Communications of the Korean Mathematical Society (대한수학회논문집)
- Volume 9 Issue 4
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- Pages.819-823
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- 1994
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- 1225-1763(pISSN)
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- 2234-3024(eISSN)
MANN-ITERATION PROCESS TO THE SOLUTION OF $y=x+Tx$ FOR AN ACDRETIVE OPERATOR T IN SOME BANACH SPACES
Abstract
If H is a Hilbert space, then an operator $T : D(T) \subset H \to H$ is said to be monotone if $$ (x-y, Tx-Ty) \geq 0$$ for any x, y in D(T). Many authors [1], [4] obtained the existence theorem for the equation $y = x + Tx$ for x, given an element y in H and a monotone operator T. On the other hand some iterative methods were applied to the approximations for the solution of the above equation [6], [8]. For example Bruck [2] obtained the iterative solution of the above equation with an explicit error estimate as follows.
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