Zhang Binlin, Marco Squassina, Zhang Xia
Published 2016-06-27Version 1
The paper is devoted to the study of a singularly perturbed fractional Schr\"{o}dinger equations involving critical frequency and critical growth in the presence of a magnetic field. By using variational methods, we obtain the existence of mountain pass solutions $u_{\varepsilon}$ which tend to the trivial solution as $\varepsilon\rightarrow0$. Moreover, we get infinitely many solutions and sign-changing solutions for the problem in absence of magnetic effects under some extra assumptions.
Multiplicity and concentration results for local and fractional NLS equations with critical growth
On a $p(\cdot)$-biharmonic problem of Kirchhoff type involving critical growth
Multiple solutions for the $p(x)-$laplace operator with critical growth
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