S. N. Kharin, T. A. Nauryz, “One-phase spherical Stefan problem with temperature dependent coefficients”, Eurasian Math. J., 2021, Volume 12, Number 1,Pages <nobr>49

This article is cited in 7 papers

One-phase spherical Stefan problem with temperature dependent coefficients

S. N. Kharin^ab, T. A. Nauryz^bca

^a Department of Mathematical and Computer Modeling, Institute of Mathematics and Mathematical Modeling, 125 Pushkin St, 050010 Almaty, Kazakhstan
^b Kazakh-British Technical University, 59 Tole bi St, 050000 Almaty, Kazakhstan
^c Al-Farabi Kazakh National University, 71/23 Al-Farabi St, 050040/A05E3B3 Almaty, Kazakhstan

Abstract: The one-phase spherical Stefan problem with coefficients depending on the temperature is considered. The method of solving is based on the similarity principle, which enables us to reduce this problem to a nonlinear ordinary differential equation, and then to an equivalent nonlinear integral equation of the Volterra type. It is shown that the obtained integral operator is a contraction operator and a unique solution exists.

Keywords and phrases: Stefan problem, nonlinear thermal coefficients, explicit solution, nonlinear integral equation, melting.

MSC: 80A22, 35K05, 45D05

Received: 01.10.2020
Revised: 31.01.2021

Language: English

DOI: 10.32523/2077-9879-2021-12-1-49-56