Existence of solutions for a p(x)-Kirchhoff-type equation

This paper is concerned with the existence and multiplicity of solutions to a class of p(x)-Kirchhoff-type problem with Dirichlet boundary data. By means of a direct variational approach and the theory of the variable exponent Sobolev spaces, we establish conditions ensuring the existence and multiplicity of solutions for the problem.

[1]  Sergey Shmarev,et al.  A model porous medium equation with variable exponent of nonlinearity: existence, uniqueness and localization properties of solutions , 2005 .

[2]  J. Rodrigues,et al.  On stationary thermo-rheological viscous flows , 2006 .

[3]  Guowei Dai Infinitely many solutions for a p(x)-Laplacian equation in RN☆ , 2009 .

[4]  Guowei Dai Infinitely many solutions for a hemivariational inequality involving the p(x)-Laplacian ☆ , 2009 .

[5]  Guowei Dai Three solutions for a Neumann-type differential inclusion problem involving the p(x)-Laplacian , 2009 .

[6]  M. Willem Minimax Theorems , 1997 .

[7]  S. Samko On a progress in the theory of lebesgue spaces with variable exponent: maximal and singular operators , 2005 .

[8]  Giovany M. Figueiredo,et al.  On an elliptic equation of p-Kirchhoff type via variational methods , 2006, Bulletin of the Australian Mathematical Society.

[9]  Yunmei Chen,et al.  Variable Exponent, Linear Growth Functionals in Image Restoration , 2006, SIAM J. Appl. Math..

[10]  Xianling Fan,et al.  Existence and multiplicity of solutions for p(x)-Laplacian equations in RN , 2004 .

[11]  Xianling Fan,et al.  Sobolev Embedding Theorems for Spaces Wk, p(x)(Ω) , 2001 .

[12]  Xianling Fan,et al.  On the sub-supersolution method for p(x)-Laplacian equations , 2007 .

[13]  V. Zhikov,et al.  Homogenization of Differential Operators and Integral Functionals , 1994 .

[14]  Xiaoming He,et al.  Infinitely many positive solutions for Kirchhoff-type problems , 2009 .

[15]  Xianling Fan,et al.  On the Spaces Lp(x)(Ω) and Wm, p(x)(Ω) , 2001 .

[16]  V. Zhikov,et al.  AVERAGING OF FUNCTIONALS OF THE CALCULUS OF VARIATIONS AND ELASTICITY THEORY , 1987 .

[17]  Marcelo M. Cavalcanti,et al.  Global existence and uniform decay rates for the Kirchhoff-Carrier equation with nonlinear dissipation , 2001, Advances in Differential Equations.

[18]  W. D. Evans,et al.  PARTIAL DIFFERENTIAL EQUATIONS , 1941 .

[19]  Francisco Júlio S. A. Corrêa,et al.  On a nonlocal elliptic system of p-Kirchhoff-type under Neumann boundary condition , 2009, Math. Comput. Model..

[20]  S. Spagnolo,et al.  Global solvability for the degenerate Kirchhoff equation with real analytic data , 1992 .

[21]  Qihu Zhang,et al.  Existence of solutions for p(x) -Laplacian dirichlet problem , 2003 .

[22]  Guowei Dai,et al.  Infinitely many solutions for a differential inclusion problem in RN involving the p(x)-Laplacian☆ , 2009 .

[23]  Stefano Panizzi,et al.  On the Well-Posedness of the Kirchhoff String , 1996 .

[24]  Guowei Dai Infinitely many solutions for a Neumann-type differential inclusion problem involving the p (x )-Laplacian , 2009 .

[25]  Qihu Zhang,et al.  Eigenvalues of p(x)-Laplacian Dirichlet problem , 2005 .