On real solutions of systems of equations

Systems of equations f1 = = fn−1 = 0 in ℝn = {x} having the solution x = 0 are considered under the assumption that the quasi-homogeneous truncations of the smooth functions f1,.., fn−1 are independent at x ≠ 0. It is shown that, for n ≠ 2 and n ≠ 4, such a system has a smooth solution which passes through x = 0 and has nonzero Maclaurin series. © 2017, Springer Science+Business Media, LLC, part of Springer Nature.

Authors

Kozlov V.V. ^1, ²

Journal

Functional Analysis and its Applications

Number of issue

Language

English

Pages

306-309

Status

Published

Link

External link

DOI

10.1007/s10688-017-0197-9

Volume

Year

2017

Organizations

¹ Steklov Mathematical Institute of Russian Academy of Sciences, Moscow, Russian Federation
² RUDN University, Moscow, Russian Federation

Keywords

asymptotic solution; quasi-homogeneous truncation

Date of creation

19.10.2018

Date of change

19.10.2018

Short link

https://repository.rudn.ru/en/records/article/record/5277/

ON FLUX INTEGRALS FOR GENERALIZED MELVIN SOLUTION RELATED TO SIMPLE FINITE-DIMENSIONAL LIE ALGEBRA

Article

Ivashchuk V.D.

European Physical Journal C. Springer New York LLC. Vol. 77. 2017.

ERRATUM TO: ON STABLE EXPONENTIAL SOLUTIONS IN EINSTEIN–GAUSS–BONNET COSMOLOGY WITH ZERO VARIATION OF G (GRAVITATION AND COSMOLOGY, (2016), 22, 4, (329-332), 10.1134/S0202289316040095)

Article

Ivashchuk V.D.

Gravitation and Cosmology. Vol. 23. 2017.

On real solutions of systems of equations

Other records

ON FLUX INTEGRALS FOR GENERALIZED MELVIN SOLUTION RELATED TO SIMPLE FINITE-DIMENSIONAL LIE ALGEBRA

ERRATUM TO: ON STABLE EXPONENTIAL SOLUTIONS IN EINSTEIN–GAUSS–BONNET COSMOLOGY WITH ZERO VARIATION OF G (GRAVITATION AND COSMOLOGY, (2016), 22, 4, (329-332), 10.1134/S0202289316040095)