On the convergence of the generalized matrix multisplitting relaxed methods

Let ψ be a rapidly decreasing one-dimensional wavelet. We show that the wavelet expansion of any L p function converges pointwise almost everywhere under the wavelet projection, hard sampling, and soft sampling summation methods, for 1 < p < ∞. In fact, the partial sums are uniformly dominated by th

The convergence of the S matrix for the renormalized Numerov method, the original log-derivative method, and. one recent version of this method is studied. A single-and a two-channel problem are analyzed and the percent relative errors for the S matrix and transition probabilities are calculated.

We comment on the convergence of the general coupling operator for all types of one-configuration or multiconfigurational wave functions that still preserve the one-configuration structure for the energy expression. The choice on the best arbitrary real and antisymmetric parameters inherent in the c