Standard

Tight wavelet frames on the space of M-positive vectors. / Скопина, Мария Александровна.

In: Analysis and Applications, Vol. 22, No. 5, 24, 01.07.2024, p. 913-926.

Research output: Contribution to journalArticlepeer-review

Harvard

Скопина, МА 2024, 'Tight wavelet frames on the space of M-positive vectors', Analysis and Applications, vol. 22, no. 5, 24, pp. 913-926. https://doi.org/10.1142/s0219530524500064

APA

Скопина, М. А. (2024). Tight wavelet frames on the space of M-positive vectors. Analysis and Applications, 22(5), 913-926. [24]. https://doi.org/10.1142/s0219530524500064

Vancouver

Скопина МА. Tight wavelet frames on the space of M-positive vectors. Analysis and Applications. 2024 Jul 1;22(5):913-926. 24. https://doi.org/10.1142/s0219530524500064

Author

Скопина, Мария Александровна. / Tight wavelet frames on the space of M-positive vectors. In: Analysis and Applications. 2024 ; Vol. 22, No. 5. pp. 913-926.

BibTeX

@article{3f0174da1505459dafed7c0460c8ce61,
title = "Tight wavelet frames on the space of M-positive vectors",
abstract = "Wavelets on the sets of M-positive vectors in the Euclidean space are studied. These sets are multidimensional analogs of the half-line in the Walsh analysis. Following the ideas of the Walsh analysis, the space of M-positive vectors is equipped with a coordinatewise addition. Harmonic analysis on this space is also similar to the Walsh harmonic analysis, and the Fourier transform is such that there exists a class of so-called test functions (with a compact support of the function itself and of its Fourier transform). Tight wavelet frames consisting of the test functions are studied. A complete description of the masks generating such frames is given, and an algorithmic method for constructing them is developed. These frames may be very useful for applications to signal processing because some examples of such systems on the half-line were already investigated in this aspect, and it appeared that they have an advantage over classical wavelet systems when used for processing fractal signals and images.",
keywords = "M-positive vectors; Walsh function; test-function; tight wavelet frame; refinable function., tight wavelet frame, M-positive vectors, Walsh function, refinable function, test-function",
author = "Скопина, {Мария Александровна}",
year = "2024",
month = jul,
day = "1",
doi = "10.1142/s0219530524500064",
language = "English",
volume = "22",
pages = "913--926",
journal = "Analysis and Applications",
issn = "0219-5305",
publisher = "WORLD SCIENTIFIC PUBL CO PTE LTD",
number = "5",

}

RIS

TY - JOUR

T1 - Tight wavelet frames on the space of M-positive vectors

AU - Скопина, Мария Александровна

PY - 2024/7/1

Y1 - 2024/7/1

N2 - Wavelets on the sets of M-positive vectors in the Euclidean space are studied. These sets are multidimensional analogs of the half-line in the Walsh analysis. Following the ideas of the Walsh analysis, the space of M-positive vectors is equipped with a coordinatewise addition. Harmonic analysis on this space is also similar to the Walsh harmonic analysis, and the Fourier transform is such that there exists a class of so-called test functions (with a compact support of the function itself and of its Fourier transform). Tight wavelet frames consisting of the test functions are studied. A complete description of the masks generating such frames is given, and an algorithmic method for constructing them is developed. These frames may be very useful for applications to signal processing because some examples of such systems on the half-line were already investigated in this aspect, and it appeared that they have an advantage over classical wavelet systems when used for processing fractal signals and images.

AB - Wavelets on the sets of M-positive vectors in the Euclidean space are studied. These sets are multidimensional analogs of the half-line in the Walsh analysis. Following the ideas of the Walsh analysis, the space of M-positive vectors is equipped with a coordinatewise addition. Harmonic analysis on this space is also similar to the Walsh harmonic analysis, and the Fourier transform is such that there exists a class of so-called test functions (with a compact support of the function itself and of its Fourier transform). Tight wavelet frames consisting of the test functions are studied. A complete description of the masks generating such frames is given, and an algorithmic method for constructing them is developed. These frames may be very useful for applications to signal processing because some examples of such systems on the half-line were already investigated in this aspect, and it appeared that they have an advantage over classical wavelet systems when used for processing fractal signals and images.

KW - M-positive vectors; Walsh function; test-function; tight wavelet frame; refinable function.

KW - tight wavelet frame

KW - M-positive vectors

KW - Walsh function

KW - refinable function

KW - test-function

UR - https://www.mendeley.com/catalogue/f51a6287-54bb-3ac7-8c3a-1f1111f808cd/

U2 - 10.1142/s0219530524500064

DO - 10.1142/s0219530524500064

M3 - Article

VL - 22

SP - 913

EP - 926

JO - Analysis and Applications

JF - Analysis and Applications

SN - 0219-5305

IS - 5

M1 - 24

ER -

ID: 119574317