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A FIXED POINT METHOD IN THE STUDY OF AN INTEGRAL EQUATIONKeywords: integral equation , selfadjoint operator , strongly positive linear operator. Abstract: We prove an existence and uniqueness result for an integral equation involving selfadjoint integral operators in LR^2(0,1). The proof of principal result uses a variational method in Hilbert space, finalized by application of Banach fixed point theorem in a specific context, replacing classical approach of linear integral equations by an approach specific especially to nonlinear analysis.
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