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Moreover, the notion of weak contraction mappings was extended in many different directions (see [3, 4] and references therein).
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Based on non-ambiguous identifiers we map additional information from the sources described below with mappings being extended, removed and remapped during each updating round.
Compared to the existing related work, e.g., [12 14], strongly relatively non-expansive mappings are extended to weakly relatively non-expansive mappings.
In contrast to the results in [7, Theorem ], and [8, Theorem ], these results with respect to nonexpansive mappings are extended to -strict pseudocontraction in -uniformly convex Banach spaces.
In other words, can Reich's theorem [7, Theorem ], with respect to nonexpansive mappings, be extended to -strict pseudocontractions in uniformly convex Banach spaces?
In particular, the fixed point theory for Kannan's mappings is extended in [4] by the use of a non-increasing function affecting to the contractive condition and the best constant to ensure that a fixed point is also obtained.
In particular, the fixed point theory for Kannan mappings is extended in [4] by the use of a non-increasing function affecting the contractive condition and the best constant to ensure a fixed point is also obtained.
In particular, the fixed point theory for Kannan's mappings is extended in [4] by the use of a non-increasing function affecting the contractive condition and the best constant to ensure a fixed point is also obtained.
A general system of variational inequalities (1.12) containing two inverse-strongly accre-tive mappings are extends to a general system of nonlinear variational inequalities (1.15) containing perturbed mappings.
Theorem 3.3 extends the main result of Yao et al. [7] in the following ways: (i) A general system of variational inequalities (1.12) containing two inverse-strongly accre-tive mappings are extends to a general system of nonlinear variational inequalities (1.15) containing perturbed mappings.
The mapping is extended from asymptotically nonexpansive mappings to asymptotically quasi-nonexpansive mappings in the intermediate sense.
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