Theory of Radon Transform in the Concept of Computational (Numerical) Diameter and Methods of the Quasi-Monte Carlo Theory

Temirgaliyev, N.; Abikenova, Sh.K.; Azhgaliyev, Sh.U.; Taugynbayeva, G.E.; Zhubanysheva, A.Zh.

dc.contributor.author	Temirgaliyev, N.
dc.contributor.author	Abikenova, Sh.K.
dc.contributor.author	Azhgaliyev, Sh.U.
dc.contributor.author	Taugynbayeva, G.E.
dc.contributor.author	Zhubanysheva, A.Zh.
dc.date.accessioned	2023-06-09T06:48:31Z
dc.date.available	2023-06-09T06:48:31Z
dc.date.issued	2019
dc.identifier.issn	2616-7182
dc.identifier.uri	http://rep.enu.kz/handle/enu/2226
dc.description.abstract	In the paper is shown that results of C(N)D-recovery of derivatives by the value at the point with using just only one relationships kfkWr 2 (0,1)s kRfk W r+ s−1 2 2 (0,1)s implies Radon’s scanning algorithm of an arbitrary open (not necessarily connected) bounded set, which is optimal among the all computational aggregates, constructed by arbitrary linear numerical information from the considered object with indicating the boundaries of the computational error, not affecting the final result.	ru
dc.language.iso	en	ru
dc.publisher	L.N.Gumilyov Eurasian National University	ru
dc.subject	Radon transform	ru
dc.subject	Sobolev space	ru
dc.subject	Computational (numerical) diameter (C(N)D)	ru
dc.subject	recovery by accurate and inaccurate information	ru
dc.subject	computational unit	ru
dc.subject	discrepancy	ru
dc.subject	uniformly distributed grids	ru
dc.subject	Korobov grids	ru
dc.subject	optimal coefficients	ru
dc.title	Theory of Radon Transform in the Concept of Computational (Numerical) Diameter and Methods of the Quasi-Monte Carlo Theory	ru
dc.type	Article	ru