SOLUTION OF TWO-PHASE CYLINDRICAL DIRECT
STEFAN PROBLEM BY USING SPECIAL FUNCTIONS
IN ELECTRICAL CONTACT PROCESSES
Stanislav N. Kharin1,2, Targyn A. Naury1,2,3,4
1 Institute of Mathematics and Mathematical Modeling
Almaty – A26G7T4, KAZAKHSTAN
2 Kazakh British Technical University
Almaty – A05H1T2, KAZAKHSTAN
3 Al-Farabi Kazakh National University
Almaty – A15E3B4, KAZAKHSTAN
4 Satbayev University
Almaty – A15P4X4, KAZAKHSTAN

Abstract

In this work two-phase Stefan problem for the cylindrical heat equation is considered. One of the phase turns to zero at an initial time. In this case, it is difficult to solve it by radial heat polynomials because the equations are singular. The solution is represented in linear combination series of special functions, the Laguerre polynomial and confluent hypergeometric function. The free boundary is known. The undetermined coefficients of the heat in two phases and the heat flux are found. The convergence of special functions series is proved.

Citation details of the article



Journal: International Journal of Applied Mathematics
Journal ISSN (Print): ISSN 1311-1728
Journal ISSN (Electronic): ISSN 1314-8060
Volume: 34
Issue: 2
Year: 2021

DOI: 10.12732/ijam.v34i2.2

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