Convergence of a finite difference method for the third BVP for

Boško S. Jovanović; Branislav Z. Popović

Authors

Boško S. Jovanović University of Belgrade, Faculty of Mathematics, Studentski trg 16, 11000 Belgrade, Yugoslavia Author
Branislav Z. Popović University of Kragujevac, Faculty of Science, Radoja Domanovića 12, 34000 Kragujevac, Yugoslavia Author

Keywords:

Third Boundary Value

Subjects:

65N15, 46B70

Abstract

In this paper we study the convergence of finite difference schemes to weak solutions of the third boundary value problem for Poisson's equation on the unit square. Using the theory of interpolation of function spaces, we obtain error estimates in a discrete $W^1_2$ Sobolev norm consistent, or "almost'' consistent, with the smoothness of the data.

Convergence of a finite difference method for the third BVP for

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