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Wavelet expansion of functions on a differentiable manifold. / Dem'yanovich, Yu K.

In: Vestnik St. Petersburg University: Mathematics, Vol. 41, No. 4, 01.12.2008, p. 290-297.

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Harvard

Dem'yanovich, YK 2008, 'Wavelet expansion of functions on a differentiable manifold', Vestnik St. Petersburg University: Mathematics, vol. 41, no. 4, pp. 290-297. https://doi.org/10.3103/S106345410804002X

APA

Dem'yanovich, Y. K. (2008). Wavelet expansion of functions on a differentiable manifold. Vestnik St. Petersburg University: Mathematics, 41(4), 290-297. https://doi.org/10.3103/S106345410804002X

Vancouver

Dem'yanovich YK. Wavelet expansion of functions on a differentiable manifold. Vestnik St. Petersburg University: Mathematics. 2008 Dec 1;41(4):290-297. https://doi.org/10.3103/S106345410804002X

Author

Dem'yanovich, Yu K. / Wavelet expansion of functions on a differentiable manifold. In: Vestnik St. Petersburg University: Mathematics. 2008 ; Vol. 41, No. 4. pp. 290-297.

BibTeX

@article{1136ef0c69db445ea24f111334fe5270,
title = "Wavelet expansion of functions on a differentiable manifold",
abstract = "A wavelet expansion involving uniform meshes is accounted in many of the references (see, e. g., [1-4] and references therein); results on wavelets on nonuniform meshes may be found in [5-8]. Numerical flows associated with a smooth manifold may be processed using local functions (see [9]). However, development of efficient algorithms involves the resources of wavelet expansions.",
author = "Dem'yanovich, {Yu K.}",
year = "2008",
month = dec,
day = "1",
doi = "10.3103/S106345410804002X",
language = "English",
volume = "41",
pages = "290--297",
journal = "Vestnik St. Petersburg University: Mathematics",
issn = "1063-4541",
publisher = "Pleiades Publishing",
number = "4",

}

RIS

TY - JOUR

T1 - Wavelet expansion of functions on a differentiable manifold

AU - Dem'yanovich, Yu K.

PY - 2008/12/1

Y1 - 2008/12/1

N2 - A wavelet expansion involving uniform meshes is accounted in many of the references (see, e. g., [1-4] and references therein); results on wavelets on nonuniform meshes may be found in [5-8]. Numerical flows associated with a smooth manifold may be processed using local functions (see [9]). However, development of efficient algorithms involves the resources of wavelet expansions.

AB - A wavelet expansion involving uniform meshes is accounted in many of the references (see, e. g., [1-4] and references therein); results on wavelets on nonuniform meshes may be found in [5-8]. Numerical flows associated with a smooth manifold may be processed using local functions (see [9]). However, development of efficient algorithms involves the resources of wavelet expansions.

UR - http://www.scopus.com/inward/record.url?scp=84859707207&partnerID=8YFLogxK

U2 - 10.3103/S106345410804002X

DO - 10.3103/S106345410804002X

M3 - Article

AN - SCOPUS:84859707207

VL - 41

SP - 290

EP - 297

JO - Vestnik St. Petersburg University: Mathematics

JF - Vestnik St. Petersburg University: Mathematics

SN - 1063-4541

IS - 4

ER -

ID: 49712327