Existence of the non-radially symmetric ground state for p-Laplacian equations involving Choquard type

We consider some p-Laplacian type equations with sum of nonlocal term and subcritical nonlinearities. We prove the existence of the ground states, which are positive. Because of including p=2, these results extend the results of Li, Ma and Zhang [Nonlinear Analysis: Real World Application 45(2019) 1-25]. When p=2, N=3, by a variant variational identity and a constraint set, we can prove the existence of a non-radially symmetric solution. Moreover, this solution u(x₁, x₂, x₃) is radially symmetric with respect to (x₁, x₂) and odd with respect to x₃.     

Ground States for Singularly Perturbed Planar Choquard Equation with Critical Exponential Growth

In this paper, we are dedicated to studying the following singularly Choquard equation $$ -\varepsilon^2\Delta u+V(x)u=\varepsilon^{-\alpha}\left[I_{\alpha}\ast F(u)\right]f(u),\ \ \ \ x\in\R^2,$$ where $V(x)$ is a continuous real function on $\R^2$, $I_{\alpha}:\R^2\rightarrow\R$ is the Riesz potential, and $F$ is the primitive function of nonlinearity $f$ which has critical exponential growth. Using the Trudinger-Moser inequality and some delicate estimates, we show that the above problem admits at least one semiclassical ground state solution, for $\varepsilon>0$ small provided that $V(x)$ is periodic in $x$ or asymptotically linear as $|x|\rightarrow \infty$. In particular, a precise and fine lower bound of $\frac{f(t)}{e^{\beta_{0} t^{2}}}$ near infinity is introduced in this paper.     

Existence and multiplicity of normalized solutions for a class of fractional Choquard equations

In this paper, we study the existence and multiplicity of solutions with a prescribed L2-norm for a class of nonlinear fractional Choquard equations in RN:(-△)su-λu =(κα*|u|p)|u|p-2u,where N≥3,s∈(0,1),α∈(0,N),p∈(max{1 +(α+2s)/N,2},(N+α)/(N-2s)) and κα(x)=|x|α-N. To get such solutions,we look for critical points of the energy functional I(u) =1/2∫RN|(-△)s/2u|2-1/(2p)∫RN(κα*|u|p)|u|p on the constraints S(c)={u∈Hs(RN):‖u‖L2(RN)2=c},c >0.For the value p∈(max{1+(α+2s)/N,2},(N+α)/(N-2s)) considered, the functional I is unbounded from below on S(c). By using the constrained minimization method on a suitable submanifold of S(c), we prove that for any c>0, I has a critical point on S(c) with the least energy among all critical points of I restricted on S(c). After that,we describe a limiting behavior of the constrained critical point as c vanishes and tends to infinity. Moreover,by using a minimax procedure, we prove that for any c>0, there are infinitely many radial critical points of I restricted on S(c).     

Ground state solutions for a coupled Kirchhoff‐type system

In this paper, we consider the coupled Kirchhoff‐type system where ε is a small positive parameter and a_i>0, b_i≥0 are constants for i = 1,2, P,Q are positive continuous potentials satisfying some conditions. Using minimax theorem and the Ljusternik‐Schnirelmann category theory, we obtain the existence and multiplicity results of ground state solutions for the aforementioned system as ε > 0 small enough. Moreover, the concentration phenomena of solutions is also explored. Copyright © 2015 John Wiley & Sons, Ltd.     

Ground state solutions to logarithmic Choquard equations in R3

In this paper, we prove the existence of nontrival solutions of mountain-pass type, least energy solutions and ground state solutions for logarithmic Choquard equation. Some new variational methods and techniques are used in the present paper and we extend and improve the present ones in the literature.     

R2中非局部椭圆型方程基态解的存在性

本文考虑了一类非局部椭圆型方程-△u+V(x)u=(1/|x|μ*Q(x)F(u)/|x|β)Q(x)f(u)|x|β,x∈R^x,其中V是正的连续位势函数,0<μ<2,0≤β<1/2,2β+μ≤2,F(s)是f(s)的原函数.假设非线性项f(s)满足Trudinger-Moser型次临界指数增长,利用变分方法证明了该方程基态解的存在性.     

On the critical cases of linearly coupled Choquard systems

We study the existence and nonexistence results for a class of linearly coupled Choquard system in critical cases.     

Ground state solutions for Klein–Gordon–Maxwell system with steep potential well

In this paper, we study the following Klein–Gordon–Maxwell system $\left\{\begin{array}{c}-\Delta u+(\lambda a\left(x\right)+1)u-(2\omega +\varphi )\varphi u=f(x,u),\mathrm{in}{\mathbb{R}}^3,\hfill \\ -\Delta \varphi =-(\omega +\varphi )u^2,\mathrm{in}{\mathbb{R}}^3.\hfill \end{array}\right.$Using variational methods, we obtain the existence of ground state solutions under some appropriate assumptions on $a$ and $f$.     

Existence of ground state solutions for asymptotically linear Schrödinger–Poisson systems

In this paper, we study the following Schrödinger–Poisson system: where λ > 0 is a parameter, with 2≤p≤+∞, and the function f(x,s) may not be superlinear in s near zero and is asymptotically linear with respect to s at infinity. Under certain assumptions on V, K, and f, we give the existence and nonexistence results via variational methods. More precisely, when p∈[2,+∞), we obtain that system (SP) has a positive ground state solution for λ small; when p =+ ∞, we prove that system (SP) has a positive solution for λ small and has no any nontrivial solution for λ large. Copyright © 2015 John Wiley & Sons, Ltd.     

Existence and multiplicity results of positive doubly periodic solutions for nonlinear telegraph system

In this paper, the existence of positive doubly periodic solutions for nonlinear telegraph system is discussed using the method of upper and lower solutions.     

Existence of ground-state solutions for p-Choquard equations with singular potential and doubly critical exponents

We are concerned with the following Choquard equation: $$-{\mathrm{\Delta }}_{p}u+\frac{A}{{|x|}^{\theta }}{|u|}^{p-2}u=\left(I_{\alpha }\ast F(u)\right)f(u),x\in {\mathbb{R}}^N,$$ where $p\in (1,N)$, $\alpha \in (0,N)$, $\theta \in [0,p)\cup \left(p,\frac{(N-1)p}{p-1}\right)$, $A>0$, ${\mathrm{\Delta }}_p$ is the p-Laplacian, $I_{\alpha }$ is the Riesz potential, and F is the primitive of f which is of critical growth due to the Hardy–Littlewood–Sobolev inequality. Under different range of θ and almost necessary conditions on the nonlinearity f in the spirit of Berestycki–Lions-type conditions, we divide this paper into three parts. By applying the refined Sobolev inequality with Morrey norm and the generalized version of the Lions-type theorem, some existence results are established. It is worth noting that our method is not involving the concentration–compactness principle.     

Existence of positive solutions to a coupled system of fractional differential equations

We consider the following system of fractional differential equations where is the Riemann‐Liouville fractional derivative of order α,f,g : [0,1] × [0, ∞ ) × [0, ∞ ) → [0, ∞ ). Sufficient conditions are provided for the existence of positive solutions to the considered problem. Copyright © 2014 John Wiley & Sons, Ltd.     

Ground state solutions of the periodic discrete coupled nonlinear Schrödinger equations

In this paper, by using the Nehari manifold approach in combination with periodic approximations, we obtain the sufficient conditions on the existence of the nontrivial ground state solutions of the periodic discrete coupled nonlinear Schrödinger equations. Copyright © 2014 John Wiley & Sons, Ltd.