Applied Scientific Research

, Volume 54, Issue 2, pp 137–160

Moving boundaries due to distributed sources in a slab

Authors

  • S. C. Gupta
    • Department of MathematicsIndian Institute of Science
Article

DOI: 10.1007/BF00864370

Cite this article as:
Gupta, S.C. Appl. Sci. Res. (1995) 54: 137. doi:10.1007/BF00864370

Abstract

Analytical and numerical solutions have been obtained for some moving boundary problems associated with Joule heating and distributed absorption of oxygen in tissues. Several questions have been examined which are concerned with the solutions of classical formulation of sharp melting front model and the classical enthalpy formulation in which solid, liquid and mushy regions are present. Thermal properties and heat sources in the solid and liquid regions have been taken as unequal. The short-time analytical solutions presented here provide useful information. An effective numerical scheme has been proposed which is accurate and simple.

Key words

moving boundarymushy regionweak enthalpy formulationoxygen-diffusion model

Nomenclature

AL, An Ān, AS

constants defined in equations (8), (26), (46) and (1) respectively

BL, Bn, BS

constants defined in equations (8), (73) and (1) respectively

c

specific heat, Jkg−1 °C−1

C1

constant defined in equation (4)

C2(V)

defined in equation (4)

D1,D2

constants defined in equation (15)

fL,S/n)(X),n = 1,2,3

initial temperatures defined in equation (22), temperature/Tm

H

enthalpy/ρcSTm

k

thermal diffusivity, m2 s−1

l

latent heat of fusion, Jkg−1

L

length of the slab, m

N

total member of mesh points =N + 1

Q

heat source in the mushy region, equation (12)

S(t)

sharp melting front,X =S(t)

S1(t)

solid/mush boundary,X =S1(t)

S2(y)

liquid/mush boundary,X =S2(y)

t

time/td

td

variable having dimensions of time,s

te

time at which mushy region disappears

t*

time at which liquid/mush boundary starts growing, equation (70)

T

temperature/Tm

Tm

melting temperature, °C

V

time defined in equation (23)

X

x-coordinate/L

y

time defined in equation (71)

Greek Symbols

α

defined by α2=ktd/L2

λ

l/cSTm

ρ

density which is equal in all the phases, kg/m3

ΔX

mesh size

Δy

time step for determining liquid/mush boundary

Subscripts

L

liquid region

M

mushy region

S

solid region

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Copyright information

© Kluwer Academic Publishers 1995