Iterative Algorithms for Orthogonal Spline Collocation Linear Systems
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In this paper, we present several block iterative algorithms for solving the linear systems which arise from the discretization of second-order separable elliptic partial differential equations with Hermite cubic collocation. The convergence rates of these algorithms are estimated.
[1] U. Ascher,et al. On Spline Basis Selection for Solving Differential Equations , 1983 .
[2] Wayne R. Dyksen. Tensor product generalized ADI methods for separable elliptic problems , 1987 .
[3] Bernard Bialecki,et al. Preconditioned Richardson and Minimal Residual Iterative Methods for Piecewise Hermite Bicubic Orthogonal Spline Collocation Equations , 1994, SIAM J. Sci. Comput..