Approximation by crystal-refinable functions
Let Γ be a crystal group in Rd. A function φ:Rd⟶C is said to be crystal-refinable (or Γ-refinable) if it is a linear combination of finitely many of the rescaled and translated functions φ(γ−1(ax)), where the translationsγ are taken on a crystal group Γ, and a is an expansive dilation matrix such th...
| Autores: | , , |
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| Tipo de recurso: | artículo |
| Estado: | Versión publicada |
| Fecha de publicación: | 2019 |
| País: | Argentina |
| Institución: | Consejo Nacional de Investigaciones Científicas y Técnicas |
| Repositorio: | CONICET Digital (CONICET) |
| Idioma: | inglés |
| OAI Identifier: | oai:ri.conicet.gov.ar:11336/136210 |
| Acceso en línea: | http://hdl.handle.net/11336/136210 |
| Access Level: | acceso abierto |
| Palabra clave: | CRYSTAL GROUPS APPROXIMATION PROPERTY COMPOSITE DILATIONS REFINEMENT EQUATION ACCURACY https://purl.org/becyt/ford/1.1 https://purl.org/becyt/ford/1 |
| Sumario: | Let Γ be a crystal group in Rd. A function φ:Rd⟶C is said to be crystal-refinable (or Γ-refinable) if it is a linear combination of finitely many of the rescaled and translated functions φ(γ−1(ax)), where the translationsγ are taken on a crystal group Γ, and a is an expansive dilation matrix such that aΓa−1⊂Γ. A Γ-refinable function φ:Rd→C satisfies a refinement equation φ(x)=∑γ∈Γdγφ(γ−1(ax)) with dγ∈C. Let S(φ) be the linear span of {φ(γ−1(x)):γ∈Γ} and Sh={f(x/h):f∈S(φ)}. One important property of S(φ) is, how well it approximates functions in L2(Rd). This property is very closely related to the crystal-accuracy of S(φ), which is the highest degree p such that all multivariate polynomials q(x) of degree(q) |
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