institute of Applied Mathematics, Middle East Technical University. 2015, p. 84. Prieiga per internetą: <http://enumath2015.iam.metu.edu.tr/bookOfAbstracts.pdf> [žiūrėta 2015-11-23]. |
| 8 | Novickij, Jurij; Štikonas, Artūras. Spectrum analysis of the weighted finite difference scheme for the wave equation with integral boundary conditions // Mathematical modelling and analysis: 20th international conference : abstracts, May 26-29, 2015, Sigulda, Latvia. Riga : University of Latvia, 2015. ISBN 9789984459998. p. 61. Prieiga per internetą: <http://www.lu.lv/fileadmin/user_upload/lu_portal/projekti/mma2015/MMAtezes/Novickij.pdf> [žiūrėta 2015-06-08]. |
| 9 | Novickij, Jurij; Štikonas, Artūras. On the equivalence of discrete Sturm–Liouville problem with nonlocal boundary conditions to the algebraic eigenvalue problem // Lietuvos matematikos rinkinys. Proceedingsof the Lithuanian Mathematical Society. Ser.A. Vilnius : Vilniaus Universitetas. Matematikos ir Informatikos Insititutas. ISSN 0132-2818. 2015, Vol. 56, p. 66-71. DOI: 10.15388/LMR.A.2015.12. |
| 10 | Novickij, Jurij; Štikonas, Artūras. Stability of the weighted finite-difference scheme for hyperbolic equation with two nonlocal integral conditions // Mathematical modelling and analysis (MMA2014) : 19th international conference, May 26-29, 2014, Lithuania : abstracts. Vilnius : Technika, 2014. ISBN 9786094576928. p. 47. Prieiga per internetą: <http://inga.vgtu.lt/~art/konf/AbstractsMMA2014.pdf> [žiūrėta 2014-09-12]. |
| 11 | Novickij, Jurij; Štikonas, Artūras. On the stability of a finite difference scheme with two weights for wave equation with nonlocal conditions // Lietuvos matematikos rinkinys. Ser. A. Vilnius : Vilniaus universiteto leidykla. ISSN 0132-2818. eISSN 2335-898X. 2014, t. 55, p. 22-27. DOI: 10.15388/LMR.A.2014.05. |
| 12 | Novickij, Jurij; Štikonas, Artūras. On the stability of a weighted finite difference scheme for wave equation with nonlocal boundary conditions // Nonlinear analysis : modelling and control. Vilnius : Institute of Mathematics and Informatics. ISSN 1392-5113. 2014, vol. 19, no. 3, p. 460-475. DOI: 10.15388/NA.2014.3.10. |
| 13 | Novickij, Jurij; Štikonas, Artūras. On the stability of a weighted difference scheme for hyperbolic equation with integral conditions // 18th international conference : mathematical modelling and analysis ( MMA2013 ) and fourth international conference : approximation methods and orthogonal expansions ( AMOE2013), May 27 - 30, 2013, Tartu, Estonia : abstracts. Tartu : University of Tartu. 2013, p. [1]. Prieiga per internetą: <http://www.ut.ee/mma-amoe2013/nmd3/abstraktid09876/Novickij.pdf> [žiūrėta 2013-06-17]. |
| 14 | Ivanauskas, Feliksas; Novickij, Jurij; Sapagovas, Mifodijus. On the stability of an explicit difference scheme for hyperbolic equations with nonlocal boundary conditions // Differential equations. MAIK Nauka - Interperiodica. ISSN 0012-2661. 2013, vol. 49, no. 7, p. 849-856. DOI: 10.1134/S0012266113070070. |
| 15 | Novickij, Jurij; Ivanauskas, Feliksas; Sapagovas, Mifodijus. On the stability of an explicit difference scheme for hyperbolic equation with integral conditions // Mathematical modelling and analysis : 17th international conference, June 6-9, 2012, Tallinn, Estonia : abstracts. Tallinn : Tallinn University of Technology, 2012. ISBN 9789949233069. p. [1]. |
| 16 | Novickij, Jurij; Ivanauskas, Feliksas. Parabolinio tipo lygčių su nelokaliomis kraštinėmis sąlygomis sprendinių kokybinė analizė = Qualitative analysis of solutions of parabolic type equations with nonlocal boundary conditions // Lietuvos matematikos rinkinys. LMD darbai. Vilnius : Matematikos ir informatikos institutas. ISSN 0132-2818. 2010, t. 51, p. 295-300. DOI: 10.15388/LMR.2010.54. |