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This article is cited in 13 scientific papers (total in 13 papers)
$p$-Adic wavelets and their applications
S. V. Kozyreva, A. Yu. Khrennikovb, V. M. Shelkovichcd a Steklov Mathematical Institute of Russian Academy of Sciences, Moscow, Russia
b International Center for Mathematical Modeling in Physics, Engineering and Cognitive Sciences, Linnaeus University, Växjö, Sweden
c St. Petersburg State University, Faculty of Physics, St. Petersburg, Russia
d St. Petersburg State University of Architecture and Civil Engineering, St. Petersburg, Russia
Abstract:
The theory of $p$-adic wavelets is presented. One-dimensional and multidimensional wavelet bases and their relation to the spectral theory of pseudodifferential operators are discussed. For the first time, bases of compactly supported eigenvectors for $p$-adic pseudodifferential operators were considered by V. S. Vladimirov. In contrast to real wavelets, $p$-adic wavelets are related to the group representation theory; namely, the frames of $p$-adic wavelets are the orbits of $p$-adic transformation groups (systems of coherent states). A $p$-adic multiresolution analysis is considered and is shown to be a particular case of the construction of a $p$-adic wavelet frame as an orbit of the action of the affine group.
Received in October 2013
Citation:
S. V. Kozyrev, A. Yu. Khrennikov, V. M. Shelkovich, “$p$-Adic wavelets and their applications”, Selected topics of mathematical physics and analysis, Collected papers. In commemoration of the 90th anniversary of Academician Vasilii Sergeevich Vladimirov's birth, Trudy Mat. Inst. Steklova, 285, MAIK Nauka/Interperiodica, Moscow, 2014, 166–206; Proc. Steklov Inst. Math., 285 (2014), 157–196
Linking options:
https://www.mathnet.ru/eng/tm3546https://doi.org/10.1134/S0371968514020125 https://www.mathnet.ru/eng/tm/v285/p166
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