Boundary value problems of singular elliptic partial differential equations
Glasgow mathematical journal, Tome 13 (1972) no. 2, pp. 111-118

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In a recent paper [6], this author has extended the method of the kernel function [1] to the boundary value problems of the generalized axially symmetric potentialsThis method can also be applied to a more general class of singular differential equations, namelyor, equivalently,We shall derive in the sequel explicit formulas for the Dirichlet problems of (1.1) in the first quadrant of the x-y plane in terms of sufficiently smooth boundary data, and obtain an error-bound for their approximate solutions. We shall also indicate how the Neumann problem can be solved.
Lo, Chi Yeung. Boundary value problems of singular elliptic partial differential equations. Glasgow mathematical journal, Tome 13 (1972) no. 2, pp. 111-118. doi: 10.1017/S0017089500001506
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