Quasi-stationary approximation for the Stefan problem with a convective boundary condition
It is shown the solution to the Stefan problem with a convective boundary condition tends to the quasi-stationary approximation as the specific heat tends to zero. Additional properties of the approximation are given, and some examples are presented.
- Research Organization:
- Oak Ridge National Lab., TN (USA)
- DOE Contract Number:
- W-7405-ENG-26
- OSTI ID:
- 6218971
- Report Number(s):
- ORNL/CSD-84; ON: DE81030372
- Country of Publication:
- United States
- Language:
- English
Similar Records
Stefan problem with a convective boundary condition
Stefan problem with a convective boundary condition
Development of Modified Perturbation Solutions to the One-Phase Stefan Problems With a Convective Boundary
Journal Article
·
Thu Jul 01 00:00:00 EDT 1982
· Q. Appl. Math.; (United States)
·
OSTI ID:5037832
Stefan problem with a convective boundary condition
Technical Report
·
Sat Aug 01 00:00:00 EDT 1981
·
OSTI ID:6290477
Development of Modified Perturbation Solutions to the One-Phase Stefan Problems With a Convective Boundary
Conference
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Sun Feb 04 23:00:00 EST 2024
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OSTI ID:2325038
Related Subjects
657006* -- Theoretical Physics-- Statistical Physics & Thermodynamics-- (-1987)
71 CLASSICAL AND QUANTUM MECHANICS
GENERAL PHYSICS
BOLTZMANN EQUATION
BOUNDARY CONDITIONS
CONVECTION
DIFFERENTIAL EQUATIONS
ENERGY TRANSFER
EQUATIONS
HEAT TRANSFER
MELTING
NUMERICAL SOLUTION
PARTIAL DIFFERENTIAL EQUATIONS
PHASE TRANSFORMATIONS
71 CLASSICAL AND QUANTUM MECHANICS
GENERAL PHYSICS
BOLTZMANN EQUATION
BOUNDARY CONDITIONS
CONVECTION
DIFFERENTIAL EQUATIONS
ENERGY TRANSFER
EQUATIONS
HEAT TRANSFER
MELTING
NUMERICAL SOLUTION
PARTIAL DIFFERENTIAL EQUATIONS
PHASE TRANSFORMATIONS