AbstractIn this paper we develop a new method to prove the existence of minimizers for a class of constrained minimization problems on Hilbert spaces that are invariant under translations. Our method permits to exclude the dichotomy of the minimizing sequences for a large class of functionals. We introduce family of maps, called scaling paths, that permits to show the strong subadditivity inequality. As byproduct the strong convergence of the minimizing sequences (up to translations) is proved. We give an application to the energy functional I associated to the Schrödinger–Poisson equation in R3iψt+Δψ−(|x|−1⁎|ψ|2)ψ+|ψ|p−2ψ=0 when 2<p<3. In particular we prove that I achieves its minimum on the constraint {u∈H1(R3):‖u‖2=ρ} for every sufficie...
We consider the obstacle problem {minimize????????I(u)=?OG(?u)dx??among functions??u:O?Rsuch?that???...
The paper studies quasilinear elliptic problems in the Sobolev spaces W 1,p (Ω), Ω⊂R...
We study a nonlinear Schrödinger-Poisson system which reduces to a nonlinear andnonlocal PDE set on ...
AbstractIn this paper we develop a new method to prove the existence of minimizers for a class of co...
In this paper we will be concerned with the existence and non-existence of constrained minimizers i...
We study the radial symmetry of minimizers to the Schr\"odinger-Poisson-Slater (S-P-S) energy: $$...
AbstractWe prove a weak–strong convergence result for functionals of the form ∫RNj(x,u,Du)dx on W1,p...
|u|p dx on the constraint S(c) = {u ∈ H1(R3): R3 |u|2dx = c}, where c> 0 is a given parameter. I...
AbstractIn this paper we study a class of Caffarelli–Kohn–Nirenberg inequalities without restricting...
We prove some optimal regularity results for minimizers of some general integral functionals belongi...
AbstractThis paper is concerned with the asymptotic behavior of the regularized minimizer uε=(uε1,uε...
By using the standard scaling arguments, we show that the infimum of the following minimization prob...
AbstractWe consider the optimization problem min{F(g):g∈X(Ω)}, whereF(g) is a variational energy ass...
AbstractSuppose that (S, μ) and (T, ν) are given measure spaces with μ(S) < ∞ and ν(T) < ∞. If k ∈ L...
This thesis studies some problems derived from differential topology and differential geometry by te...
We consider the obstacle problem {minimize????????I(u)=?OG(?u)dx??among functions??u:O?Rsuch?that???...
The paper studies quasilinear elliptic problems in the Sobolev spaces W 1,p (Ω), Ω⊂R...
We study a nonlinear Schrödinger-Poisson system which reduces to a nonlinear andnonlocal PDE set on ...
AbstractIn this paper we develop a new method to prove the existence of minimizers for a class of co...
In this paper we will be concerned with the existence and non-existence of constrained minimizers i...
We study the radial symmetry of minimizers to the Schr\"odinger-Poisson-Slater (S-P-S) energy: $$...
AbstractWe prove a weak–strong convergence result for functionals of the form ∫RNj(x,u,Du)dx on W1,p...
|u|p dx on the constraint S(c) = {u ∈ H1(R3): R3 |u|2dx = c}, where c> 0 is a given parameter. I...
AbstractIn this paper we study a class of Caffarelli–Kohn–Nirenberg inequalities without restricting...
We prove some optimal regularity results for minimizers of some general integral functionals belongi...
AbstractThis paper is concerned with the asymptotic behavior of the regularized minimizer uε=(uε1,uε...
By using the standard scaling arguments, we show that the infimum of the following minimization prob...
AbstractWe consider the optimization problem min{F(g):g∈X(Ω)}, whereF(g) is a variational energy ass...
AbstractSuppose that (S, μ) and (T, ν) are given measure spaces with μ(S) < ∞ and ν(T) < ∞. If k ∈ L...
This thesis studies some problems derived from differential topology and differential geometry by te...
We consider the obstacle problem {minimize????????I(u)=?OG(?u)dx??among functions??u:O?Rsuch?that???...
The paper studies quasilinear elliptic problems in the Sobolev spaces W 1,p (Ω), Ω⊂R...
We study a nonlinear Schrödinger-Poisson system which reduces to a nonlinear andnonlocal PDE set on ...