I am trying to solve the 2D laplace equation,
$\frac{\partial^2 T}{\partial x^2} + \frac{\partial^2 T}{\partial y^2} = 0; \qquad 0 \lt x \lt 1, \quad0 \lt y \lt 1$
Subjected to the boundary conditions,
${\frac{d T}{d x}}|_{x=0,y}=0;$
${\frac{d T}{d y}}|_{x,y=0}=0;$
${\frac{d T}{d y}}|_{x,y=1}=0;$
$T|_{x=1,y} = 1; $
I am using Finite Difference method to discretise the differential equation and foward difference in the first two B.Cs and backward difference for the 3rd B.C. The solution which is $T=1$ at all grid points is perfectly coming out in Gauss Seidal as well as Jacobi iterative methods, but using BicgStab algorithm it is not converging even though the same matrices as Jacobi or Gauss Seidal. Any Ideas may help. Thank you.
