Petru Jebelean

1.2k total citations
60 papers, 787 citations indexed

About

Petru Jebelean is a scholar working on Applied Mathematics, Computational Theory and Mathematics and Numerical Analysis. According to data from OpenAlex, Petru Jebelean has authored 60 papers receiving a total of 787 indexed citations (citations by other indexed papers that have themselves been cited), including 54 papers in Applied Mathematics, 34 papers in Computational Theory and Mathematics and 20 papers in Numerical Analysis. Recurrent topics in Petru Jebelean's work include Nonlinear Partial Differential Equations (43 papers), Nonlinear Differential Equations Analysis (34 papers) and Advanced Mathematical Modeling in Engineering (31 papers). Petru Jebelean is often cited by papers focused on Nonlinear Partial Differential Equations (43 papers), Nonlinear Differential Equations Analysis (34 papers) and Advanced Mathematical Modeling in Engineering (31 papers). Petru Jebelean collaborates with scholars based in Romania, Belgium and Italy. Petru Jebelean's co-authors include Cristian Bereanu, Jean Mawhin, Pedro J. Torres, Radu Precup, Gabriele Bonanno, Constantin Popa, Dumitru Motreanu, Juan J. Nieto, Νικόλαος Παπαγεωργίου and Eduardo Liz and has published in prestigious journals such as Journal of Mathematical Analysis and Applications, Applied Mathematics and Computation and Journal of Differential Equations.

In The Last Decade

Petru Jebelean

54 papers receiving 701 citations

Peers — A (Enhanced Table)

Peers by citation overlap · career bar shows stage (early→late) cites · hero ref

Name h Career Trend Papers Cites
Petru Jebelean Romania 16 755 437 167 166 52 60 787
Atsushi Tachikawa Japan 13 646 0.9× 515 1.2× 250 1.5× 55 0.3× 51 1.0× 38 706
Addolorata Salvatore Italy 12 417 0.6× 241 0.6× 137 0.8× 73 0.4× 32 0.6× 62 461
Franco Obersnel Italy 13 504 0.7× 343 0.8× 100 0.6× 90 0.5× 48 0.9× 28 533
David Arcoya Spain 22 1.1k 1.5× 950 2.2× 402 2.4× 141 0.8× 33 0.6× 66 1.2k
Juan R. Esteban Spain 5 289 0.4× 231 0.5× 109 0.7× 71 0.4× 31 0.6× 8 354
Juan Ferrera Spain 10 193 0.3× 160 0.4× 121 0.7× 64 0.4× 86 1.7× 26 333
Roberta Musina Italy 13 613 0.8× 451 1.0× 263 1.6× 50 0.3× 31 0.6× 57 667
Achilles Tertikas Greece 17 884 1.2× 449 1.0× 446 2.7× 32 0.2× 69 1.3× 38 960
Daniele Bartolucci Italy 13 477 0.6× 332 0.8× 299 1.8× 29 0.2× 61 1.2× 43 560
Peihao Zhao China 12 394 0.5× 316 0.7× 109 0.7× 66 0.4× 32 0.6× 58 482

Countries citing papers authored by Petru Jebelean

Since Specialization
Citations

This map shows the geographic impact of Petru Jebelean's research. It shows the number of citations coming from papers published by authors working in each country. You can also color the map by specialization and compare the number of citations received by Petru Jebelean with the expected number of citations based on a country's size and research output (numbers larger than one mean the country cites Petru Jebelean more than expected).

Fields of papers citing papers by Petru Jebelean

Since Specialization
Physical SciencesHealth SciencesLife SciencesSocial Sciences

This network shows the impact of papers produced by Petru Jebelean. Nodes represent research fields, and links connect fields that are likely to share authors. Colored nodes show fields that tend to cite the papers produced by Petru Jebelean. The network helps show where Petru Jebelean may publish in the future.

Co-authorship network of co-authors of Petru Jebelean

This figure shows the co-authorship network connecting the top 25 collaborators of Petru Jebelean. A scholar is included among the top collaborators of Petru Jebelean based on the total number of citations received by their joint publications. Widths of edges represent the number of papers authors have co-authored together. Node borders signify the number of papers an author published with Petru Jebelean. Petru Jebelean is excluded from the visualization to improve readability, since they are connected to all nodes in the network.

All Works

20 of 20 papers shown
1.
Cabada, Alberto, et al.. (2023). Dirichlet systems with discrete relativistic operator. Bulletin of the London Mathematical Society. 56(3). 1149–1168.
2.
Bella, Beatrice Di, et al.. (2023). Multiple solutions for a class of p-biharmonic problems with potential boundary conditions. Nonlinear Analysis Real World Applications. 76. 104012–104012.
3.
Jebelean, Petru, et al.. (2020). Multiple critical orbits to partial periodic perturbations of the p-relativistic operator. Applied Mathematics Letters. 104. 106220–106220. 4 indexed citations
4.
Bella, Beatrice Di, et al.. (2019). A four-point boundary value problem with singular $$\phi $$-Laplacian. Journal of Fixed Point Theory and Applications. 21(2). 3 indexed citations
5.
Jebelean, Petru, et al.. (2018). Positive radial solutions for multiparameter Dirichlet systems with mean curvature operator in Minkowski space and Lane–Emden type nonlinearities. Journal of Differential Equations. 266(9). 5377–5396. 9 indexed citations
6.
Jebelean, Petru, et al.. (2017). Fisher-Kolmogorov type perturbations of the relativistic operator: differential vs. difference. Proceedings of the American Mathematical Society. 146(5). 2005–2014. 6 indexed citations
7.
Jebelean, Petru, et al.. (2017). Nontrivial Solutions for Potential Systems Involving the Mean Curvature Operator in Minkowski Space. Advanced Nonlinear Studies. 17(4). 769–780. 6 indexed citations
8.
Bonanno, Gabriele, et al.. (2015). Superlinear discrete problems. Applied Mathematics Letters. 52. 162–168. 25 indexed citations
9.
Jebelean, Petru, et al.. (2015). Boundary value problems for discontinuous perturbations of singular ϕ-Laplacian operator. Journal of Mathematical Analysis and Applications. 431(1). 662–681. 9 indexed citations
10.
Jebelean, Petru, et al.. (2015). Periodic solutions for discontinuous perturbations of the relativistic operator. Bulletin des Sciences Mathématiques. 140(1). 99–117. 8 indexed citations
11.
Bereanu, Cristian, Petru Jebelean, & Jean Mawhin. (2014). The Dirichlet Problem with Mean Curvature Operator in Minkowski Space – a Variational Approach. Advanced Nonlinear Studies. 14(2). 315–326. 29 indexed citations
12.
Bereanu, Cristian, Petru Jebelean, & Pedro J. Torres. (2013). Multiple positive radial solutions for a Dirichlet problem involving the mean curvature operator in Minkowski space. Journal of Functional Analysis. 265(4). 644–659. 73 indexed citations
13.
Bereanu, Cristian, Petru Jebelean, & Pedro J. Torres. (2012). Positive radial solutions for Dirichlet problems with mean curvature operators in Minkowski space. Journal of Functional Analysis. 264(1). 270–287. 77 indexed citations
14.
Jebelean, Petru & Nikolaos S. Papageorgiou. (2011). On noncoercive periodic systems with vector $p$-Laplacian. Topological Methods in Nonlinear Analysis. 38(2). 249–263. 1 indexed citations
15.
Bereanu, Cristian, Petru Jebelean, & Jean Mawhin. (2011). Multiple solutions for Neumann and periodic problems with singular ϕ-Laplacian. Journal of Functional Analysis. 261(11). 3226–3246. 22 indexed citations
16.
Jebelean, Petru & Radu Precup. (2009). Solvability ofp,q-Laplacian systems with potential boundary conditions. Applicable Analysis. 89(2). 221–228. 14 indexed citations
17.
Bereanu, Cristian, Petru Jebelean, & Jean Mawhin. (2008). Non-homogeneous Boundary Value Problems for Ordinary and Partial Differential Equations Involving Singular ϕ-Laplacians. Matemática Contemporânea. 36(4).
18.
Bereanu, Cristian, Petru Jebelean, & Jean Mawhin. (2008). Radial solutions for some nonlinear problems involving mean curvature operators in Euclidean and Minkowski spaces. Proceedings of the American Mathematical Society. 137(1). 161–169. 61 indexed citations
19.
Jebelean, Petru, et al.. (2005). Ordinary p-Laplacian systems with nonlinear boundary conditions. Journal of Mathematical Analysis and Applications. 313(2). 738–753. 16 indexed citations
20.
Jebelean, Petru & Jean Mawhin. (2002). Periodic Solutions of Singular Nonlinear Perturbations of the Ordinary p-Laplacian. Advanced Nonlinear Studies. 2(3). 299–312. 28 indexed citations

Rankless uses publication and citation data sourced from OpenAlex, an open and comprehensive bibliographic database. While OpenAlex provides broad and valuable coverage of the global research landscape, it—like all bibliographic datasets—has inherent limitations. These include incomplete records, variations in author disambiguation, differences in journal indexing, and delays in data updates. As a result, some metrics and network relationships displayed in Rankless may not fully capture the entirety of a scholar's output or impact.

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