Bessel multipliers and approximate duals in Hilbert $C^\ast$-modules
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저자
Morteza Mirzaee Azandaryani
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제어번호
103363933
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학술지명
대한수학회지
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권호사항
Vol.
54
No.
4
[
2017
]
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발행처
대한수학회
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발행처 URL
http://www.kms.or.kr
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자료유형
학술저널
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수록면
1063-1079
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언어
English
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출판년도
2017
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등재정보
KCI등재
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소장기관
건국대학교 상허기념중앙도서관
경북대학교 중앙도서관
계명대학교 동산도서관
성균관대학교 삼성학술정보관
성균관대학교 삼성학술정보관
영남대학교 과학도서관
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판매처
'
Bessel multipliers and approximate duals in Hilbert $C^\ast$-modules' 의 참고문헌
-
Weighted and controlled frames, mutual re-lationship and first numerical properties
P. Balazs
Int. J. Wavelets Multiresolut. Inf. Process 8 1 109-132
[2010]
-
Waveletes. An analysis tool, Oxford Mathematical Monographs. Ox-ford Science Publications
-
Varying the time-frequency lattice of Gabor frames
-
The tensor product of frames
-
Some properties of g-frames in Hilbert C∗-modules
X. Xiao
J. Math. Anal. Appl 363 2 399-408
[2010]
-
Smooth molecular decompositions of functions and singular integral operators
-
-
Riesz bases and their dual modular frames in Hilbert C∗-modules
D. Han
J. Math. Anal. Appl 343 1 246-256
[2008]
-
Reproducing pairs and the continuous nonstationary Gabor transform on LCA groups
-
Painless nonorthogonal expansions
-
On frames for countably generated Hilbert C∗-modules
-
Multipliers of generalized frames in Hilbert spaces
A. Rahimi
Bull. Iranian Math. Soc 37 1 63-80
[2011]
-
Multipliers for p-Bessel sequences in Banach spaces
A. Rahimi
Integral Equations Operator Theory 68 2 193-205
[2010]
-
Multipliers for continuos frames in Hilbert spaces
P. Balazs
J. Phys. A: Math. Theor 45 20-
[2012]
-
Invertibility of multipliers
-
Hilbert Schmidt operators and frames classification, approximation by multipli-ers and algorithms
P. Balazs
Int. J. Wavelets Multiresolut. Inf. Process 6 2 315-330
[2008]
-
Hilbert C∗-modules: a Toolkit for Operator Algebraists
-
G-frames and modular Riesz bases
A. Khosravi
Int. J. Wavelets Multiresolut. Inf. Process 10 2 1-12
[2012]
-
G-frames and g-Riesz bases
W. Sun
J. Math. Anal. Appl 322 1 437-452
[2006]
-
Fusion frames and g-frames in tensor product and direct sum of Hilbert spaces
A. Khosravi
Appl. Anal. Discrete Math 6 2 287-303
[2012]
-
Fusion frames and g-frames in Hilbert C∗-modules
A. Khosravi
Int. J. Wavelets Multires-olut. Inf. Process 6 3 433-446
[2008]
-
Frequency-scale frames and the solution of the Mexican hat problem
-
Frames in Hilbert C∗-modules and C∗-algebras
M. Frank
J. Operator Theory 48 2 273-314
[2002]
-
Frames and bases in tensor products of Hilbert spaces and Hilbert C∗-modules
A. Khosravi
Proc. Indian Acad. Sci. Math. Sci 117 1 1-12
[2007]
-
Frame fundamental sensor modeling and stability of one-sided frame perturbation
S. Li
Acta Appl. Math 107 1-3 91-103
[2009]
-
Dual Gabor frames: theory and compu-tational aspects
T. Werther
IEEE Trans. Signal Process 53 11 4147-4158
[2005]
-
Double preconditioning for Gabor frames
P. Balazs
IEEE Trans. Signal Process 54 4597-4610
[2006]
-
C∗-Algebras and Operator Theory
-
Classification of general sequences by frame-related operators
P. Balazs
Sampl. Theory Signal Image Process 10 1-2 151-170
[2011]
-
Bessel multipliers on the tensor product of Hilbert C∗-modules
-
Bessel multipliers in Hilbert C∗-modules
-
Bessel fusion multipliers
-
Basic definition and properties of Bessel multipliers
P. Balazs
J. Math. Anal. Appl 325 1 571-585
[2007]
-
Banach spaces related to integrable group repre-sentations and their atomic decomposition I
-
Approximate duals and nearly Parseval frames
-
Approximate duality of g-frames in Hilbert spaces
A. Khosravi
Acta. Math. Sci. B Engl. Ed 34 3 639-652
[2014]
-
Approximate dual frames in Hilbert spaces and applications to Gabor frames
-
A class of nonharmonic Fourier series
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Bessel multipliers and approximate duals in Hilbert $C^\ast$-modules'
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