Дејан Ћебић
Скуп објеката
- Адреса електронске поште
- dejan.cebic@rgf.bg.ac.rs
- Установа запослења
- РГФ
- Одсек запослења
- Катедре и кабинети општих предмета
- Катедра запослења
- Катедра за примењену математику и информатику
Објекат
16 items
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A Variant of Sharma-Aroras Optimal Eighth-Order Family of Methods for Finding A Simple Root of Nonlinear Equation,
Ćebić Dejan, Paunović Marija, Ralević Nebojša. "A Variant of Sharma-Aroras Optimal Eighth-Order Family of Methods for Finding A Simple Root of Nonlinear Equation," in IEEE 16th International Symposium on Intelligent Systems and Informatics (SISY) (2018): 81-96. https://doi.org/ 10.1109/SISY.2018.8524857 M33
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The third order mean-based Jarratt-type method for finding simple roots of nonlinear equation
Ralević Nebojša, Ćebić Dejan, Pavkov Ivan. "The third order mean-based Jarratt-type method for finding simple roots of nonlinear equation" in IEEE 13th International Symposium on Intelligent Systems and Informatics (SISY) (2015): 123-126. https://doi.org/10.1109/SISY.2015.7325364 M33
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A variant of two-step optimal fourth-order iterative method for solving nonlinear equation
Ralević Nebojša, Ćebić Dejan (2014)Ralević Nebojša, Ćebić Dejan. "A variant of two-step optimal fourth-order iterative method for solving nonlinear equation" in IEEE 12th International Symposium on Intelligent Systems and Informatics (SISY) (2014): 149-153. https://doi.org/10.1109/SISY.2014.6923575 M33
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Тhe Properties of Modifications of Newton’s Method For Solving Nonlinear Equations
Ralević Nebojša, Ćebić Dejan (2013)Ralević Nebojša, Ćebić Dejan. "Тhe Properties of Modifications of Newton’s Method For Solving Nonlinear Equations" in IEEE 11th International Symposium on Intelligent Systems and Informatics (SISY) (2013): 341-345. https://doi.org/ 10.1109/SISY.2013.6662599 M33
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A variant of McDougall-Wotherspoon method for finding simple roots of nonlinear equations
Glišović Nataša, Ralević Nebojša, Ćebić Dejan. "A variant of McDougall-Wotherspoon method for finding simple roots of nonlinear equations" in Scientific Publications of the State University of Novi Pazar, Series A: Applied Mathematics, Informatics and Mechanics 10 no. 1 (2018): 55-61 M52
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A new optimal family of three-step methods for efficient finding of a simple root of a nonlinear equation
Ralević Nebojša, Ćebić Dejan (2016)Ralević Nebojša, Ćebić Dejan. "A new optimal family of three-step methods for efficient finding of a simple root of a nonlinear equation" in Mathematical Communications 21 (2016): 189-197 M23
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On the optimality of some multi-point methods for finding multiple roots of nonlinear equation
Ralević Nebojša, Ćebić Dejan (2016)Ralević Nebojša, Ćebić Dejan. "On the optimality of some multi-point methods for finding multiple roots of nonlinear equation" in Nonlinear Analysis: Modelling and Control 21 no. 1 (2016): 121-134 M22
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The external aggregation Newton's method for solving nonlinear equations and applications
Marija Paunović, Dejan Ćebić, Nebojša Ralević. "The external aggregation Newton's method for solving nonlinear equations and applications" in The University Thought - Publication in Natural Sciences, Centre for Evaluation in Education and Science (CEON/CEES) (2020). https://doi.org/10.5937/univtho10-24982 М53
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Mean-based iterative methods for finding multiple roots in nonlinear chemistry problems
Dejan Ćebić, Nebojša M. Ralević (2021)Dejan Ćebić, Nebojša M. Ralević. "Mean-based iterative methods for finding multiple roots in nonlinear chemistry problems" in Journal of Mathematical Chemistry, Springer Science and Business Media LLC (2021). https://doi.org/10.1007/s10910-021-01253-3 М22
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An optimal sixteenth order family of methods for solving nonlinear equations and their basins of attraction
Dejan Ćebić, Nebojša Ralević, Marina Marčeta. "An optimal sixteenth order family of methods for solving nonlinear equations and their basins of attraction" in Mathematical Communications (2020) М22
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An Efficient Class of Iterative Root-Finding Methods with Applications
Dejan Ćebić, Nebojša Ralević (2021)Dejan Ćebić, Nebojša Ralević. "An Efficient Class of Iterative Root-Finding Methods with Applications" in 2021 IEEE 19th International Symposium on Intelligent Systems and Informatics (SISY), IEEE (2021). https://doi.org/10.1109/SISY52375.2021.9582495 М33
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The Newton method for solving nonlinear equations based on aggregation operators
Nebojša M. Ralević, Dejan Ćebić (2019)Nebojša M. Ralević, Dejan Ćebić. "The Newton method for solving nonlinear equations based on aggregation operators" in XLVI International Symposium on Operational Research SYM-OP-IS, Kladovo, 15-18.9.2019, Универзитет у Београду (2019) М33
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The Inner Aggregation Newton’s Method for Solving Nonlinear Equations
Nebojša M. Ralević, Dejan Ćebić, Bratislav Iričanin. "The Inner Aggregation Newton’s Method for Solving Nonlinear Equations" in Scientific Publications of the State University of Novi Pazar, Ser. A: Appl. Math. Inform. and Mech (2022) М52
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An efficient class of optimal sixteenth-order root-finding methods and their basins of attraction
Dejan Ćebić, Nebojša M. Ralević (2022)Dejan Ćebić, Nebojša M. Ralević. "An efficient class of optimal sixteenth-order root-finding methods and their basins of attraction" in Journal of Mathematical Chemistry, Springer Science and Business Media LLC (2022). https://doi.org/10.1007/s10910-022-01371-6 М22
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A new optimal eighth-order family of multiple root finders
Dejan Ćebić, Nebojša M. Ralević (2022)Dejan Ćebić, Nebojša M. Ralević. "A new optimal eighth-order family of multiple root finders" in Journal of the Korean Mathematical Society (2022). https://doi.org/10.4134/JKMS.j210607 М23
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Pseudo-linear combination of fuzzy metrics
Nebojsa M. Ralević, Bratislav D. Iričanin, Dejan Ćebić. "Pseudo-linear combination of fuzzy metrics" in Publications de l’institut mathematique, Mathematical Institute of the Serbian Academy of Sciences and Arts (2024) М24