Orthogonal Basis for Wavelet Flows › Научные исследования в СПбГУ

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Orthogonal Basis for Wavelet Flows. / Dem’yanovich, Yu. K. .

в: Journal of Mathematical Sciences, Том 213, № 4, 2016, стр. 530-550.

Результаты исследований: Научные публикации в периодических изданиях › статья › Рецензирование

Harvard

Dem’yanovich, YK 2016, 'Orthogonal Basis for Wavelet Flows', Journal of Mathematical Sciences, Том. 213, № 4, стр. 530-550.

APA

Dem’yanovich, Y. K. (2016). Orthogonal Basis for Wavelet Flows. Journal of Mathematical Sciences, 213(4), 530-550.

Vancouver

Dem’yanovich YK. Orthogonal Basis for Wavelet Flows. Journal of Mathematical Sciences. 2016;213(4):530-550.

Author

Dem’yanovich, Yu. K. . / Orthogonal Basis for Wavelet Flows. в: Journal of Mathematical Sciences. 2016 ; Том 213, № 4. стр. 530-550.

BibTeX

@article{2277a03d3d9d4e2fbe9d053fd2b6d150,

title = "Orthogonal Basis for Wavelet Flows",

abstract = "We present an orthogonal basis for discrete wavelets in the case of comb structure of the spline-wavelet decomposition and estimate the time of computation of this decomposition by a concurrent computing system with computer communication surrounding taken into account.",

keywords = "Additive Operation, Discrete Wavelet, Orthogonal Basis, Uniform Grid, Wavelet Decomposition",

author = "Dem{\textquoteright}yanovich, {Yu. K.}",

note = "Dem{\textquoteright}yanovich, Y.K. Orthogonal Basis for Wavelet Flows. J Math Sci 213, 530–550 (2016). https://doi.org/10.1007/s10958-016-2723-3",

year = "2016",

language = "English",

volume = "213",

pages = "530--550",

journal = "Journal of Mathematical Sciences",

issn = "1072-3374",

publisher = "Springer Nature",

number = "4",

}

RIS

TY - JOUR

T1 - Orthogonal Basis for Wavelet Flows

AU - Dem’yanovich, Yu. K.

N1 - Dem’yanovich, Y.K. Orthogonal Basis for Wavelet Flows. J Math Sci 213, 530–550 (2016). https://doi.org/10.1007/s10958-016-2723-3

PY - 2016

Y1 - 2016

N2 - We present an orthogonal basis for discrete wavelets in the case of comb structure of the spline-wavelet decomposition and estimate the time of computation of this decomposition by a concurrent computing system with computer communication surrounding taken into account.

AB - We present an orthogonal basis for discrete wavelets in the case of comb structure of the spline-wavelet decomposition and estimate the time of computation of this decomposition by a concurrent computing system with computer communication surrounding taken into account.

KW - Additive Operation

KW - Discrete Wavelet

KW - Orthogonal Basis

KW - Uniform Grid

KW - Wavelet Decomposition

UR - https://link.springer.com/article/10.1007/s10958-016-2723-3

M3 - Article

VL - 213

SP - 530

EP - 550

JO - Journal of Mathematical Sciences

JF - Journal of Mathematical Sciences

SN - 1072-3374

IS - 4

ER -

ID: 9319837