About
Technology
Issues
FAQ
Search
Scientometrics
Impact Factor
Discipline Ranks
h
-index
g
-index
Articles
Citations
Article Citations
Citation Distribution
Overviews
Top Institutions
Top Schools
Top Authors
Prolific Authors
Top Articles
Citing Bodies
Top Citing Authors
Top Citing Institutions
Top Citing Schools
Top Citing Journals
Top Citing Disciplines
exaly
›
Journals
›
Mathematical Methods in the Applied Sciences
›
top-articles
Mathematical Methods in the Applied Sciences
2.2
(top 20%)
impact factor
8.1K
(top 2%)
papers
81.6K
(top 5%)
citations
85
(top 10%)
h
-index
2.2
(top 20%)
impact factor
10.9K
all documents
89.3K
doc citations
118
(top 10%)
g
-index
Top Articles
#
Title
Journal
Year
Citations
1
Vector potentials in three-dimensional non-smooth domains
Mathematical Methods in the Applied Sciences
1998
657
2
Artificial neural networking (ANN) analysis for heat and entropy generation in flow of non‐Newtonian fluid between two rotating disks
Mathematical Methods in the Applied Sciences
2023
379
3
Thin elastic and periodic plates
Mathematical Methods in the Applied Sciences
1984
277
4
On the boundary value problem of the biharmonic operator on domains with angular corners
Mathematical Methods in the Applied Sciences
1980
264
5
A study of fractional Lotka‐Volterra population model using Haar wavelet and Adams‐Bashforth‐Moulton methods
Mathematical Methods in the Applied Sciences
2020
254
6
Existence and uniform decay for a non-linear viscoelastic equation with strong damping
Mathematical Methods in the Applied Sciences
2001
242
7
Does a ‘volume-filling effect’ always prevent chemotactic collapse?
Mathematical Methods in the Applied Sciences
2010
239
8
A remark on the regularity of solutions of Maxwell's equations on Lipschitz domains
Mathematical Methods in the Applied Sciences
1990
219
9
On traces for functional spaces related to Maxwell's equations Part I: An integration by parts formula in Lipschitz polyhedra
Mathematical Methods in the Applied Sciences
2001
213
10
A local compactness theorem for Maxwell's equations
Mathematical Methods in the Applied Sciences
1980
194
11
Guided waves by electromagnetic gratings and non-uniqueness examples for the diffraction problem
Mathematical Methods in the Applied Sciences
1994
188
12
Model‐based comparative study of magnetohydrodynamics unsteady hybrid nanofluid flow between two infinite parallel plates with particle shape effects
Mathematical Methods in the Applied Sciences
2023
181
13
On the analysis of vibration equation involving a fractional derivative with Mittag‐Leffler law
Mathematical Methods in the Applied Sciences
2020
177
14
Fractional differential equations with a Caputo derivative with respect to a Kernel function and their applications
Mathematical Methods in the Applied Sciences
2018
176
15
Global solutions in a fully parabolic chemotaxis system with singular sensitivity
Mathematical Methods in the Applied Sciences
2011
173
16
Reduction of quasilinear elliptic equations in cylindrical domains with applications
Mathematical Methods in the Applied Sciences
1988
172
17
An analysis for heat equations arises in diffusion process using new Yang‐Abdel‐Aty‐Cattani fractional operator
Mathematical Methods in the Applied Sciences
2020
169
18
Pedestrian flows and non-classical shocks
Mathematical Methods in the Applied Sciences
2005
168
19
Ion acoustic solitary wave solutions of two‐dimensional nonlinear Kadomtsev–Petviashvili–Burgers equation in quantum plasma
Mathematical Methods in the Applied Sciences
2017
164
20
Formulation variationnelle espace-temps pour le calcul par potentiel retardé de la diffraction d'une onde acoustique (I)
Mathematical Methods in the Applied Sciences
1986
159
21
Inverse scattering from an open arc
Mathematical Methods in the Applied Sciences
1995
155
22
Robust exponential attractors for Cahn-Hilliard type equations with singular potentials
Mathematical Methods in the Applied Sciences
2004
155
23
On traces for functional spaces related to Maxwell's equations Part II: Hodge decompositions on the boundary of Lipschitz polyhedra and applications
Mathematical Methods in the Applied Sciences
2001
147
24
Mathematical analysis of the quasilinear effects in a hyperbolic model blood flow through compliant axi-symmetric vessels
Mathematical Methods in the Applied Sciences
2003
145
25
Graded Mesh Refinement and Error Estimates for Finite Element Solutions of Elliptic Boundary Value Problems in Non-smooth Domains
Mathematical Methods in the Applied Sciences
1996
137
26
Estimating ∇u by divu and curlu
Mathematical Methods in the Applied Sciences
1992
133
27
On the classical solutions of the initial value problem for the unmodified non-linear Vlasov equation I general theory
Mathematical Methods in the Applied Sciences
1981
132
28
On Global Existence, Asymptotic Stability and Blowing Up of Solutions for Some Degenerate Non-linear Wave Equations of Kirchhoff Type with a Strong Dissipation
Mathematical Methods in the Applied Sciences
1997
131
29
Sur une Interprétation Mathématique de l'Intégrale de Rice en Théorie de la Rupture Fragile
Mathematical Methods in the Applied Sciences
1981
129
30
Modeling some real phenomena by fractional differential equations
Mathematical Methods in the Applied Sciences
2016
129
31
On the integral equation method for the plane mixed boundary value problem of the Laplacian
Mathematical Methods in the Applied Sciences
1979
127
32
Thermoelasticity with second sound?exponential stability in linear and non-linear 1-d
Mathematical Methods in the Applied Sciences
2002
127
33
On spherical spline interpolation and approximation
Mathematical Methods in the Applied Sciences
1981
126
34
General energy decay estimates of Timoshenko systems with frictional versus viscoelastic damping
Mathematical Methods in the Applied Sciences
2009
126
35
Almost sectorial operators on Ψ‐Hilfer derivative fractional impulsive integro‐differential equations
Mathematical Methods in the Applied Sciences
2022
124
36
An abstract semigroup approach to the third‐order Moore–Gibson–Thompson partial differential equation arising in high‐intensity ultrasound: structural decomposition, spectral analysis, exponential stability
Mathematical Methods in the Applied Sciences
2012
122
37
Global existence and uniform stability of solutions for a quasilinear viscoelastic problem
Mathematical Methods in the Applied Sciences
2007
121
38
A general bilinear form to generate different wave structures of solitons for a (3+1)‐dimensional Boiti‐Leon‐Manna‐Pempinelli equation
Mathematical Methods in the Applied Sciences
2019
119
39
Abundant exact solutions to a generalized nonlinear Schrödinger equation with local fractional derivative
Mathematical Methods in the Applied Sciences
2021
119
40
A fractional order epidemic model for the simulation of outbreaks of influenza A(H1N1)
Mathematical Methods in the Applied Sciences
2014
115
41
On the asymptotic growth of the solutions of the vlasov-poisson system
Mathematical Methods in the Applied Sciences
1993
113
42
A general fractional formulation and tracking control for immunogenic tumor dynamics
Mathematical Methods in the Applied Sciences
2022
113
43
On novel nondifferentiable exact solutions to local fractional Gardner's equation using an effective technique
Mathematical Methods in the Applied Sciences
2021
111
44
The three-dimensional wigner-poisson problem: Existence, uniqueness and approximation
Mathematical Methods in the Applied Sciences
1991
107
45
A new Rabotnov fractional‐exponential function‐based fractional derivative for diffusion equation under external force
Mathematical Methods in the Applied Sciences
2020
107
46
Weak solutions of the initial value problem for the unmodified non-linear vlasov equation
Mathematical Methods in the Applied Sciences
1984
105
47
Properties of Positive Solutions for Non-local Reaction-Diffusion Problems
Mathematical Methods in the Applied Sciences
1996
104
48
Dispersive of propagation wave solutions to unidirectional shallow water wave Dullin–Gottwald–Holm system and modulation instability analysis
Mathematical Methods in the Applied Sciences
2021
104
49
Asymptotic dynamics of the one‐dimensional attraction–repulsion Keller–Segel model
Mathematical Methods in the Applied Sciences
2015
103
50
Construction of a new family of Bernstein‐Kantorovich operators
Mathematical Methods in the Applied Sciences
2017
103
site/software ©
exaly
; All materials licenced under
CC by-SA
.