Positive solutions for a class of quasilinear singular equations. JV Goncalves, CAP Santos
Electronic Journal of Differential Equations (EJDE)[electronic only] 2004 …, 2004
46 2004 Existence and asymptotic behavior of non-radially symmetric ground states of semilinear singular elliptic equations JV Goncalves, CA Santos
Nonlinear analysis 65 (4), 719-727, 2006
38 2006 On Existence of L-Ground States for Singular Elliptic Equations in the Presence of a Strongly Nonlinear Term JV Goncalves, AL Melo, CA Santos
Advanced Nonlinear Studies 7 (3), 475, 2007
29 2007 On ground state solutions for singular and semi-linear problems including super-linear terms at infinity CA Santos
Nonlinear Analysis: Theory, Methods & Applications 71 (12), 6038-6043, 2009
26 2009 Non-existence and existence of entire solutions for a quasi-linear problem with singular and super-linear terms CA Santos
Nonlinear Analysis: Theory, Methods & Applications 72 (9-10), 3813-3819, 2010
24 2010 Classical solutions of singular Monge–Ampère equations in a ball JVA Goncalves, CAP Santos
Journal of mathematical analysis and applications 305 (1), 240-252, 2005
24 2005 Least action nodal solutions for a quasilinear defocusing Schrödinger equation with supercritical nonlinearity M Yang, CA Santos, J Zhou
Commun. Contemp. Math 21 (1850026), 23, 2019
22 2019 Positive solutions for a mixed and singular quasilinear problem JVA Gonçalves, MC Rezende, CA Santos
Nonlinear Analysis: Theory, Methods & Applications 74 (1), 132-140, 2011
20 2011 Singular elliptic problems: Existence, non-existence and boundary behavior JV Gonçalves, CA Santos
Nonlinear Analysis: Theory, Methods & Applications 66 (9), 2078-2090, 2007
17 2007 Quasilinear elliptic systems with convex-concave singular terms and Φ-Laplacian operator JV Gonçalves, ML Carvalho, CA Santos
Differential Integral Equations 31, 231-256, 2018
15 2018 Multiplicity of negative-energy solutions for singular-superlinear Schrödinger equations with indefinite-sign potential RL Alves, CA Santos, K Silva
Communications in Contemporary Mathematics 24 (10), 2150042, 2022
14 2022 Necessary and sufficient conditions for existence of blow‐up solutions for elliptic problems in Orlicz–Sobolev spaces CA Santos, J Zhou, J Abrantes Santos
Mathematische Nachrichten 291 (1), 160-177, 2018
13 2018 Global multiplicity of solutions for a modified elliptic problem with singular terms CA Santos, M Yang, J Zhou
Nonlinearity 34 (11), 7842-7871, 2021
11 2021 How to break the uniqueness of CA Santos, L Santos
Zeitschrift für angewandte Mathematik und Physik 69, 1-22, 2018
10 2018 Infinite many blow-up solutions for a Schrödinger quasilinear elliptic problem with a non-square diffusion term CA Santos, J Zhou
Complex Variables and Elliptic Equations 62 (7), 887-898, 2017
10 2017 A type of Brézis–Oswald problem to ML Carvalho, JV Goncalves, ED Silva, CAP Santos
Calculus of Variations and Partial Differential Equations 60 (5), 195, 2021
9 2021 About positive CA Santos, JV Gonçalves, ML Carvalho
9 2019 Existence and asymptotic behavior of ground states for quasilinear singular equations involving Hardy–Sobolev exponents CO Alves, JV Goncalves, CA Santos
Journal of mathematical analysis and applications 322 (1), 298-315, 2006
9 2006 Separating solutions of nonlinear problems using nonlinear generalized Rayleigh quotients ML Carvalho, Y Il'yasov, CA Santos
8 2021 Uniqueness in Wloc1, p (x)(Ω) and continuity up to portions of the boundary of positive solutions for a strongly-singular elliptic problem CO Alves, CA Santos, TW Siqueira
Journal of Differential Equations 269 (12), 11279-11327, 2020
8 2020 
j v goncalvesProfessor of Mathematics / University of Brasilia - BrazilBestätigte E-Mail-Adresse bei mat.unb.br
