Solution of two-dimensional non-linear Burgers’ equations with nonlocal boundary condition

G. W. Hill, On the part of the motion of the lunar perigee which is a function ofthe mean motions of the sun and moon. Acta Mathematica, 8(1886), 1-36.

A. R. Bahadır, A fully implicit finite-difference scheme for two-diensional Burgers' equations, Appl. Math. Comput., 206(2015), 131-137.

C. A. J. Fletcher, Generating exact solutions of two- dimensional Burgers' equation, Int. J. Numer. Meth Fluids, 3(1983), 213-216.

C. A. J. Fletcher, A comparison of finite element and finite difference solution of the one and two-dimensional Burgers' equations, J.Comput. Phys., 51(1998), 159-188.

F. W. Wubs, E. D. de Goede, An explicit-implicit method for a class of time dependent partial differential equations, Appl.Numer.Math., 9(1992), 157-181.

O. Goyon, Multilevel schemes for solving unsteady equations, Int.J.Numer.Meth. Fluids, 22(1996), 937-959.

V. K. Srivastasa, M. Tamsir, U. Bhardwaj, Y. Sanyasiraju, Crank-Nicolson scheme for numerical solutions of two dimensional coupled Burgers' equations, International Journal of Scientific and Engineering Research, 2(2011), 1-7.

${ }^{[8]}$ V. Gülkaç, T. Öziş, On a LOD method for solution of twodimensional Fusion problem with convective boundary conditions, International Communications in Heat and Mass Transfer, 31(2004), 597-606.

G. D. Smith, Numerical Solutions of Partial Differential Equations Finite Difference Methods, Clarendon Press, Oxford, 1985.

E. Vessiot, On a class of differential equations, Ann. Sci. Ecole Norm. Sup., 10(1893), p.53.

A. Guldberg, On differential equations possessing a fundamental system of integrals, Comptes Rendus de l'Academie des Scinces, 116(1893), p.964.