Наближення розв’язку крайової задачі інтерполяційним функціональним поліномом другого порядку

The work considers a boundary value problem of the second order. For the approximate solution of this boundary value problem, an interpolation functional Newton polynomial of the second order is constructed on a continuous set of nodes. It is known that the fulfillment of the substitution rule is a...

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Bibliographic Details
Date:2023
Main Author: Demkiv, Ihor
Format: Article
Language:Ukrainian
Published: Інститут прикладних проблем механіки і математики ім. Я. С. Підстригача НАН України 2023
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Online Access:https://www.fmmit.lviv.ua/index.php/fmmit/article/view/279
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Journal Title:Physico-mathematical modeling and informational technologies
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Physico-mathematical modeling and informational technologies
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Summary:The work considers a boundary value problem of the second order. For the approximate solution of this boundary value problem, an interpolation functional Newton polynomial of the second order is constructed on a continuous set of nodes. It is known that the fulfillment of the substitution rule is a necessary and sufficient condition for the specified polynomial to be interpolating for the solution of the boundary value problem on a continuous set of interpolating nodes. It is shown that the substitution rule holds for this functional Newton polynomial of the second order. To find the Green's function of the corresponding boundary value problem, we reduce it to Cauchy problems. The resulting differential equations have a piecewise constant coefficient, so it can be found in an explicit form. In this way, we obtain an interpolation functional polynomial of the Newton type of the second degree, which will be an approximation to the solution of the boundary value problem.