Issue Section:
Technical Briefs
1.
Ang
W. T.
Kusuma
J.
Clements
D. L.
1997
, “A boundary element method for a second order elliptic partial differential equation with variable coefficients
,” Engineering Analysis with Boundary Elements
, Vol. 18
, pp. 311
–316
.2.
Bear, J., 1972, Dynamics of Fluids in Porous Media, Elsevier, New York, pp. 198–199.
3.
Brebbia, C. A., and Dominguez, J., 1989, Boundary Elements An Introductory Course, 2nd Ed., McGraw-Hill, New York, pp. 123–125.
4.
Carslaw, H. S., and Jaeger, J. C, 1947, Conduction of Heat in Solids, Clarendon Press, Oxford, pp. 28–31.
5.
Cheng
A. H. D.
1984
, “Darcy’s flow with variable permeability: A boundary integral solution
,” Water Resources Research
, Vol. 20
, pp. 980
–984
.6.
Clements
D. L.
1980
, “A boundary integral equation method for the numerical solution of a second order elliptic equation with variable coefficients
,” Journal of the Australian Mathematical Society
, Vol. 22
(Series B), pp. 218
–228
.7.
Clements, D. L., 1981, Boundary Value Problems Governed by Second Order Elliptic Systems, Pitman, London, pp. 135–155.
8.
Clements
D. L.
Larsson
A.
1993
, “A boundary element method for the solution of a class of time dependent problems for inhomogeneous media
,” Communications in Numerical Methods in Engineering
, Vol. 9
, pp. 111
–119
.9.
Clements
D. L.
Rogers
C.
1984
, “A boundary integral equation for the solution of a class of problems in anisotropic inhomogeneous thermostatics and elastostatics
,” Quarterly of Applied Mathematics
, Vol. 41
, pp. 99
–105
.10.
Rangogni, R., 1987, “A solution of Darcy’s flow with variable permeability by means of B.E.M and perturbation techniques,” Boundary Elements IX, Vol. 3, C. A. Brebbia ed., Springer-Verlag, Berlin, pp. 359–368.
11.
Sawaf
B.
O¨zisik
M. N.
Jarny
Y.
1995
, “An inverse analysis to estimate linearly dependent thermal conductivity components and heat capacity of an orthotropic medium
,” International Journal of Heat and Mass Transfer
, Vol. 38
, pp. 3005
–3010
.12.
Shaw
R. P.
1994
, “Green’s functions for heterogeneous media potential problems
,” Engineering Analysis with Boundary Elements
, Vol. 13
, pp. 219
–221
.
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