A NUMERICAL METHOD FOR SOLVING A TWO-DIMENSIONAL DIFFUSION EQUATION WITH NON LOCAL BOUNDARY CONDITIONS

M.Siddique, “Numerical Computatinal of Two-dimensional Diffusion Equation with Nonlocal Boundary Conditions,” IAENG international journal of applied mathematics, 40:1, IJAM_40_1_04

G.Adomian, Solving Frontier Problems of Physics: The Decomposition Method, Kluver Academic Publishers, Boston 1994.

G.Adomian and R.Rach, “Noise Terms in Decomposition Solution series,” Computers Math. Appl, 24(11) (1992),61-4.

G. Adomian, “A review of The decomposition Method in Applied Mathematics,” J.Math.Anal.Appl, 135 (1988),501-544.

A.M.Wazwaz, “Necessary Conditions for The appearance of Noise Terms in Decomposition Solution Series,” J.Math.Anal.Appl. 5 (1997),265-274.

Cannon,J.R ,Y.Lin and S.Wang. "An Implicit Finite Difference Scheme for the Diffusion Equation Subject to Mass Specification",Int.J.Eng.Sci.28 (1990),573-578.

Cannon;J.R and Van der Hoek, J. “Diffusion equation Subject to the Specification of Mass,” J.Math.Anal.Appl., 115.pp.517-529,1986.

Capsso,V. and Kunish, K.A, “ reaction Diffusion stem Arising in Modeling Man-Environment Diseases,” Q.Appl.Math.46, pp 431-439.1988

Day.W.A, “Existence of A property of Solutions of The heat to Linear Thermoelasticity And other Theories,” Quart.Appl.Math. 40, pp.319- 330,1982.

Wang.S. “A numerical Method for The heat Conduction Subject to Moving Boundary Energy Specification,” Intern.J.Engng.Sci, 28, 543-546, 1991

Noye,B.J. and Hayman, K.J.Explicit, “Two Level Finite Difference Methods for the Two-Dimensional Diffusion Equation,” Intern. J. Computr. Math.42, pp.223-236.1992

Wang.S. and Lin.Y.,A Finite Difference Solution to An Inverse Problem Determining a Controlling Function in a Parabolic Partial Differential Equation. Inverse Problems.5.pp.631-640.

B.A.Wade, A.Q.M.Khaliq ,M.Siddique and M.Yousuf, "Smoothing with Positivity-Preserving Padè Schemes for Parabolic Problems with Non Smooth Data", Numerical Methods for Partial Differential Equations (NMPDE),Wiley Interscience;V.21.No 3.2005,pp.553- 573.

B.A.Wade,A.Q.M.Khaliq,M.Yousuf and J.Vigo-Aguiar" High-Order Smoothing Schemes For Inhomogeneous Parabolic problems with Application to Non smooth Payoff In option Pricing" Numerical Methods for Partial Differential Equations (NMPDE) V.23(5).2007,1249-1276. 10

A.B.Gumel,W.T.Ang And F.H.Twizell."Efficient Parallel Algo rithm for The Two-Dimensional Diffusion Equation Subject to Specification of Mass" Intern. J. Computer Math. Vol 64,p 153-163 (1997).

G.D.Smith, "Numerical Solution for Partial Differential Equa- tions Finite Difference Methods", Third Edition, Oxford University Press, New york (1985).

A.Q.M.Khaliq,E.H.Twizell And D.A.Voss."On Parallel Algorithm for Sem-discretized Parabolic Partial Differential Equations Based On Subdiagonal Padè Approximation" (NMPDE),Wiley Interscience.9.107-116 (1993).

P.Marcati,Some Considerations ON the Mathematical Approach to Nonlinear Age Dependent Population Dynamics, Computers Math.Applie.9 (3) 361-370 (1983).

Y.Lin And S.Wang."A Numerical Method for the Diffusion Equation with Nonlocal Boundary Conditions"Int.J.Eng.Sci.28 (1990),543-546.

M.Siddique."A Comparison of Third-Order the Diffusion Equation L0-Stable numerical Schemes for the Two-Dimensional Homogeneous Diffusion Problem Subject to Specification of Mass" Applied Mathematical Sciences.Vol.4.2010.No.13.611-621.

M.Siddique."Smoothing of Crank-Nicolson Schemes for the Two-Dimensional Diffusion with an Integral Condition" Applied Mathematics and Computation. 214.2009.512-522.