Concentration-Compactness Principle for Trudinger–Moser’s Inequalities on Riemannian Manifolds and Heisenberg Groups: A Completely Symmetrization-Free Argument
Published 2021 View Full Article
- Home
- Publications
- Publication Search
- Publication Details
Title
Concentration-Compactness Principle for Trudinger–Moser’s Inequalities on Riemannian Manifolds and Heisenberg Groups: A Completely Symmetrization-Free Argument
Authors
Keywords
-
Journal
ADVANCED NONLINEAR STUDIES
Volume 21, Issue 4, Pages 917-937
Publisher
Walter de Gruyter GmbH
Online
2021-10-12
DOI
10.1515/ans-2021-2147
References
Ask authors/readers for more resources
Related references
Note: Only part of the references are listed.- Hardy–Adams Inequalities on ℍ2 × ℝ n-2
- (2021) Xing Ma et al. ADVANCED NONLINEAR STUDIES
- A Remark on the Concentration Compactness Principle in Critical Dimension
- (2021) Fengbo Hang COMMUNICATIONS ON PURE AND APPLIED MATHEMATICS
- Critical and subcritical Trudinger-Moser inequalities on complete noncompact Riemannian manifolds
- (2021) Jungang Li et al. ADVANCES IN MATHEMATICS
- Improved Moser‐Trudinger‐Onofri Inequality under Constraints
- (2020) Sun‐Yung A. Chang et al. COMMUNICATIONS ON PURE AND APPLIED MATHEMATICS
- Rearrangements in Carnot Groups
- (2019) Juan J. Manfredi et al. ACTA MATHEMATICA SINICA-ENGLISH SERIES
- Sharp Singular Trudinger–Moser Inequalities Under Different Norms
- (2019) Nguyen Lam et al. ADVANCED NONLINEAR STUDIES
- Concentration–Compactness principle for the sharp Adams inequalities in bounded domains and whole space Rn
- (2019) Van Hoang Nguyen JOURNAL OF DIFFERENTIAL EQUATIONS
- Existence and nonexistence of extremal functions for sharp Trudinger-Moser inequalities
- (2019) Nguyen Lam et al. ADVANCES IN MATHEMATICS
- Sharpened Adams Inequality and Ground State Solutions to the Bi-Laplacian Equation in ℝ4
- (2018) Lu Chen et al. ADVANCED NONLINEAR STUDIES
- Concentration-compactness principle for Trudinger–Moser inequalities on Heisenberg groups and existence of ground state solutions
- (2018) Jungang Li et al. CALCULUS OF VARIATIONS AND PARTIAL DIFFERENTIAL EQUATIONS
- Trudinger–Moser Inequalities in Fractional Sobolev–Slobodeckij Spaces and Multiplicity of Weak Solutions to the Fractional-Laplacian Equation
- (2018) Caifeng Zhang ADVANCED NONLINEAR STUDIES
- Equivalence of critical and subcritical sharp Trudinger–Moser–Adams inequalities
- (2017) Nguyen Lam et al. REVISTA MATEMATICA IBEROAMERICANA
- Concentration-Compactness Principle of Singular Trudinger--Moser Inequalities in ℝ n and n-Laplace Equations
- (2017) Caifeng Zhang et al. ADVANCED NONLINEAR STUDIES
- Sharp Affine and Improved Moser–Trudinger–Adams Type Inequalities on Unbounded Domains in the Spirit of Lions
- (2016) Nguyen Lam et al. JOURNAL OF GEOMETRIC ANALYSIS
- On Nonuniformly Subelliptic Equations of Q−sub-Laplacian Type with Critical Growth in the Heisenberg Group
- (2016) Nguyen Lam et al. ADVANCED NONLINEAR STUDIES
- A new approach to sharp Moser–Trudinger and Adams type inequalities: A rearrangement-free argument
- (2013) Nguyen Lam et al. JOURNAL OF DIFFERENTIAL EQUATIONS
- Sharp subcritical Moser–Trudinger inequalities on Heisenberg groups and subelliptic PDEs
- (2013) Nguyen Lam et al. NONLINEAR ANALYSIS-THEORY METHODS & APPLICATIONS
- Sharp Moser–Trudinger inequality on the Heisenberg group at the critical case and applications
- (2012) Nguyen Lam et al. ADVANCES IN MATHEMATICS
- Concentration-compactness principles for Moser–Trudinger inequalities: new results and proofs
- (2011) Robert Černý et al. ANNALI DI MATEMATICA PURA ED APPLICATA
- A sharp Trudinger-Moser type inequality for unbounded domains in $\mathbb{R}^n$
- (2008) Yuxiang Li et al. INDIANA UNIVERSITY MATHEMATICS JOURNAL
- On a quasilinear nonhomogeneous elliptic equation with critical growth in RN
- (2008) João Marcos do Ó et al. JOURNAL OF DIFFERENTIAL EQUATIONS
Add your recorded webinar
Do you already have a recorded webinar? Grow your audience and get more views by easily listing your recording on Peeref.
Upload NowCreate your own webinar
Interested in hosting your own webinar? Check the schedule and propose your idea to the Peeref Content Team.
Create Now