In this paper we present a general strategy to deduce a family of interpolatory masks from a symmetric Hurwitz non-interpolatory one. This brings back to a polynomial equation involving the symbol of the non-interpolatory scheme we start with. The solution of the polynomial equation here proposed, tailored for symmetric Hurwitz subdivision symbols, leads to an efficient procedure for the computation of the coefficients of the corresponding family of interpolatory masks. Several examples of interpolatory masks associated with classical approximating masks are given.

Conti, C., Gemignani, L., Romani, L. (2009). From symmetric subdivision masks of Hurwitz type to interpolatory subdivision masks. LINEAR ALGEBRA AND ITS APPLICATIONS, 431(10), 1971-1987 [10.1016/j.laa.2009.06.037].

From symmetric subdivision masks of Hurwitz type to interpolatory subdivision masks

ROMANI, LUCIA
2009

Abstract

In this paper we present a general strategy to deduce a family of interpolatory masks from a symmetric Hurwitz non-interpolatory one. This brings back to a polynomial equation involving the symbol of the non-interpolatory scheme we start with. The solution of the polynomial equation here proposed, tailored for symmetric Hurwitz subdivision symbols, leads to an efficient procedure for the computation of the coefficients of the corresponding family of interpolatory masks. Several examples of interpolatory masks associated with classical approximating masks are given.
Articolo in rivista - Articolo scientifico
Hurwitz polynomial; Polynomial equation; Resultant matrix; Subdivision mask; Interpolatory scheme
English
2009
431
10
1971
1987
open
Conti, C., Gemignani, L., Romani, L. (2009). From symmetric subdivision masks of Hurwitz type to interpolatory subdivision masks. LINEAR ALGEBRA AND ITS APPLICATIONS, 431(10), 1971-1987 [10.1016/j.laa.2009.06.037].
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/10281/7668
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