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Author:

Li, Yun-Zhang (Li, Yun-Zhang.) (Scholars:李云章) | Zhang, Jian-Ping (Zhang, Jian-Ping.)

Indexed by:

EI Scopus SCIE

Abstract:

Mixed Oblique Extension Principles (MOEP) provide an important method to construct affine dual frames from refinable functions. This paper addresses MOEP under the setting of reducing subspaces of L-2(R-d). We obtain an MOEP for (non)homogeneous affine dual frames and (non)homogeneous affine Parseval frames. (C) 2017 Elsevier Inc. All rights reserved.

Keyword:

(Non)homogeneous affine dual frame Refinable function Extension principle Affine frame

Author Community:

  • [ 1 ] [Li, Yun-Zhang]Beijing Univ Technol, Coll Appl Sci, Beijing 100124, Peoples R China
  • [ 2 ] [Zhang, Jian-Ping]Beijing Univ Technol, Coll Appl Sci, Beijing 100124, Peoples R China
  • [ 3 ] [Zhang, Jian-Ping]Yanan Univ, Coll Math & Comp Sci, Yanan 716000, Shaanxi, Peoples R China

Reprint Author's Address:

  • 李云章

    [Li, Yun-Zhang]Beijing Univ Technol, Coll Appl Sci, Beijing 100124, Peoples R China

Email:


yzlee@bjut.edu.cn |
zhjp1982@emails.bjut.edu.cn
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Source :

APPLIED AND COMPUTATIONAL HARMONIC ANALYSIS

ISSN: 1063-5203

Year: 2019

Issue: 1

Volume: 46

Page: 177-191

2 . 5 0 0

JCR@2022

ESI Discipline: MATHEMATICS;

ESI HC Threshold:54

JCR Journal Grade:1

Cited Count:

WoS CC Cited Count: 8

SCOPUS Cited Count: 8

ESI Highly Cited Papers on the List: 0 Unfold All

WanFang Cited Count:

Chinese Cited Count:

30 Days PV: 0

Affiliated Colleges:

理学部

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