A vector Chebyshev algorithm |
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Authors: | Roberts D.E. |
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Affiliation: | (1) Department of Mathematics, Napier University, 219 Colinton Road, Edinburgh, EH14 1DJ, Scotland, UK |
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Abstract: | We consider polynomials orthogonal relative to a sequence of vectors and derive their recurrence relations within the framework of Clifford algebras. We state sufficient conditions for the existence of a system of such polynomials. The coefficients in the above relations may be computed using a cross-rule which is linked to a vector version of the quotient-difference algorithm, both of which are proved here using designants. An alternative route is to employ a vector variant of the Chebyshev algorithm. This algorithm is established and an implementation presented which does not require general Clifford elements. Finally, we comment on the connection with vector Padé approximants. This revised version was published online in June 2006 with corrections to the Cover Date. |
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Keywords: | Clifford algebras orthogonal polynomials quotient-difference algorithm Chebyshev algorithm vector Padé approximants designants |
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