Generalization of Point Interpolation Assessments of the Project Approximation of Functions, what Have a Fractional Derivative
We discuss whether on not it is possible to have interpolatory estimates in the approximation of a function of Sobolev`s space by polynomials. The problem of positive approximation is to estimate the pointwise degree of approximation of a function of r times continuously differentiable and positive...
Збережено в:
| Дата: | 2019 |
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| Автори: | , |
| Формат: | Стаття |
| Мова: | Ukrainian |
| Опубліковано: |
Кам'янець-Подільський національний університет імені Івана Огієнка
2019
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| Онлайн доступ: | http://mcm-math.kpnu.edu.ua/article/view/188980 |
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| Назва журналу: | Mathematical and computer modelling. Series: Physical and mathematical sciences |
Репозитарії
Mathematical and computer modelling. Series: Physical and mathematical sciences| Резюме: | We discuss whether on not it is possible to have interpolatory estimates in the approximation of a function of Sobolev`s space by polynomials. The problem of positive approximation is to estimate the pointwise degree of approximation of a function of r times continuously differentiable and positive functions on [0, 1]. Estimates of the form (1) for positive approximation are known ([1, 2]). The problem of monotone approximation is that of estimating the degree of approximation of a monotone nondecreasing function by monotone nondecreasing polynomials. Estimates of the form (1) for monotone approximation were proved in [3, 4, 8]. In [3, 4] is consider r is natural and r not equal one. In [8] is consider r is real and r more two. It was proved that for monotone approximation estimates of the form (1) are fails for r is real and r more two. The problem of convex approximation is that of estimating the degree of approximation of a convex function by convex polynomials. The problem of convex approximation is consider in ([5, 6]). In [5] is consider r is natural and r not equal one. In [6] is consider r is real and r more two. It was proved that for convex approximation estimates of the form (1) are fails for r is real and r more two. In [9] the question of approximation of function of Sobolev`s space and convex by algebraic convex polynomial is consider. It is proved, that for this function, estimate (1) is not true, if r is more three and less four generally speaking. In this paper the question of approximation of function Sobolev`s space and convex by algebraic convex polynomial is consider. This paper is the generalization of results papers [9] and [11]. It is proved, that for function of Sobolev`s space and convex, estimate of the type (1) is not true, generally speaking. The main result is the analog of the theorem 2.3 in [11]. |
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