On the iterative solution of two-point boundary value problems.
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A discussion of the problem of solving x"+A(squared)x=0,x(0)=c,x(1)=d, which can be solved in a straightforward fashion involving the solution of a system of linear algebraic equations. It is shown that this can be avoided by the use of a simple iterative scheme involving only the solution of linear differential equations, and a minimum of storage of values.
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