Publication detail
ON ANALOGUE OF BLOW-UP SOLUTIONS FOR A DISCRETE VARIANT OF SECOND–ORDER EMDEN–FOWLER DIFFERENTIAL EQUATION
DIBLÍK, J. KOROBKO, E.
Original Title
ON ANALOGUE OF BLOW-UP SOLUTIONS FOR A DISCRETE VARIANT OF SECOND–ORDER EMDEN–FOWLER DIFFERENTIAL EQUATION
Type
article in a collection out of WoS and Scopus
Language
English
Original Abstract
A nonlinear second-order discrete equation of Emden--Fowler type $$ \Delta^2 v(k) = - k^s \left(\Delta v(k)\right)^3 $$ is studied for $k\to \infty$, where $s\not= 1$ is a real number, $v$ is an unknown function, $\Delta v(k) = v(k+1) - v(k)$, and $\Delta^2 v(k) = v(k+2) - 2v(k+1)+v(k)$. This equation is a discrete analogue of Emden-Fowler second-order differential equation $$ y''(x) = y^s(x), $$ having non-continuable blow--up solutions.
Keywords
blow-up solution; Emden--Fowler equation; discrete equation
Authors
DIBLÍK, J.; KOROBKO, E.
Released
27. 6. 2022
Location
Porto, Portugal
ISBN
978-989-53496-3-0
Book
International Conference on Mathematical Analysis and Applications in Science and Engineering – Book of Extended Abstracts
Pages from
297
Pages to
300
Pages count
4
BibTex
@inproceedings{BUT178416,
author="Josef {Diblík} and Evgeniya {Korobko}",
title="ON ANALOGUE OF BLOW-UP SOLUTIONS FOR A DISCRETE VARIANT OF SECOND–ORDER EMDEN–FOWLER DIFFERENTIAL EQUATION",
booktitle="International Conference on Mathematical Analysis and Applications in Science and Engineering – Book of Extended Abstracts",
year="2022",
pages="297--300",
address="Porto, Portugal",
doi="doi.org/10.34630/20734",
isbn="978-989-53496-3-0"
}