Positive Solutions for a Class of Quasilinear Schrödinger Equations with Two Parameters

“…Chen et al [25] used the method developed by Jeanjean [26] to prove the existence of positive solutions with superlinear condition. Specifically, Chen et al [27] studied the existence of positive solutions for two nonlinear terms by using the mountain pass theorem and Moser iterative method. Motivated by earlier studies [19,21], the main purpose of this paper is to consider the existence of positive solutions for (1.1) with 𝜅 > 0 and 3 4 < 𝛼 ≤ 4 3 .…”

“…$$ Chen et al [25] used the method developed by Jeanjean [26] to prove the existence of positive solutions with superlinear condition. Specifically, Chen et al [27] studied the existence of positive solutions for two nonlinear terms by using the mountain pass theorem and Moser iterative method.…”

Existence of positive solutions for a class of quasilinear Schrödinger equation with critical exponent

“…Chen et al [25] used the method developed by Jeanjean [26] to prove the existence of positive solutions with superlinear condition. Specifically, Chen et al [27] studied the existence of positive solutions for two nonlinear terms by using the mountain pass theorem and Moser iterative method. Motivated by earlier studies [19,21], the main purpose of this paper is to consider the existence of positive solutions for (1.1) with 𝜅 > 0 and 3 4 < 𝛼 ≤ 4 3 .…”

“…$$ Chen et al [25] used the method developed by Jeanjean [26] to prove the existence of positive solutions with superlinear condition. Specifically, Chen et al [27] studied the existence of positive solutions for two nonlinear terms by using the mountain pass theorem and Moser iterative method.…”

Existence of positive solutions for a class of quasilinear Schrödinger equation with critical exponent

Sign-Changing Solutions for Fractional Kirchhoff-Type Equations with Critical and Supercritical Nonlinearities

Concentrating Positive Solutions for Quasilinear Schrödinger Equations Involving Steep Potential Well