Abstract
A good preconditioner is extremely important in order for the conjugate gradients method to converge quickly. In the case of Toeplitz matrices, a number of recent studies were made to relate approximation of functions to good preconditioners. In this paper, we present a new result relating the quality of the Toeplitz preconditionerC for the Toeplitz matrixT to the Chebyshev norm ∥(f− g)/f∥∞, wheref and g are the generating functions forT andC, respectively. In particular, the construction of band-Toeplitz preconditioners becomes a linear minimax approximation problem. The case whenf has zeros (but is nonnegative) is especially interesting and the corresponding approximation problem becomes constrained. We show how the Remez algorithm can be modified to handle the constraints. Numerical experiments confirming the theoretical results are presented.
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Chan, R.H., Tang, P.T.P. Constrained minimax approximation and optimal preconditioned for Toeplitz matrices. Numer Algor 5, 353–364 (1993). https://doi.org/10.1007/BF02109196
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DOI: https://doi.org/10.1007/BF02109196