On a System without Critical Points Arising in Heat Conductivity Theory

Inna Samuilika; Felix Sadyrbaev

On a System without Critical Points Arising in Heat Conductivity Theory

WSEAS Transactions on Heat and Mass Transfer 2022
Inna Samuilika, Felix Sadyrbaev

A two-point boundary value problem for the second order nonlinear ordinary differential equation, arising in the heat conductivity theory, is considered. Multiplicity and existence results are established for this problem, where the equation contains two parameters.

Keywords
heat conductivity, nullclines, phase portrait, Cauchy problems, bifurcation curves
DOI
10.37394/232012.2022.17.17
Hyperlink
https://wseas.com/journals/hmt/2022/a345113-014(2022).pdf

Samuilika, I., Sadyrbaev, F. On a System without Critical Points Arising in Heat Conductivity Theory. WSEAS Transactions on Heat and Mass Transfer, 2022, Vol. 17, No. 1, pp.151-160. ISSN 1790-5044. e-ISSN 2224-3461. Available from: doi:10.37394/232012.2022.17.17

Publication language
English (en)

Publication Type
Scientific article indexed in SCOPUS or WOS database
Funding for basic activity
National Research Programme
Field of research
1. Natural sciences
Sub-field of research
1.1 Mathematics
Research platform
None
ID: 35147
Citation count

2