MATHEMATICAL MODELING AND COMPUTATIONAL PHYSICS 2019 (MMCP 2019).
E D P SCIENCES.
Vol. 226.
2020.
Construction of Multivariate Interpolation Hermite Polynomials for Finite Element Method
A new algorithm for constructing multivariate interpolation Hermite polynomials in analytical form in a multidimensional hypercube is presented. These polynomials are determined from a specially constructed set of values of the polynomials themselves and their partial derivatives with continuous derivatives up to a given order on the boundaries of the finite elements. The efficiency of the finite element schemes, algorithms and programs is demonstrated by solving the Helmholtz problem for a cube.
Authors
Chuluunbaatar G.
1,
2
,
Gusev A.A.
1
,
Chuluunbaatar O.
1,
3
,
Gerdt V.P.
1,
2
,
Vinitsky S.I.
1,
2
,
Derbov V.L.
4
,
Gozdz A.
5
,
Krassovitskiy P.M.
1,
6
,
Hai L.L.
7
Conference proceedings
Publisher
E D P SCIENCES
Language
English
Status
Published
Number
02007
Volume
226
Year
2020
Organizations
- 1 Joint Inst Nucl Res, Dubna, Russia
- 2 Peoples Friendship Univ Russia, RUDN Univ, Moscow, Russia
- 3 Mongolian Acad Sci, Inst Math & Digital Technol, Ulaanbaatar, Mongolia
- 4 Saratov NG Chernyshevskii State Univ, Saratov, Russia
- 5 Univ M Curie Sklodowska, Inst Phys, Lublin, Poland
- 6 Inst Nucl Phys, Alma Ata, Kazakhstan
- 7 Ho Chi Minh City Univ Educ, Ho Chi Minh City, Vietnam
Date of creation
20.04.2021
Date of change
20.04.2021
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MATHEMATICAL MODELING AND COMPUTATIONAL PHYSICS 2019 (MMCP 2019).
E D P SCIENCES.
Vol. 226.
2020.