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Strongly Nonlinear Elliptic Unilateral Problems in Orlicz Space and $L^1$ Data  
 
  Authors: L. Aharouch, M. Rhoudaf,  
  Keywords: Orlicz Sobolev spaces, Boundary value problems, Truncations, Unilateral problems.  
  Date Received: 21/12/04  
  Date Accepted: 06/04/05  
  Subject Codes:

35J60

  
  Editors: Alberto Fiorenza,  
 
  Abstract:

In this paper, we shall be concerned with the existence result of Unilateral problem associated to the equations of the form,

$displaystyle Au + g(x, u, nabla u) = f, $
where $ A$ is a Leray-Lions operator from its domain $ D(A)subset W_0^{1}L_M(Omega)$ into $ W^{-1}E_{overline M}(Omega)$. On the nonlinear lower order term $ g(x,u,nabla u)$, we assume that it is a Carathéodory function having natural growth with respect to $ vertnabla uvert$, and satisfies the sign condition. The right hand side $ f$ belongs to $ L^1(Omega)$.;


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