@article{Temirgaliyev_Г.Е.Таугынбаева_Ш.К.Абикенова_2019, title={Discretization of solutions of partial differential equations in the context of the Computational (numerical) diameter}, volume={126}, url={https://bulmathmc.enu.kz/index.php/main/article/view/39}, abstractNote={<p>Since 1996, the idea of a Computational (numerical) diameter has been consistently developed, the goal of<br>which is to optimally computer process models of mathematical models in real conditions of distorted data.<br>The C(N)D-scheme, in our opinion, determines the refined organization of research in Approximation theory, Computational mathematics, and Numerical analysis.<br>The paper is devoted to the coverage of the C(N)D -approach in the theory of partial differential equations. The examples<br>of the historically original Laplace, Poisson, heat conduction, wave and, relatively recently Klein-Gordon equations give<br>theorems as illustrative results of the quality and efficiency of C(N)D-productions.<br>The presented materials can serve to continue the study of the optimal discretization of solutions of partial differential<br>equations with further expansion and deepening of the proposed direction.</p>}, number={1}, journal={BULLETIN OF THE L.N. GUMILYOV EURASIAN NATIONAL UNIVERSITY. Mathematics. Computer science. Mechanics series}, author={Temirgaliyev Н. and Г.Е.Таугынбаева and Ш.К.Абикенова}, year={2019}, month={Jan.}, pages={8–51} }