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- Dyadic_cubes abstract "In mathematics, the dyadic cubes are a collection of cubes in Rn of different sizes or scales such that the set of cubes of each scale partition Rn and each cube in one scale may be written as a union of cubes of a smaller scale. These are frequently used in mathematics (particularly harmonic analysis) as a way of discretizing objects in order to make computations or analysis easier. For example, to study an arbitrary subset of A of Euclidean space, one may instead replace it by a union of dyadic cubes of a particular size that cover the set. One can consider this set as a pixelized version of the original set, and as smaller cubes are used one gets a clearer image of the set A. Most notable appearances of dyadic cubes include the Whitney extension theorem and the Calderón–Zygmund lemma.".
- Dyadic_cubes wikiPageID "30151810".
- Dyadic_cubes wikiPageRevisionID "603129391".
- Dyadic_cubes hasPhotoCollection Dyadic_cubes.
- Dyadic_cubes subject Category:Cubes.
- Dyadic_cubes subject Category:Harmonic_analysis.
- Dyadic_cubes type Abstraction100002137.
- Dyadic_cubes type Attribute100024264.
- Dyadic_cubes type Cube113916721.
- Dyadic_cubes type Cubes.
- Dyadic_cubes type Polyhedron113883885.
- Dyadic_cubes type RegularPolyhedron113915999.
- Dyadic_cubes type Shape100027807.
- Dyadic_cubes type Solid113860793.
- Dyadic_cubes comment "In mathematics, the dyadic cubes are a collection of cubes in Rn of different sizes or scales such that the set of cubes of each scale partition Rn and each cube in one scale may be written as a union of cubes of a smaller scale. These are frequently used in mathematics (particularly harmonic analysis) as a way of discretizing objects in order to make computations or analysis easier.".
- Dyadic_cubes label "Dyadic cubes".
- Dyadic_cubes sameAs m.0g56gm3.
- Dyadic_cubes sameAs Q5318397.
- Dyadic_cubes sameAs Q5318397.
- Dyadic_cubes sameAs Dyadic_cubes.
- Dyadic_cubes wasDerivedFrom Dyadic_cubes?oldid=603129391.
- Dyadic_cubes isPrimaryTopicOf Dyadic_cubes.