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We study the existence of weak solutions for the nonlinear systemequation*. aligned- , _u&=a (x) |u|^p-2u-b (x) |u|^ |v|^ v+f, \\- ₐ, ₐv&=-c (x) |u|^ |v|^ u+d (x) |v|^q-2v+g, aligned\}equation*where, the degenerated p-Laplacian is defined as , u=div P (x) | u|^p-2 u. We prove the existence of weak solutions for this system defined on bounded domains using the theory of monotone operators. We also consider the case of an unbounded domain. 2000 Mathematics Subject Classification. 35J67, 35J55, 47H07
Serag et al. (Tue,) studied this question.