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Law of cotangents - formulasearchengine

Law of cotangents

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Revision as of 18:37, 30 October 2013 by en>SamHB (Major rewrite. I assume that proofs are legal for pages like this.)

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Template:Multiple issues The equioscillation theorem concerns the approximation of continuous functions using polynomials when the merit function is the maximum difference (uniform norm). Its discovery is attributed to Chebyshev.

Statement

Let $f$ be a continuous function from $[a, b]$ to $R$ . Among all the polynomials of degree $\leq n$ , the polynomial $g$ minimizes the uniform norm of the difference $| | f - g | |_{\infty}$ if and only if there are $n + 2$ points $a \leq x_{0} < x_{1} < \dots < x_{n + 1} \leq b$ such that $f (x_{i}) - g (x_{i}) = σ (- 1)^{i} | | f - g | |_{\infty}$ where $σ = \pm 1$ .

Algorithms

Several minimax approximation algorithms are available, the most common being the Remez algorithm.

References

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