Multiplicity results for p(x)-biharmonic equations with nonlinear boundary conditions

被引:1
|
作者
Rasouli, S. H. [1 ]
机构
[1] Babol Noshirvani Univ Technol, Fac Basic Sci, Dept Math, Babol, Iran
来源
APPLICABLE ANALYSIS | 2023年 / 102卷 / 16期
关键词
p(x)-biharmonic operator; variational methods; nonlinear boundary conditions; NEHARI MANIFOLD APPROACH; VARIABLE EXPONENT; EMBEDDING-THEOREMS; DIRICHLET PROBLEMS; P-LAPLACIAN; P(X)-LAPLACIAN; EXISTENCE; EIGENVALUES;
D O I
10.1080/00036811.2022.2120864
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
In this paper, we are interested in the existence of multiple weak solutions of the following fourth-order nonlinear elliptic problem with a p(x)biharmonic operator {Delta(2)(p(x)) u = lambda f(x) vertical bar u vertical bar(q(x)-2) u, x is an element of Omega, partial derivative vertical bar Delta u vertical bar(p(x)-2) Delta u)/partial derivative n = g(x)vertical bar u vertical bar(r(x)-2)u, x is an element of partial derivative Omega, where Omega subset of R-N is a bounded domain, Delta(2)(p(x))u = Delta(vertical bar Delta u vertical bar(p(x)-2) Delta u) is the operator of fourth order called the p(x)-biharmonic operator, p(x), q(x), r(x) is an element of C((Omega) over bar), and f is an element of C((Omega) over bar), g is an element of C(partial derivative(Omega) over bar) are non-negative weight functions with compact support in (Omega) over bar. Our analysis mainly relies on variational arguments and some recent theory on the generalized Lebesgue-Sobolev spaces L-p(x)(Omega) and W-m,W-p(x)(Omega).
引用
收藏
页码:4489 / 4500
页数:12
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