A short introduction to frames, Gabor systems, and wavelet systems

Research output: Contribution to journalJournal article – Annual report year: 2014Researchpeer-review

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A short introduction to frames, Gabor systems, and wavelet systems. / Christensen, Ole.

In: Azerbaijan Journal of Mathematics, Vol. 4, No. 1, 2014, p. 25-39.

Research output: Contribution to journalJournal article – Annual report year: 2014Researchpeer-review

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@article{87793f9ab3084653a250900744a51641,
title = "A short introduction to frames, Gabor systems, and wavelet systems",
abstract = "In this article we present a short survey of frame theory in Hilbert spaces. We discuss Gabor frames and wavelet frames, and a recent transform that allows to move results from one setting into the other and vice versa.",
keywords = "Dual pair of frames, Frames, Gabor system, Wavelet system, FRAMES (Vector analysis)",
author = "Ole Christensen",
year = "2014",
language = "English",
volume = "4",
pages = "25--39",
journal = "Azerbaijan Journal of Mathematics",
issn = "2218-6816",
publisher = "Azerbaijan Mathematical Society",
number = "1",

}

RIS

TY - JOUR

T1 - A short introduction to frames, Gabor systems, and wavelet systems

AU - Christensen, Ole

PY - 2014

Y1 - 2014

N2 - In this article we present a short survey of frame theory in Hilbert spaces. We discuss Gabor frames and wavelet frames, and a recent transform that allows to move results from one setting into the other and vice versa.

AB - In this article we present a short survey of frame theory in Hilbert spaces. We discuss Gabor frames and wavelet frames, and a recent transform that allows to move results from one setting into the other and vice versa.

KW - Dual pair of frames

KW - Frames

KW - Gabor system

KW - Wavelet system

KW - FRAMES (Vector analysis)

M3 - Journal article

VL - 4

SP - 25

EP - 39

JO - Azerbaijan Journal of Mathematics

JF - Azerbaijan Journal of Mathematics

SN - 2218-6816

IS - 1

ER -