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Line 1: A '''multiresolution analysis''' ('''MRA''') or '''multiscale approximation''' ('''MSA''') is the design method of most of the practically relevant [[discrete wavelet transform]]s (DWT) and the justification for the [[algorithm]] of the [[fast wavelet transform]] (FWT). It was introduced in this context in 1988/89 by [[Stephane Mallat]] and [[Yves Meyer]] and has predecessors in the [[microlocal analysis]] in the theory of [[differential equation\|differential equations]]s (the ''[[ironing method]]'') and the [[pyramid (image processing)\|pyramid method]]s of [[image processing]] as introduced in 1981/83 by Peter J. Burt, Edward H. Adelson and [http://www-prima.inrialpes.fr/Prima/Homepages/jlc/jlc.html James L. Crowley]. == Definition == A ''multiresolution analysis'' of the [[Lp space\|Lebesgue space]] <math>L^2(\mathbb{R})</math> consists of a [[sequence]] of nested [[linear subspace\|subspaces]] Line 30 ⟶ 29: is a countable complete [[orthonormal wavelet]] basis in <math>L^2(\R)</math>. == See also == * [[Multiscale modeling]] * [[Scale space]] Line 37 ⟶ 36: {{no footnotes\|date=April 2013}} == References == * {{cite book\|first=Charles K.\|last=Chui\|title=An Introduction to Wavelets\|year=1992\|publisher=Academic Press\|___location=San Diego\|isbn=0-585-47090-1}} * {{cite book\|author1-link=Ali Akansu\|first1=A.N.\|last1=Akansu\|first2=R.A.\|last2=Haddad\|title=Multiresolution signal decomposition: transforms, subbands, and wavelets\|publisher=Academic Press\|year=1992\|isbn=978-0-12-047141-6}} Line 46 ⟶ 45: == External links == [[Category:Wavelets]]▼ [[Category:Time–frequency analysis]] ▲[[Category:Wavelets]]

Multiresolution analysis: Difference between revisions