[PDF] Top 20 Propiedades mecánicas de mezclas bituminosas en caliente fabricadas con áridos reciclados de residuos Silestone®

... the Four-step fixed point iterative scheme by Noor iterative scheme defined by ...Ishikawa iterative scheme defined by (4.6), Mann Iterative ... See full document

... of contractive-like operators. We also prove some data dependence results for these new iteration and S-iteration schemes for contractive-like ... See full document

... The data dependence abounds in literature of fixed point theory when dealing with Picard- Banach iteration, but is quasi-inexistent when dealing with Mann-Ishikawa ...only ... See full document

... [9] J.O. Olaleru, H. Akewe,” On multistep iterative scheme for approximating the common fixed points of contractive-like operators”, Int. Journal of Mathematics and mathematical ... See full document

... and data dependence results for multistep fixed point itera- tive schemes using a class of contractive-like operators in convex metric ... See full document

... on data dependence for Picard iteration are in [2, 16]. Data dependence for Mann and Ishikawa iterations using contraction condition ...[17,18]. Data dependence for Ishikawa ... See full document

... on fixed point theory was established by Polish Mathematician Stefan Ba- nach [5] in ...Banach fixed point theorem or Contraction mapping theorem. Banach fixed point theorem has ... See full document

... one−step iterative process for an α − nonexpan- sive mapping and a mapping satisfying condition (C) in the framework of a convex metric ...the iterative process to the common fixed ... See full document

... goal point, three starting points and varying number of obstacles (L, T and Boxes ...were fixed with high temperature values, whereas the goal point was set to very low temperature, and all other ... See full document

... of fixed points of T. A mapping f : C  C is said to be contractive with coefficient   (0,1), if f (u) f (v)    u  v , u, v   ...new iterative schemes for finding element in F(S)  VI(C, B), ... See full document

... By using computer programs in C++ the comparison of the rate of convergence of CR, SP and Noor iterative procedures to a fixed point of T is shown in the following table, with x 0  0.9 and a n  ... See full document

... new fixed point theorems for semi-closed 1- set-contractive operators and existence theorems of solutions for the equation Ax = μx which generalize a great deal of well-known results and ... See full document

... our iterative scheme ...al.’s iterative one (.). Here, Xu’s iterative scheme in [, Theorem ...our four-step iterative scheme ...fixed point problem ... See full document

... Jungck-Ishikawa iterative process used in [13] is a special case of the modified three-step iterative scheme ...generalized contractive-like operator ... See full document

... some fixed point theorems of con- tractive mappings on complete cone metric space with the as- sumption of normality of a ...of fixed points and common fixed points of mappings satisfying ... See full document

... the fixed point theorems of a contraction mapping for cone metric spaces; Any mapping T of a complete cone metric space X into itself that satisfies, for some 0 ≤ k < 1, the inequality d ( Tx, Ty ) ≤ kd ... See full document

... Example 2.3. Let X = [0, ∞) be equipped with the b-metric-like d(x, y) = (x + y) 2 for all x, y ∈ X , where b = 2. Define a relation on X by x y iff y ≤ x, the functions f , g : X → X by f x = ln(1 + 13 x ) and f ... See full document

... One of the most attractive areas of the fixed point theory is the existence of fixed points in a metric space respect to a given graph. Recently Jachymski [? ] has given some generalizations of the ... See full document

... Theorem 2.1. Let C be a nonempty closed convex subset of a complete CAT(0) space. Let S, T : C → C be two commuting mappings such that T is continuous, one-to-one, sub- sequentially convergent and S: C → C is a T-Ciric ... See full document

... Proof Suppose that x ∗ is the solution of the system Sx = f = Tx. Define G, G : X → X by Gx = f + (I – S)x and G x = f + (I – T )x, respectively. Since S and T are nonexpansive and uniformly continuous φ -strongly ... See full document