Preview

User

Not a user? Register with this site Forgot your password?

Doklady of the National Academy of Sciences of Belarus

Advanced search

EXTREMAL PROPERTY OF THE HERMITE–PADÉ APPROXIMATIONS OF EXPONENTIAL FUNCTIONS

Abstract

In this article we study the extremal properties of the Hermite–Padé approximations of type I for the exponential system {eλpz}kp=0 with different arbitrary real and complexes λ0, λ1, …, λkThe theorems proved complement the known results of P. Borwein, F. Wielonsky, K. Driver.

About the Authors

A. P. STAROVOITOV
FFrancisk Skorina Gomel State University, Gomel
Belarus


A. P. KECHKO
Francisk Skorina Gomel State University, Gomel
Belarus


References

1. Mahler, K. Perfect systems / K. Mahler // Comp. Math. – 1968. – Vol. 19. – P. 95–166.

2. Hermite, C. Sur la généralisation des fractions continues algébriques / C. Hermite // Ann. Math. Pura. Appl. Ser. 2A. – 1883. – Vol. 21. – P. 289–308.

3. Hermite, C. Sur la fonction exponentielle / C. Hermite // C.R. Acad. Sci. (Paris). – 1873. – Vol. 77. – P. 18–24, 74–79, 226–233, 285–293.

4. Старовойтов, А. П. Квадратичные аппроксимации Эрмита–Паде экспоненциальных функций / А. П. Старовойтов // Изв. Саратовского ун-та. Новая серия. Сер. Математика. Механика. Информатика. – 2014. – Т. 14, вып. 4, ч. 1. – С. 387–395.

5. Астафьева, А. В. Экстремальные свойства аппроксимаций Эрмита–Паде экспоненциальных функций / А. В. Астафьева, А. П. Старовойтов // Докл. НАН Беларуси. – 2014. – Т. 58, № 2. – С. 32–37.

6. Бейкер, Дж. мл. Аппроксимации Паде / Дж. Бейкер, мл., П. Грейвс-Моррис. – М.: Мир, 1986.

7. Driver, K. Nondiagonal Hermite–Padé approximation to the exponential function / K. Driver // J. Comput. Appl. Math. – 1995. – Vol. 65. – P. 125–134.

8. Borwein, P. B. Quadratic Hermite–Padé approximation to the exponential function / P. B. Borwein // Const. Approx. – 1986. – Vol. 62. – P. 291–302.

9. Wielonsky, F. Asymptotics of Diagonal Hermite–Padé Approximants to ez / F. Wielonsky // J. Approx. Theory. – 1997. –

10. Vol. 90, N 2. – P. 283–298.

11. Petrushev, P. P. Rational approximation of real functions / P. P. Petrushev, V. A. Popov. – Cambridge: University Press, 1987.

12. Старовойтов, А. П. Эрмитовская аппроксимация двух экспонент / А. П. Старовойтов // Изв. Саратовского ун-та. Новая серия. Сер. Математика. Механика. Информатика. – 2013. – Т. 13, вып. 1, ч. 2. – С. 88–91.

13. Braess, D. On the conjecture of Meinardus on rational approximation of ez / D. Braess // J. Approx. Theory. – 1984. – Vol. 40, N 4. – P. 375–379.


Review

Views: 894


Creative Commons License
This work is licensed under a Creative Commons Attribution 4.0 License.


ISSN 1561-8323 (Print)
ISSN 2524-2431 (Online)

Room 119, 1 Akademichnaya Street, Minsk BY-220072, Republic of Belarus, 
phone +375 17 272 19 19, e-mail: doklady_nanb@mail.ru
Room 318, 40 Fr.Skaryny Street, Minsk BY-220141, Republic of Belarus
The Republican Unitary Enterprise Publishing House "Belaruskaya Navuka",
phone: +375 17 368-47-00, phone/fax: +375 17 373 86 18;
e-mail: info@belnauka.by , zavred@belnauka.by

supported by NEICON (Ejournal lab)