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Liliane de Almeida Maia

About Liliane de Almeida Maia

Liliane de Almeida Maia, With an exceptional h-index of 17 and a recent h-index of 11 (since 2020), a distinguished researcher at Universidade de Brasília, specializes in the field of Partial Differential Equations.

His recent articles reflect a diverse array of research interests and contributions to the field:

Classification of radial solutions for fully nonlinear equations with Hardy potential

Radial solvability for Pucci-Lane-Emden systems in annuli

An upper bound for the least energy of a sign-changing solution to a zero mass problem

The Nehari manifold for a degenerate logistic parabolic equation

Existence, nonexistence and uniqueness for Lane–Emden type fully nonlinear systems

A note on nonautonomous Schrödinger equations with inhomogeneous nonlinearity

Radial solutions for Pucci-Lane-Emden systems in annuli

Hartree-Fock type systems: Existence of ground states and asymptotic behavior

Liliane de Almeida Maia Information

University

Position

___

Citations(all)

1065

Citations(since 2020)

434

Cited By

843

hIndex(all)

17

hIndex(since 2020)

11

i10Index(all)

25

i10Index(since 2020)

12

Email

University Profile Page

Google Scholar

Liliane de Almeida Maia Skills & Research Interests

Partial Differential Equations

Top articles of Liliane de Almeida Maia

Title

Journal

Author(s)

Publication Date

Classification of radial solutions for fully nonlinear equations with Hardy potential

Discrete and Continuous Dynamical Systems

Liliane Maia

Gabrielle Nornberg

Filomena Pacella

2024/3/12

Radial solvability for Pucci-Lane-Emden systems in annuli

Proceedings of the Royal Society of Edinburgh Section A: Mathematics

Liliane Maia

Ederson Moreira dos Santos

Gabrielle Nornberg

2024/4

An upper bound for the least energy of a sign-changing solution to a zero mass problem

Advanced Nonlinear Studies

Mónica Clapp

Liliane Maia

Benedetta Pellacci

2024/3/14

The Nehari manifold for a degenerate logistic parabolic equation

arXiv preprint arXiv:2303.08298

Juliana Fernandes

Liliane A Maia

2023/3/15

Existence, nonexistence and uniqueness for Lane–Emden type fully nonlinear systems

Nonlinearity

Liliane Maia

Gabrielle Nornberg

Filomena Pacella

2023/2/1

A note on nonautonomous Schrödinger equations with inhomogeneous nonlinearity

Introduçao aos grupos tipo Thompson

Raquel Lehrer

Liliane A Maia

Ricardo Ruviaro

2023

Radial solutions for Pucci-Lane-Emden systems in annuli

Abstracts

Liliane Maia

Gabrielle Nornberg

Ederson Moreira dos Santos

2023

Hartree-Fock type systems: Existence of ground states and asymptotic behavior

Journal of Differential Equations

Pietro d'Avenia

Liliane Maia

Gaetano Siciliano

2022/10/25

Asymptotic behaviour of positive solutions of semilinear elliptic problems with increasing powers

Proceedings of the Royal Society of Edinburgh Section A: Mathematics

Lucio Boccardo

Liliane Maia

Benedetta Pellacci

2022/10

On a planar Hartree–Fock type system

Nonlinear Differential Equations and Applications NoDEA

J Carvalho

G Figueiredo

L Maia

E Medeiros

2022/9

Generalized quasilinear equations with critical growth and nonlinear boundary conditions

Liliane de Almeida Maia

José Carlos Oliveira Jùnior

Ricardo Ruviaro

2022/6/27

Symmetric positive solutions to nonlinear Choquard equations with potentials

Calculus of Variations and Partial Differential Equations

Liliane Maia

Benedetta Pellacci

Delia Schiera

2022/4

A dynamical system approach for Lane-Emden type problems

Liliane Maia

Gabrielle Nornberg

Filomena Pacella

2021

Radial solutions for H\'enon type fully nonlinear equations in annuli and exterior domains

arXiv preprint arXiv:2107.05480

Liliane Maia

Gabrielle Nornberg

2021/7/12

Positive bound states to nonlinear Choquard equations in the presence of nonsymmetric potentials

arXiv preprint arXiv:2106.04519

Liliane Maia

Benedetta Pellacci

Delia Schiera

2021/6/8

A dynamical system approach to a class of radial weighted fully nonlinear equations

Communications in Partial Differential Equations

Liliane Maia

Gabrielle Nornberg

Filomena Pacella

2021/5/11

BLOW-UP AND BOUNDED SOLUTIONS FOR A SEMILINEAR PARABOLIC PROBLEM IN A SATURABLE MEDIUM.

Discrete & Continuous Dynamical Systems: Series A

Juliana Fernandes

Liliane Maia

2021/3/1

Mini-max algorithm via Pohozaev manifold

arXiv preprint arXiv:1905.03324

LA Maia

D Raom

R Ruviaro

YD Sobral

2019/5/8

Bound state for a strongly coupled nonlinear Schrödinger system with saturation

Milan Journal of Mathematics

Liliane A Maia

Ricardo Ruviaro

Elson L Moura

2020/6

A note on a positive solution of a null mass nonlinear field equation in exterior domains

Proceedings of the Royal Society of Edinburgh Section A: Mathematics

Alireza Khatib

Liliane A Maia

2020/4

See List of Professors in Liliane de Almeida Maia University(Universidade de Brasília)

Co-Authors

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