Existence of bounded weak solutions of the Robin problem for a quasi-linear elliptic equation with p(x)-Laplacian

On the boundary values of the solutions of linear elliptic equations

Bulletin of the Australian Mathematical Society ◽

10.1017/s0004972700011461 ◽

1983 ◽

Vol 27 (1) ◽

pp. 1-30 ◽

Cited By ~ 8

Author(s):

J. Chabrowski ◽

H.B. Thompson

Keyword(s):

Elliptic Equation ◽

Sobolev Space ◽

Weak Solutions ◽

Elliptic Equations ◽

Sufficient Condition ◽

Boundary Values ◽

Linear Elliptic Equation

The purpose of this article is to investigate the traces of weak solutions of a linear elliptic equation. In particular, we obtain a sufficient condition for a solution belonging to the Sobolev space to have an L2-trace on the boundar.

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Infinitely many Solutions of Semi-Linear Elliptic Equation with a Logarithmic Nonlinear Term

Applied Mechanics and Materials ◽

10.4028/www.scientific.net/amm.496-500.2216 ◽

2014 ◽

Vol 496-500 ◽

pp. 2216-2219

Author(s):

Yuan Li ◽

Jiang Qin

Keyword(s):

Dirichlet Problem ◽

Elliptic Equation ◽

Weak Solutions ◽

Sobolev Inequality ◽

Nonlinear Term ◽

Mountain Pass Theorem ◽

Logarithmic Sobolev Inequality ◽

Infinitely Many Solutions ◽

Linear Elliptic Equation ◽

Perturbation Theorem

The semi-linear elliptic equation is an important model in Mathematic, Physics. In this paper, we study the Dirichlet problem of semi-linear elliptic equation with a logarithmic nonlinear term. By using the logarithmic Sobolev inequality, mountain pass theorem and perturbation theorem, we obtain infinitely many nontrivial weak solutions, and also the energy of the solution is positive.

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On the regularity of very weak solutions for linear elliptic equations in divergence form

Nonlinear Differential Equations and Applications NoDEA ◽

10.1007/s00030-020-00646-8 ◽

2020 ◽

Vol 27 (5) ◽

Author(s):

Domenico Angelo La Manna ◽

Chiara Leone ◽

Roberta Schiattarella

Keyword(s):

Weak Solution ◽

Elliptic Equation ◽

Modulus Of Continuity ◽

Weak Solutions ◽

Elliptic Equations ◽

Divergence Form ◽

Continuity Condition ◽

Very Weak Solutions ◽

Linear Elliptic Equation ◽

Very Weak Solution

Abstract In this paper we consider a linear elliptic equation in divergence form $$\begin{aligned} \sum _{i,j}D_j(a_{ij}(x)D_i u )=0 \quad \hbox {in } \Omega . \end{aligned}$$ ∑ i , j D j ( a ij ( x ) D i u ) = 0 in Ω . Assuming the coefficients $$a_{ij}$$ a ij in $$W^{1,n}(\Omega )$$ W 1 , n ( Ω ) with a modulus of continuity satisfying a certain Dini-type continuity condition, we prove that any very weak solution $$u\in L^{n'}_\mathrm{loc}(\Omega )$$ u ∈ L loc n ′ ( Ω ) of (0.1) is actually a weak solution in $$W^{1,2}_\mathrm{loc}(\Omega )$$ W loc 1 , 2 ( Ω ) .

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