A new class of multiple nonlocal problems with two parameters and variable-order fractional $ p(\cdot) $-Laplacian

Abstract: <abstract><p>In the present manuscript, we focus on a novel tri-nonlocal Kirchhoff problem, which involves the $ p(x) $-fractional Laplacian equations of variable order. The problem is stated as follows:</p> <p><disp-formula> <label/> <tex-math id="FE1"> \begin{document}$ \begin{eqnarray*} \left\{ \begin{array}{ll} M\Big(\sigma_{p(x, y)}(u)\Big)(-\Delta)^{s(\cdot)}_{p(\cdot)}u(x) = \lambda |u|^{q(x)-2}u\left(\int_{\Omega}\frac{1}{q(x)} |u|^{q(x)}dx \right)^{k_1}+\be… Show more

“…Recently, there have been some contributions devoted to the study of stationary higher order problems of Kirchhoff type. For a deeper investigation, we refer to [10][11][12][13][14][15]. We can mention the first result in this direction by Colasuonno and Pucci [16], where they state the existence of infinitely many solutions for problem (1.1) by using minimax approach.…”

On a m(x)$$ m(x) $$‐polyharmonic Kirchhoff problem without any growth near 0 and Ambrosetti–Rabinowitz conditions

“…Recently, there have been some contributions devoted to the study of stationary higher order problems of Kirchhoff type. For a deeper investigation, we refer to [10][11][12][13][14][15]. We can mention the first result in this direction by Colasuonno and Pucci [16], where they state the existence of infinitely many solutions for problem (1.1) by using minimax approach.…”

On a m(x)$$ m(x) $$‐polyharmonic Kirchhoff problem without any growth near 0 and Ambrosetti–Rabinowitz conditions

Solutions for fractional $p(x,\cdot )$-Kirchhoff-type equations in $\mathbb{R}^{N}$

Application of double Sumudu-generalized Laplace decomposition method and two-dimensional time-fractional coupled Burger’s equation