Abstract
The solution of a linear homogeneous differential equation (in particular the Schrodinger equation) by expansion of the solutions (wave functions) in a discrete complete set of function is considered. The coefficients of the expansion are determinable by either the Ritz variational (integral) method, or by a generalisation of Frobenius's (non-integral) method. Each method leads to an infinite matrix eigenvalue equation. It is shown that the integral and non-integral matrix equations are related by the overlap matrix of the set of basis functions. The effects of truncating the infinite matrices to finite order are described. A hybrid method of transformation to a matrix representation is proposed, which employs some techniques from each of the original methods.
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