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Φ- α(⋅)-K-monotone multifunctions with values in ordered Banach space with increasing norm

Rolewicz S.

Control and Cybernetics

2013

Vol. 42, no. 4

793--803

Let (X, d) be a metric space. Let Y be an ordered Banach space with increasing norm. Let Φ be a separable linear family (a class) of Lipschitz functions defined on X and with values in Y . Let α(⋅) be a nondecreasing function mapping the interwal [0,+∞) into itself such that limt↓0 α(t) / t = 0. We say that a multifunction mapping X into Φ is Φ -α(⋅)-K-monotone if for all k in the interior of K, k ∈ Int K, there is a constant Ck > 0 such that for all φx ∈Γ (x),φy ∈Γ (y) we have φx(x) + φy(y) − φx(y) − φy(x) ≥K −Ckα(d(x, y))k.It is shown in the paper that under certain conditions on each Φ - Φα(⋅)-K-monotone multifunction is single-valued and continuous on a dense G δ-set..

On uniformly approximate convex vector-valued function

Rolewicz S.

Control and Cybernetics

2012

Vol. 41, no. 2

443-462

Let X, Y be real Banach spaces. Let Z be a Banach space partially ordered by a pointed closed convex cone K. Let f(·) be a locally uniformly approximate convex function mapping an open subset ΩY ⊂ Y into Z. Let ΩX ⊂ X be an open subset. Let σ(·) be a differentiable mapping of ΩX into ΩY such that the differentials of σ/x are locally uniformly continuous function of x. Then f(σ(·)) mapping X into Z is also a locally uniformly approximate convex function. Therefore, in the case of Z = Rn the composed function f(σ(·)) is Frechet differentiable on a dense Gδ-set, provided X is an Asplund space, and Gateaux differentiable on a dense Gδ-set, provided X is separable. As a consequence, we obtain that in the case of Z = Rn a locally uniformly approximate convex function defined on a C1,uE -manifold is Frechet differentiable on a dense Gδ-set, provided E is an Asplund space, and Gateaux differentiable on a dense Gδ-set, provided E is separable.

Approximation of vector-valued functions by polynomials with coefficients in normed spaces applications

Anastassiou G., Gal S.

Demonstratio Mathematica

2006

Vol. 39, nr 3

539-552

In this paper we prove basic results in the approximation of vector-valued functions by polynomials with coefficients in normed spaces, called generalized polynomials. Thus we obtain : estimates in terms of Ditzian-Totik Lp-moduli of smoothness for approximation by Bernstein-Kantorovich generalized polynomials and by other kinds of operators like the Szasz-Mirakian operators, Baskakov operators, Post-Widder operators and their Kantorovich analogues and inverse theorems for these operators. Applications to approximation of random functions and of fuzzy-number-valued functions are given.