Abstract

The necessary and sufficient algebraic conditions are found for the existence of a solution of the boundary value problem for the quasilinear, non-stationary heat conduction equation with an unknown moving domain boundary under the condition that it is a similarity process. A uniqueness theorem is proved and the convergence of the iterational method is established.

Talk to us

Join us for a 30 min session where you can share your feedback and ask us any queries you have

Schedule a call

Similar Papers

Paper Title
Journal
Date
Author
Integral Transformations for the Generalized Nonstationary Heat Conduction Equation in a Limited Region
É M Kartashov
Journal of Engineering Physics and Thermophysics | VOL. 92
É M KartashovÉ M Kartashov
01 Jan 2019
Analysis of a heat wave induced by laser radiation absorption in an optical fiber on the basis of a 2D nonstationary heat conduction equation
R I Golyatina ... A N Tkachev
Technical Physics | VOL. 50
R I Golyatina, et. al.R I Golyatina ... A N Tkachev
01 Feb 2005
Integral Transformations for the Generalized Equation of Nonstationary Heat Conduction in a Partially Bounded Region
É M Kartashov
Journal of Engineering Physics and Thermophysics | VOL. 90
É M KartashovÉ M Kartashov
01 Nov 2017
An Operational Calculus Method In Spherical Co-ordinate For Some Mixed Boundary Problems
G.C Dubey ... Pius Kumar
Science Park | VOL. 1
G.C Dubey, et. al.G.C Dubey ... Pius Kumar
01 Sep 2013
View more papers

More From: USSR Computational Mathematics and Mathematical Physics

Paper Title
Journal
Date
Author
Convergence of difference schemes of the reference-operator method to generalized solutions of the axisymmetric Poisson equation
A.A Denisov ... Yu.A Poveshchenko
USSR Computational Mathematics and Mathematical Physics | VOL. 30
A.A Denisov, et. al.A.A Denisov ... Yu.A Poveshchenko
01 Jan 1990
A numerical method of control optimization in delay systems for immune response modelling
A.S Buldayev
USSR Computational Mathematics and Mathematical Physics | VOL. 30
A.S BuldayevA.S Buldayev
01 Jan 1990
Approximation of bounded solutions and exponential dichotomy on an axis
D.S Dzhumabayev
USSR Computational Mathematics and Mathematical Physics | VOL. 30
D.S DzhumabayevD.S Dzhumabayev
01 Jan 1990
A numerical method for solving Hill's equation in problems of quantum mechanics
V.A Lukin ... V.M Pshenichnikov
USSR Computational Mathematics and Mathematical Physics | VOL. 30
V.A Lukin, et. al.V.A Lukin ... V.M Pshenichnikov
01 Jan 1990
View more papers

Disclaimer: All third-party content on this website/platform is and will remain the property of their respective owners and is provided on "as is" basis without any warranties, express or implied. Use of third-party content does not indicate any affiliation, sponsorship with or endorsement by them. Any references to third-party content is to identify the corresponding services and shall be considered fair use under The CopyrightLaw.