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Let A : C → H be a monotone, L-Lipschitz continuous mapping, and f : C → C be a contraction with contractive constant α ∈ (0, 1).
Let C be a nonempty, closed, and convex sunny nonexpansive retract of E, and (Q_{C}) be the sunny nonexpansive retraction of E onto C. Let (f : C rightarrow C ) be a contraction with contractive constant (k in (0,1)).
Let C be a nonempty, closed, and convex sunny non-expansive retract of E, and (Q_{C}) be the sunny non-expansive retraction of E onto C. Let (f : C rightarrow C) be a contraction with contractive constant (k in 0,1)), (T: C rightarrow C) be a strongly positive linear bounded operator with coefficient γ̅.
Let A : C → H be a monotone and L-Lipschitz continuous mapping, f : C → C be a contraction with contractive constant α ∈ (0, 1) and S : C → C be a uniformly continuous asymptotically κ-strict pseudocontractive mapping in the intermediate sense with sequence {γ n } such that F(S) ∩ Ω ≠ ∅ and.
Let f : H → H be a contraction with the contractive constant α ∈ (0, 1).
Let (f Crightarrow C) be a contraction with the contractive constant (kappain 0,1)).
Let (phi: H rightarrow H) be a contraction with the contractive coefficient (kin[0,1)).
Let (phi: Hrightarrow H) be a contraction with the contractive coefficient (kin[0,1)).
Let C be a nonempty, closed, and convex subset of H and let (f Crightarrow C) be a contraction with the contractive constant (kappain 0,1)).
Let A be a strongly positive bounded linear operator on C with coefficient γ ̄ and f: C → C be a contraction with the contractive constant (0 < α < 1) such that 0 < γ < γ ̄ α.
Similar(1)
Let be a contraction with coefficient.
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Justyna Jupowicz-Kozak
CEO of Professional Science Editing for Scientists @ prosciediting.com