Halpern–Ishikawa type iterative method for approximating fixed points of non-self pseudocontractive mappings
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Abstract:
In this paper, we define a Halpern–Ishikawa type iterative method for approximating a fixed point of a Lipschitz pseudocontractive non-self mapping T in a real Hilbert space settings and prove strong convergence result of the iterative method to a fixed point of T under some mild conditions. We give a numerical example to support our results. Our results improve and generalize most of the results that have been proved for this important class of nonlinear mappings.Reviews
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APA
(2026). Halpern–Ishikawa type iterative method for approximating fixed points of non-self pseudocontractive mappings. Afribary. Retrieved June 14, 2026, from http://library.afribary.com/works/halpernishikawa-type-iterative-method-for-approximating-fixed-points-of-non-self-pseudocontractive-mappings
MLA
"Halpern–Ishikawa type iterative method for approximating fixed points of non-self pseudocontractive mappings." Afribary, 7 Jun. 2026, http://library.afribary.com/works/halpernishikawa-type-iterative-method-for-approximating-fixed-points-of-non-self-pseudocontractive-mappings. Accessed June 14, 2026.
Chicago
"Halpern–Ishikawa type iterative method for approximating fixed points of non-self pseudocontractive mappings." Afribary (2026). Accessed June 14, 2026. http://library.afribary.com/works/halpernishikawa-type-iterative-method-for-approximating-fixed-points-of-non-self-pseudocontractive-mappings