Asymptotic Analysis

Aims & Scope

The journal Asymptotic Analysis fulfills a twofold function.

It aims at publishing original mathematical results in the asymptotic theory of problems affected by the presence of small or large parameters on the one hand, and at giving specific indications of their possible applications to different fields of natural sciences on the other hand.

Asymptotic Analysis thus provides mathematicians with a concentrated source of newly acquired information which they may need in the analysis of asymptotic problems.

View Aims & Scope

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Metrics & Ranking

Impact Factor

Year	Value
2025	0.9
2024	1.10

SJR (SCImago Journal Rank)

Year	Value
2024	0.707

Quartile

Year	Value
2024	Q1

Journal Rank

Year	Value
2024	7995

Journal Citation Indicator

Year	Value
2024	264

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Abstracting & Indexing

Journal is indexed in leading academic databases, ensuring global visibility and accessibility of our peer-reviewed research.

• Scopus
• Google Scholar
• Web of Science

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Subjects & Keywords

Journal’s research areas, covering key disciplines and specialized sub-topics in Mathematics, designed to support cutting-edge academic discovery.

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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.

• Convergence of approximation schemes for fully nonlinear second order equations

  Citation: 578

  Authors: G., P.E.

• Contrôlabilite exacte et homogénéisation (I)

  Citation: 132

  Authors: J.-L.

• Homogenization of the stokes flow in a connected porous medium

  Citation: 125

  Authors: Grégoire

• Asymptotic analysis for two-dimensional elliptic eigenvalue problems with exponentially dominated nonlinearities

  Citation: 94

  Authors: Ken'ichi, Takashi

• Quantum hydrodynamics, Wigner transforms, the classical limit

  Citation: 89

  Authors: Ingenuin, Peter A.

• Regularity and integrability of 3D Euler and Navier–Stokes equations for rotating fluids

  Citation: 89

  Authors: A., A., B.

• Diffusion approximation of the linear semiconductor Boltzmann equation: analysis of boundary layers

  Citation: 78

  Authors: F.

• Dynamics of the nonclassical diffusion equations

  Citation: 77

  Authors: Chunyou, Meihua

• Dimension reduction in variational problems, asymptotic development in Γ-convergence and thin structures in elasticity

  Citation: 77

  Authors: G., S., D.

• Stability and decay for a class of nonlinear hyperbolic problems

  Citation: 71

  Authors: Enrike

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