level-one heading

Kolabtreeを選ぶ理由
開始はすばやく簡単です。初期費用はかかりません。
サービス依頼と専門家への見積依頼は無料です。
Kolabtree の作業範囲に同意する前に、専門家と要件を詳しく相談できます。
専門家と直接連携し、必要な成果を正しく得られます。
専門家を採用したらプロジェクトに資金を入れ、作業完了後に成果物を承認できます。
この専門家をプロジェクトに採用したいですか? 見積もりを依頼 無料で。
プロフィール詳細
プロジェクトを作成
★★★★★
☆☆☆☆☆
Vuk S.に依頼
Serbia

Communicative strong researcher in mathematics, with specialization in mathematical analysis, operator theory.

プロフィール概要
専門分野
サービス
Research Scientific and Technical Research
職務経験

Technical associate

Matematicki institut SANU

6月 2025 - 現在

Nastavnik analize sa algebrom

Matematicka gimnazija Beograd

1月 2024 - 5月 2025

学歴

M.sc in mathematics

University of Novi Sad

10月 2023 - 8月 2026

認定資格
  • 認定資格の詳細は未入力です。
出版物
JOURNAL ARTICLE
Fuad Kittaneh, Vuk Stojiljković (2026). New generalized numerical radius inequalities for Hilbert space operators . Journal of Inequalities and Applications.
Stojiljkovic, Vuk, Kittaneh, Fuad (2026). Further generalized numerical radius inequalities for Hilbert space operators . Linear and Multilinear Algebra.
Fuad Kittaneh, Vuk Stojiljković (2025). Various numerical radius inequalities concerning the refined Cauchy-Schwarz inequality . Bulletin of the Malaysian Mathematical Sciences Society.
Stojiljkovic, Vuk, Gurdal, Mehmet (2025). Estimates of the numerical radius utilizing various function properties . Turkish Journal of Mathematics.
STOJILJKOVIĆ, V., GÜRDAL, M.(2025). Estimates of the numerical radius utilizing various function properties . Turkish Journal of Mathematics. 49. (1). Microsoft.AspNetCore.Mvc.Localization.LocalizedHtmlString 48-64.
(2025). Generalized Singular Value Inequalities for Matrices . MATHEMATICAL METHODS IN THE APPLIED SCIENCES.
Stojiljkovic, Vuk, Kittaneh, Fuad (2025). Generalized Singular Value Inequalities for Matrices . Mathematical Methods in the Applied Sciences.
Stojiljkovic, Vuk, Basaran, Hamdullah, Gurdal, Mehmet (2025). On<i> q</i>-Berezin number inequalities in reproducing kernel Hilbert space . Filomat.
(2025). Various numerical radius inequalities concerning the refined Cauchy-Schwarz inequality . BULLETIN OF THE MALAYSIAN MATHEMATICAL SCIENCES SOCIETY.
Stojiljkovic, Vuk, Mirkov, Nikola, Fabiano, Nicola, Nikezic, Dusan, Ilic, Milica (2025). Symmetries of Bernstein Polynomial Differentiation Matrices and Applications to Initial Value Problems . Symmetry.
Mirkov, N., Fabiano, N., Nikezić, D., Ilić, M., Stojiljković, V.(2025). Symmetries of Bernstein Polynomial Differentiation Matrices and Applications to Initial Value Problems . Symmetry. 17. (1).
Nikola Mirkov, Nicola Fabiano, Dušan Nikezić, Vuk Stojiljković, Milica Ilić (2024). Symmetries of Bernstein Polynomial Differentiation Matrices and Applications to Initial Value Problems . Symmetry.
Nikola Mirkov, Nicola Fabiano, Dušan Nikezić, Vuk Stojiljković, Milica Ilić (2024). Symmetries of Bernstein Polynomial Differentiation Matrices and Applications to Initial Value Problems . Symmetry.
M. Gurdal, V. Stojiljkovic (2024). Some inequality and Berezin number type inequalities . Journal of Nonlinear Sciences and Applications.
Vuk Stojiljkovic, Mehmet G&#252;rdal (2024). Berezin radius inequalities for finite sums of functional Hilbert space operators . Gulf Journal of Mathematics.
UNIVERSITY OF NOVI SAD TRG DOSITEJA OBRADOVIĆA 3, 21000 NOVI SAD, SERBIA, VUK STOJILJKOVIĆ (2024). Simpson Type Tensorial Norm Inequalities for Continuous Functions of Selfadjoint Operators in Hilbert Spaces . Creative Mathematics and Informatics.
Mehmet G&#252;rdal, Vuk Stojiljković, N. (2024). Berezin inequalities for sums of operators and classical inequalities concerning the Berezin radius . Vojnotehnicki glasnik.
G&#252;rdal, M., Stojiljković, V.N.(2024). Berezin inequalities for sums of operators and classical inequalities concerning the Berezin radius,Desigualdades de Berezin para sumas de operadores y desigualdades clásicas relativas al radio de Berezin . Military Technical Courier Vojnotehnicki Glasnik. 72. (4). Microsoft.AspNetCore.Mvc.Localization.LocalizedHtmlString 1537-1551.
Stojiljković, V.(2024). Simpson Type Tensorial Norm Inequalities for Continuous Functions of Selfadjoint Operators in Hilbert Spaces . Creative Mathematics and Informatics. 33. (1). Microsoft.AspNetCore.Mvc.Localization.LocalizedHtmlString 105-117.
G&#252;rdal, M., Stojiljković, V.(2024). BEREZIN RADIUS INEQUALITIES FOR FINITE SUMS OF FUNCTIONAL HILBERT SPACE OPERATORS . Gulf Journal of Mathematics. 17. (1). Microsoft.AspNetCore.Mvc.Localization.LocalizedHtmlString 101-109.
Stojiljković, V.(2024). Simpson type Tensorial Inequalities for Continuous functions of Selfadjoint operators in Hilbert Spaces . Palestine Journal of Mathematics. 13. (2). Microsoft.AspNetCore.Mvc.Localization.LocalizedHtmlString 41-50.
Vuk Stojiljkovic (2023). Twice Differentiable Ostrowski Type Tensorial Norm Inequality for Continuous Functions of Selfadjoint Operators in Hilbert Spaces . Electronic Journal of Mathematical Analysis and Applications.
Vuk Stojiljković, Rajagopalan Ramaswamy, Ola A. Ashour Abdelnaby, Stojan Radenović (2023). Some Refinements of the Tensorial Inequalities in Hilbert Spaces . Symmetry.
Vuk Stojiljković, Rajagopalan Ramaswamy, Ola A. Ashour Abdelnaby, Stojan Radenović (2023). Some Refinements of the Tensorial Inequalities in Hilbert Spaces . Symmetry.
Stojiljković, V., Ramaswamy, R., Abdelnaby, O.A.A., Radenović, S.(2023). Some Refinements of the Tensorial Inequalities in Hilbert Spaces . Symmetry. 15. (4).
Stojiljkovic, Vuk, Ramaswamy, Rajagopalan, Abdelnaby, Ola A. Ashour, Radenovic, Stojan (2023). Some Refinements of the Tensorial Inequalities in Hilbert Spaces . Symmetry.
Stojiljković, V.(2023). Twice Differentiable Ostrowski Type Tensorial Norm Inequalities for Continuous Functions of Selfadjoint Operators in Hilbert Spaces . European Journal of Pure and Applied Mathematics. 16. (3). Microsoft.AspNetCore.Mvc.Localization.LocalizedHtmlString 1421-1433.
Stojiljkovic, Vuk, Mani, Gunaseelan, Ramaswamy, Rajagopalan, Gnanaprakasam, Arul Joseph, Fadail, Zaid. M., Radenovic, Stojan (2023). Application of fixed point results in the setting of <i>F</i>-contraction and simulation function in the setting of bipolar metric space . AIMS Mathematics.
Mani, G., Ramaswamy, R., Gnanaprakasam, A.J., Stojiljković, V., Fadail, Z.M., Radenović, S.(2023). Application of fixed point results in the setting of F-contraction and simulation function in the setting of bipolar metric space . AIMS Mathematics. 8. (2). Microsoft.AspNetCore.Mvc.Localization.LocalizedHtmlString 3269-3285.
Mani, G., Ramaswamy, R., Gnanaprakasam, A.J., Stojiljković, V., Fadail, Z.M., Radenović, S.(2023). Correction to: Application of fixed point results in the setting of F-contraction and simulation function in the setting of bipolar metric space (AIMS Mathematics, 2023, 8(2): 3269–3285 10.3934/math.2023168) . AIMS Mathematics. 8. (5). Microsoft.AspNetCore.Mvc.Localization.LocalizedHtmlString 10395-10396.
Stojiljkovic, Vuk, Mani, Gunaseelan, Ramaswamy, Rajagopalan, Gnanaprakasam, Arul Joseph, Fadail, Zaid. M., Radenovic, Stojan (2023). Application of fixed point results in the setting of <i>F</i>-contraction and simulation function in the setting of bipolar metric space (vol 8, pg 3269, 2023) . AIMS Mathematics.
Stojiljković, V., Dragomir, S.S.(2023). DIFFERENTIABLE OSTROWSKI TYPE TENSORIAL NORM INEQUALITY FOR CONTINUOUS FUNCTIONS OF SELFADJOINT OPERATORS IN HILBERT SPACES . Gulf Journal of Mathematics. 15. (2). Microsoft.AspNetCore.Mvc.Localization.LocalizedHtmlString 40-55.
Stojiljkovic, Vuk (2023). Hermite Hadamard Type Inequalities Involving (k-p) Fractional Operator with (alpha, h - m) - p convexity . European Journal of Pure and Applied Mathematics.
Stojiljković, V.(2023). Hermite Hadamard Type Inequalities Involving (k-p) Fractional Operator with (α, h - m) - p convexity . European Journal of Pure and Applied Mathematics. 16. (1). Microsoft.AspNetCore.Mvc.Localization.LocalizedHtmlString 503-522.
Stojiljkovic, Vuk, Guzman, Paulo M., Valdes, Juan E. Naples (2023). New extensions of the Hermite-Hadamard inequality . Contributions to Mathematics.
(2023). New extensions of the Hermite-Hadamard inequality . CONTRIBUTIONS TO MATHEMATICS.
Stojiljković, V.(2023). REFINEMENTS AND VARIATIONS OF THE TENSORIAL TRAPEZOID INEQUALITIES FOR CONVEX FUNCTIONS OF SELFADJOINT OPERATORS IN HILBERT SPACES . Turkish Journal of Inequalities. 7. (2). Microsoft.AspNetCore.Mvc.Localization.LocalizedHtmlString 29-38.
Stojiljkovi, V.(2023). SERIES INVOLVING DIRICHLET ETA FUNCTION . Gulf Journal of Mathematics. 15. (1). Microsoft.AspNetCore.Mvc.Localization.LocalizedHtmlString 67-83.
Vuk Stojiljković, Rajagopalan Ramaswamy, Ola A. Ashour Abdelnaby, Stojan Radenović (2022). Some Novel Inequalities for LR-(k,h-m)-p Convex Interval Valued Functions by Means of Pseudo Order Relation . Fractal and Fractional.
Vuk Stojiljković, Rajagopalan Ramaswamy, Ola A. Ashour Abdelnaby, Stojan Radenović (2022). Some Novel Inequalities for LR-(k,h-m)-p Convex Interval Valued Functions by Means of Pseudo Order Relation . Fractal and Fractional.
Vuk Stojiljkovic (2022). A New conformable fractional derivative and applications . Selecciones Matemáticas.
Rajagopalan Ramaswamy, Gunaseelan Mani, Arul Joseph Gnanaprakasam, Ola A. Ashour Abdelnaby, Vuk Stojiljković, Slobodan Radojevic, Stojan Radenović (2022). Fixed Points on Covariant and Contravariant Maps with an Application . Mathematics.
Vuk Stojiljković, Rajagopalan Ramaswamy, Ola A. Ashour Abdelnaby, Stojan Radenović (2022). Riemann-Liouville Fractional Inclusions for Convex Functions Using Interval Valued Setting . Mathematics.
Vuk Stojiljkovi{\'{c}} and Rajagopalan Ramaswamy and Fahad Alshammari and Ola A. Ashour and Mohammed Lahy Hassan Alghazwani and Stojan Radenovi{\'{c}}(2022). Hermite–Hadamard Type Inequalities Involving (k-p) Fractional Operator for Various Types of Convex Functions . Fractal and Fractional. 6. (7). Microsoft.AspNetCore.Mvc.Localization.LocalizedHtmlString 376. {MDPI} {AG}
Vuk Stojiljković, Rajagopalan Ramaswamy, Fahad Alshammari, Ola A. Ashour, Mohammed Lahy Hassan Alghazwani, Stojan Radenović(2022). Hermite–Hadamard Type Inequalities Involving (k-p) Fractional Operator for Various Types of Convex Functions . Fractal and Fractional. 6. (7). Microsoft.AspNetCore.Mvc.Localization.LocalizedHtmlString 376. {MDPI} {AG}
Vuk Stojiljković, Rajagopalan Ramaswamy, Fahad Alshammari, Ola A. Ashour, Mohammed Lahy Hassan Alghazwani, Stojan Radenović (2022). Hermite–Hadamard Type Inequalities Involving (<i>k-p</i>) Fractional Operator for Various Types of Convex Functions . Fractal and Fractional.
Vuk Stojiljković, Slobodan Radojević, Ey&#252;p &#199;etin, Vesna Šešum Čavić, Stojan Radenović (2022). Sharp Bounds for Trigonometric and Hyperbolic Functions with Application to Fractional Calculus . Symmetry.
Vuk Stojiljković, Slobodan Radojević, Ey&#252;p &#199;etin, Vesna Šešum Čavić, Stojan Radenović (2022). Sharp Bounds for Trigonometric and Hyperbolic Functions with Application to Fractional Calculus . Symmetry.
Vuk Stojiljkovic (2022). Various Series Concerning the Zeta Function . International Journal of Emerging Multidisciplinaries: Mathematics.
Vuk Stojiljkovic(2022). Generalized order n fractional integrals . Innovative Journal of Mathematics (IJM). 1. (2). Microsoft.AspNetCore.Mvc.Localization.LocalizedHtmlString 71--81. Sigmawings Publishing Company
Vuk Stojiljković, Nicola Fabiano, Mirjana Pantović, Slobodan Radojević, Stojan Radenović, Vesna Šešum Ćavić(2022). Various Series Related to the Polylogarithmic Function . Axioms. 11. (4). Microsoft.AspNetCore.Mvc.Localization.LocalizedHtmlString 174. {MDPI} {AG}
Vuk Stojiljković, Nicola Fabiano, Mirjana Pantović, Slobodan Radojević, Stojan Radenović, Vesna Šešum Ćavić (2022). Various Series Related to the Polylogarithmic Function . Axioms.
Stojiljkovic, Vuk(2022). Some Series Associated with Central Binomial Coefficients and Harmonic Numbers . Octogon Mathematical Magazine. figshare
Vuk Stojiljkovi{\'{c}} and Nicola Fabiano and Vesna {\v{S}}e{\v{s}}um-{\v{C}}avi{\'{c}}(2022). Harmonic series with polylogarithmic functions . Vojnotehnicki glasnik. 70. (1). Microsoft.AspNetCore.Mvc.Localization.LocalizedHtmlString 43--61. Centre for Evaluation in Education and Science ({CEON}/{CEES})
Vuk Stojiljković, N. (2022). New combinatorial proof of the multiple binomial coefficient identity . Vojnotehnicki glasnik.
Stojiljkovic, Vuk, Ramaswamy, Rajagopalan, Abdelnaby, Ola A. Ashour, Radenovic, Stojan (2022). Riemann-Liouville Fractional Inclusions for Convex Functions Using Interval Valued Setting . Mathematics.
Stojiljković, V., Ramaswamy, R., Ashour Abdelnaby, O.A., Radenović, S.(2022). Riemann-Liouville Fractional Inclusions for Convex Functions Using Interval Valued Setting . Mathematics. 10. (19).
Stojiljkovic, Vuk, Ramaswamy, Rajagopalan, Mani, Gunaseelan, Gnanaprakasam, Arul Joseph, Abdelnaby, Ola A. Ashour, Radojevic, Slobodan, Radenovic, Stojan (2022). Fixed Points on Covariant and Contravariant Maps with an Application . Mathematics.
Ramaswamy, R., Mani, G., Gnanaprakasam, A.J., Abdelnaby, O.A.A., Stojiljković, V., Radojevic, S., Radenović, S.(2022). Fixed Points on Covariant and Contravariant Maps with an Application . Mathematics. 10. (22).
Vuk Stojiljković, Nicola Fabiano, Vesna Šešum-Čavić (2022). Harmonic series with polylogarithmic functions . Vojnotehnicki glasnik.
Stojiljkovic, Vuk, Ramaswamy, Rajagopalan, Alshammari, Fahad, Ashour, Ola A., Alghazwani, Mohammed Lahy Hassan, Radenovic, Stojan (2022). Hermite-Hadamard Type Inequalities Involving (<i>k-p</i>) Fractional Operator for Various Types of Convex Functions . Fractal and Fractional.
Stojiljković, V., Ramaswamy, R., Alshammari, F., Ashour, O.A., Alghazwani, M.L.H., Radenović, S.(2022). Hermite–Hadamard Type Inequalities Involving (k-p) Fractional Operator for Various Types of Convex Functions . Fractal and Fractional. 6. (7).
Stojiljković, V., Fabiano, N., Pantović, M., Radojević, S., Radenović, S., Ćavić, V.Š.(2022). Various Series Related to the Polylogarithmic Function . Axioms. 11. (4).
Stojiljkovic, Vuk, Ramaswamy, Rajagopalan, Abdelnaby, Ola A. Ashour, Radenovic, Stojan (2022). Some Novel Inequalities for LR-(k,h-m)-p Convex Interval Valued Functions by Means of Pseudo Order Relation . Fractal and Fractional.
Stojiljković, V., Ramaswamy, R., Abdelnaby, O.A.A., Radenović, S.(2022). Some Novel Inequalities for LR-(k,h-m)-p Convex Interval Valued Functions by Means of Pseudo Order Relation . Fractal and Fractional. 6. (12).
Stojiljković, V., Radojević, S., &#199;etin, E., Čavić, V.Š., Radenović, S.(2022). Sharp Bounds for Trigonometric and Hyperbolic Functions with Application to Fractional Calculus . Symmetry. 14. (6).
(2021). Some central binomial coefficient sums . Romanian Mathematical Magazine.