Revision as of 19:56, 15 May 2006 edit Charles Matthews (talk \| contribs) Autopatrolled, Administrators 367,967 edits m cats ← Previous edit		Revision as of 05:57, 6 June 2006 edit undo Disavian (talk \| contribs) Extended confirmed users, File movers, Pending changes reviewers, Rollbackers 44,609 edits m cleanup using AWB Next edit →
Line 1: The '''Remez algorithm''' (Remez 1934), also called the '''Remez exchange algorithm''', is an application of the [[Chebyshev alternation theorem]] that constructs the polynomial of best approximation to certain functions under a number of conditions. The Remez algorithm in effect goes a step beyond the [[minimax approximation algorithm]] to give a slightly finer solution to an approximation problem. Parks and [[James H. McClellan\|McClellan]] (1972) observed that a filter of a given length with minimal ripple would have a response with the same relationship to the ideal filter that a polynomial of degree ~~≤~~≤ ''n'' of best approximation has to a certain function, and so the Remez algorithm could be used to generate the coefficients. {{math-stub}}▼ ==External links== *[http://www.bores.com/courses/intro/filters/4_equi.htm Intro to DSP] Line 11 ⟶ 10: [[Category:Approximation theory]] [[Category:Numerical analysis]] ▲{{math-stub}}

Remez algorithm: Difference between revisions