Advanced Nonlinear Studies

Papers
(The TQCC of Advanced Nonlinear Studies is 7. The table below lists those papers that are above that threshold based on CrossRef citation counts [max. 250 papers]. The publications cover those that have been published in the past four years, i.e., from 2020-05-01 to 2024-05-01.)
ArticleCitations
Attractiveness of Constant States in Logistic-Type Keller–Segel Systems Involving Subquadratic Growth Restrictions43
Ground State Solutions for the Nonlinear Schrödinger–Bopp–Podolsky System with Critical Sobolev Exponent24
Sharp Trudinger–Moser Inequality and Ground State Solutions to Quasi-Linear Schrödinger Equations with Degenerate Potentials in ℝ n 23
Liouville Theorems for Fractional Parabolic Equations21
Concentration-Compactness Principle for Trudinger–Moser’s Inequalities on Riemannian Manifolds and Heisenberg Groups: A Completely Symmetrization-Free Argument21
Anisotropic ?-Laplacian Evolution of Fast Diffusion Type17
Hardy–Adams Inequalities on ℍ2 × ℝ n-216
Singular Finsler Double Phase Problems with Nonlinear Boundary Condition13
Sharp Hardy Identities and Inequalities on Carnot Groups12
Nonlocal Differential Equations with Convolution Coefficients and Applications to Fractional Calculus12
Existence of Solutions to Fractional p-Laplacian Systems with Homogeneous Nonlinearities of Critical Sobolev Growth11
On a Singular Robin Problem with Convection Terms10
Well-Ordered and Non-Well-Ordered Lower and Upper Solutions for Periodic Planar Systems9
Connecting and Closed Geodesics of a Kropina Metric9
Nonzero Positive Solutions of Elliptic Systems with Gradient Dependence and Functional BCs8
Liouville Results and Asymptotics of Solutions of a Quasilinear Elliptic Equation with Supercritical Source Gradient Term8
Existence and Concentration of Solutions for Choquard Equations with Steep Potential Well and Doubly Critical Exponents8
Multiplicity and Concentration of Solutions for Kirchhoff Equations with Magnetic Field7
On the Fractional NLS Equation and the Effects of the Potential Well’s Topology7
A Critical Point Theorem for Perturbed Functionals and Low Perturbations of Differential and Nonlocal Systems7
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