2026 Jean-Paul Penot: Mathematics Researcher – H-Index, Publications & Awards

Discipline name	D-Index	World Ranking	Current World Ranking	National Ranking	Current National Ranking	Publications	Citations
Mathematics	36	2625	2342	157	148	217	6055

Discipline name

D-Index

World Ranking

Current World Ranking

National Ranking

Current National Ranking

Publications

Citations

Mathematics

2625

2342

157

148

217

6055

Overview

Jean-Paul Penot is affiliated with the Centre national de la recherche scientifique (CNRS) in France. Their research spans across the fields of mathematics and computer science, emphasizing several specialized subfields.

The main fields of study for this researcher include:

Mathematics
Computer Science

The subfields of study are:

Computational Theory and Mathematics
Applied Mathematics
Numerical Analysis
Mathematical Physics

Key topics covered in their work are:

Optimization and Variational Analysis
Advanced Optimization Algorithms Research
Point Processes and Geometric Inequalities
Geometric Analysis and Curvature Flows
Numerical Methods in Inverse Problems

Jean-Paul Penot has contributed to multiple publication venues, highlighting an interdisciplinary approach within applied and theoretical mathematics:

Set-Valued and Variational Analysis
SIAM Journal on Optimization
Applied Mathematics & Optimization

Their recent published papers include:

What is a Lipschitzian Manifold? (2022) - Set-Valued and Variational Analysis
The Semiconvex Regularization of Functions (2023) - SIAM Journal on Optimization
Analysis of Subdifferentials of Marginal and Performance Functions (2025) - Applied Mathematics & Optimization

Collaborations with coauthors have been documented, indicating active engagement in joint research efforts. Frequent coauthors include:

Van Huynh Ngai
Duong Thi Viet An

The research focus, as evidenced by the papers and topics, is mainly on advanced optimization methods and variational principles, often incorporating computational and numerical techniques.

Best Publications

Metric regularity, openness and Lipschitzian behavior of multifunctions

Jean-Paul Penot

218
Citations
On Quasi-Convex Duality

Jean-Paul Penot;Michel Volle

191
Citations
Second-Order Conditions for Optimization Problems with Constraints

Unknown

182
Citations
A generalized derivative for calm and stable functions

Philippe Michel;Jean Paul Penot;H. Brezis

172
Citations
The drop theorem,the petal theorem and Ekeland's variational principle

J P Penot

157
Citations
On regularity conditions in mathematical programming

Jean-Paul Penot

154
Citations
Differentiability of Relations and Differential Stability of Perturbed Optimization Problems

Unknown

144
Citations
Calcul sous-differentiel et optimisation

Unknown

139
Citations
The relevance of convex analysis for the study of monotonicity

Jean-Paul Penot

136
Citations
Operations on convergent families of sets and functions

D. Azé;J.P. Penot

119
Citations
What is quasiconvex analysis

Jean-Paul Penot

118
Citations
Optimality conditions in mathematical programming and composite optimization

Jean-Paul Penot

112
Citations
Semi-continuous mappings in general topology

Unknown

104
Citations
Generalized Convexity of Functions and Generalized Monotonicity of Set-Valued Maps

Unknown

100
Citations
A characterization of tangential regularity

Jean Paul Penot

98
Citations
Convergence of asymptotic directions

Jean-Paul Penot

94
Citations
SUBDIFFERENTIALS OF PERFORMANCE FUNCTIONS AND CALCULUS OF CODERIVATIVES OF SET-VALUED MAPPINGS

Alexander D. Ioffe;Jean-Paul Penot

93
Citations
Metrically well-set minimization problems

Ewa Bednarczuk;Jean-Paul Penot

90
Citations
Fixed point theorems without convexity

Jean-Paul Penot

83
Citations
Partial Differential Equations

Unknown

82
Citations
Compact nets, filters, and relations

Jean-Paul Penot

78
Citations
Parametrized multicriteria optimization: Continuity and closedness of optimal multifunctions

Jean-Paul Penot;Alicja Sterna-Karwat

75
Citations
Some problems about the representation of monotone operators by convex functions

J.-P. Penot;C. Zalinescu

75
Citations
Uniformly convex and uniformly smooth convex functions

Dominique Azé;Jean-Paul Penot

75
Citations
Compactness Properties, Openness Criteria and Coderivatives

Jean-Paul Penot

68
Citations
Are Generalized Derivatives Sseful for Generalized Convex Functions

Jean-Paul Penot

64
Citations
Journal of Convex Analysis

G Buttazzo;L Thibault;R J B Wets;H Attouch

61
Citations

Frequent Co-Authors

Philippe Michel École Polytechnique Fédérale de Lausanne

Roberto Cominetti Adolfo Ibáñez University

External Links

Personal website of Jean-Paul Penot

If you think any of the details on this page are incorrect, let us know.

Related Online Degrees & Career Pathways

For students pursuing Mathematics in the USA, there are several related online degrees that complement this field and offer diverse career pathways. Many professionals consider advancing their skills with an easiest mba to get into as a practical option. These MBA programs often emphasize flexible admission criteria, making them accessible for individuals balancing work and study.

Similarly, an easiest online mba program can provide online convenience, allowing students to sharpen leadership and management skills while focusing on quantitative analysis.

For those interested in specialized business research skills, the best 1 year dba program online offers an accelerated pathway to a Doctorate in Business Administration, blending data-driven decision-making with practical expertise.

Finance is another closely related area where a strong mathematical background is a major advantage. Exploring the cheapest online masters in finance can open doors to careers in financial analysis, risk management, and investment banking, balancing cost with quality education.