Singularly perturbed quasilinear Choquard equations with nonlinearity satisfying Berestycki–Lions assumptions

Yang, Huifeng

doi:10.1186/s13661-021-01563-0

Search citation statements

Order By: Relevance

Paper Sections

Select...

Introduction1

Citation Types

Supporting

Mentioning

Contrasting

Year Published

2024

Publication Types

Select...

Article2

Relationship

Self Cite0

Independent2

Authors

Journals

Cited by 2 publications

(1 citation statement)

References 28 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…They obtained a local solution concentrating around the local minimum of potential V by using Byeon-Wang [4] type penalization method. More results for the equation (1.7), one can see [9,34,42,43,46,47] and references therein. In recent years, there are have been many results of localized nodal solution for the Choquard equation.…”

Section: Introductionmentioning

confidence: 95%

Localized nodal solutions for semiclassical Choquard equations with critical growth

Zhang,

Zhang

2024

ejde

View full text Add to dashboard Cite

In this article, we study the existence of localized nodal solutions for semiclassical Choquard equation with critical growth $$ -\epsilon^2 \Delta v +V(x)v = \epsilon^{\alpha-N}\Big(\int_{R^N} \frac{|v(y)|^{2_\alpha^*}}{|x-y|^{\alpha}}\,dy\Big) |v|^{2_\alpha^*-2}v +\theta|v|^{q-2}v,\; x \in R^N, $$ where $\theta>0$, $N\geq 3$, $0< \alpha<\min \{4,N-1\},\max\{2,2^*-1\}< q< 2 ^*$, $2_\alpha^*= \frac{2N-\alpha}{N-2}$, $V$ is a bounded function. By the perturbation method and the method of invariant sets of descending flow, we establish for small $\epsilon$ the existence of a sequence of localized nodal solutions concentrating near a given local minimum point of the potential function $V$. For more information see https://ejde.math.txstate.edu/Volumes/2024/19/abstr.html

show abstract