ESAIM: Mathematical Modelling and Numerical Analysis
Published by EDP Sciences
ISSN : 2822-7840 eISSN : 2804-7214
Abbreviation : ESAIM Math. Model. Numer. Anal.
Aims & Scope
M2AN publishes original research papers of high scientific quality in two areas: Mathematical Modelling, and Numerical Analysis.
Mathematical Modelling comprises the development and study of a mathematical formulation of a problem.
Numerical Analysis comprises the formulation and study of a numerical approximation or solution approach to a mathematically formulated problem.
Papers should be of interest to researchers and practitioners that value both rigorous theoretical analysis and solid evidence of computational relevance.
View Aims & ScopeMetrics & Ranking
Impact Factor
| Year | Value |
|---|---|
| 2025 | 2.2 |
| 2024 | 2.10 |
Journal Rank
| Year | Value |
|---|---|
| 2024 | 3470 |
Journal Citation Indicator
| Year | Value |
|---|---|
| 2024 | 620 |
SJR (SCImago Journal Rank)
| Year | Value |
|---|---|
| 2024 | 1.217 |
Quartile
| Year | Value |
|---|---|
| 2024 | Q1 |
h-index
| Year | Value |
|---|---|
| 2024 | 85 |
Impact Factor Trend
Abstracting & Indexing
Journal is indexed in leading academic databases, ensuring global visibility and accessibility of our peer-reviewed research.
Subjects & Keywords
Journal’s research areas, covering key disciplines and specialized sub-topics in Mathematics, designed to support cutting-edge academic discovery.
Licensing & Copyright
This journal operates under an Open Access model. Articles are freely accessible to the public immediately upon publication. The content is licensed under a Creative Commons Attribution 4.0 International License (CC BY 4.0), allowing users to share and adapt the work with proper attribution.
Copyright remains with the author(s), and no permission is required for non-commercial use, provided the original source is cited.
Most Cited Articles
The Most Cited Articles section features the journal's most impactful research, based on citation counts. These articles have been referenced frequently by other researchers, indicating their significant contribution to their respective fields.
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Optimal error estimates of a Crank–Nicolson finite element projection method for magnetohydrodynamic equations
Citation: 50
Authors: Cheng, Jilu, Zeyu, Liwei
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Rank-adaptive structure-preserving model order reduction of Hamiltonian systems
Citation: 28
Authors: Jan S., Cecilia, Nicolò
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Positivity-preserving methods for ordinary differential equations
Citation: 21
Authors: Sergio, Arieh, Shev
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A fully-decoupled discontinuous Galerkin approximation of the Cahn–Hilliard–Brinkman–Ohta–Kawasaki tumor growth model
Citation: 21
Authors: Guang-an, Bo, Xiaofeng
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A robust collision source method for rank adaptive dynamical low-rank approximation in radiation therapy
Citation: 21
Authors: Jonas, Pia
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Driving bifurcating parametrized nonlinear PDEs by optimal control strategies: application to Navier–Stokes equations with model order reduction
Citation: 20
Authors: Federico, Maria, Francesco, Gianluigi
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An ultraweak space-time variational formulation for the wave equation: Analysis and efficient numerical solution
Citation: 20
Authors: Julian, Davide, Valeria, Karsten
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Energy-adaptive Riemannian optimization on the Stiefel manifold
Citation: 17
Authors: Robert, Daniel, Tatjana
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On Lyapunov stability of positive and conservative time integrators and application to second order modified Patankar–Runge–Kutta schemes
Citation: 16
Authors: Thomas, Stefan, Andreas