In [4], we use equivariant functions on the space of irreducible representations of a C∗-algebra A to develop a duality theory for Hilbert C∗-modules. Within this framework, each Hilbert C∗-module corresponds to an operator bundle defined over the set of all non-zero irreducible representations of A. In this short note, we characterize the condition under which operator bundles, regarded as Hilbert C∗-modules admit no frames.
Asadi,M Bagher and Hassanpour-Yakhdani,Z . (2025). An Operator Bundle admitting no Frames. Wavelet and Linear Algebra, 12(2), 48-53. doi: 10.22072/wala.2025.2076825.1479
MLA
Asadi,M Bagher, and Hassanpour-Yakhdani,Z . "An Operator Bundle admitting no Frames", Wavelet and Linear Algebra, 12, 2, 2025, 48-53. doi: 10.22072/wala.2025.2076825.1479
HARVARD
Asadi M Bagher, Hassanpour-Yakhdani Z. (2025). 'An Operator Bundle admitting no Frames', Wavelet and Linear Algebra, 12(2), pp. 48-53. doi: 10.22072/wala.2025.2076825.1479
CHICAGO
M Bagher Asadi and Z Hassanpour-Yakhdani, "An Operator Bundle admitting no Frames," Wavelet and Linear Algebra, 12 2 (2025): 48-53, doi: 10.22072/wala.2025.2076825.1479
VANCOUVER
Asadi M Bagher, Hassanpour-Yakhdani Z. An Operator Bundle admitting no Frames. WALA. 2025;12(2):48-53. doi: 10.22072/wala.2025.2076825.1479
