Heat transfer of phase-change materials in two-dimensional cylindrical coordinates
Abstract
Two-dimensional phase-change problem is numerically solved in cylindrical coordinates (r and z) by utilizing two Taylor series expansions for the temperature distributions in the neighborhood of the interface location. These two expansions form two polynomials in r and z directions. For the regions sufficiently away from the interface the temperature field equations are numerically solved in the usual way and the results are coupled with the polynomials. The main advantages of this efficient approach include ability to accept arbitrarily time dependent boundary conditions of all types and arbitrarily specified initial temperature distributions. A modified approach using a single Taylor series expansion in two variables is also suggested.
- Publication:
-
AIAA, 16th Thermophysics Conference
- Pub Date:
- June 1981
- Bibcode:
- 1981thph.confR....L
- Keywords:
-
- Conductive Heat Transfer;
- Cylindrical Coordinates;
- Energy Storage;
- Phase Transformations;
- Thermal Conductivity;
- Annuli;
- Cylinders;
- Taylor Series;
- Temperature Distribution;
- Fluid Mechanics and Heat Transfer