International Journal on Minority and Group Rights. Том 10. 2003. С. 203-220
Parametric basis functions for collective nuclear models
We consider calculation schemes in the framework of the Kantorovich method ? reduction of a elliptic boundary-value problem to a system of second order ordinary differential equations (ODEs) using the surface functions depending on the ODEs-independent variable as a parameter. We propose construction of the new parametric surface basis functions in an analytical form for solving the boundary-value problem of a quadrupole vibration collective nuclear model.
Авторы
Gusev A.A. 1 , Vinitsky S.I. 1, 2 , Góźdź A. 3 , Dobrowolski A. 3
Номер выпуска
1
Язык
English
Страницы
99-105
Статус
Published
Том
10
Год
2017
Организации
- 1 Joint Institute for Nuclear Research, Dubna, Russian Federation
- 2 RUDN University, 6 Miklukho-Maklaya st., Moscow, 117198, Russian Federation
- 3 Institute of Physics, Maria Curie Skłodowska University, Lublin, Poland
Ключевые слова
Boundary value problems; Differential equations; Functions; Vibration analysis; Analytical forms; Calculation scheme; Elliptic boundary value problem; Independent variables; Kantorovich method; Parametric surfaces; Second-order ordinary differential equations; Surface functions; Ordinary differential equations
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Другие записи
Gigiena i Sanitariya. Том 96. 2017. С. 1091-1096