Algebraic frames are generalizations of Fourier transforms on locally compact abelian groups in the sense that the
family of vectors forming the frame are replaced by a family of unbounded linear functionals. The paper studies
the indexing measure space of the algebraic frames; as the investigation narrows down to the class of lower semiframes,
more relations are revealed between the discreteness and the redundancy of the frame family.
Hosseini Giv, H., & Radjabalipour, M. (2013). On the structure and properties of lower bounded analytic frames. Iranian Journal of Science, 37(3), 227-230. doi: 10.22099/ijsts.2013.1598
MLA
H. Hosseini Giv; M. Radjabalipour. "On the structure and properties of lower bounded analytic frames", Iranian Journal of Science, 37, 3, 2013, 227-230. doi: 10.22099/ijsts.2013.1598
HARVARD
Hosseini Giv, H., Radjabalipour, M. (2013). 'On the structure and properties of lower bounded analytic frames', Iranian Journal of Science, 37(3), pp. 227-230. doi: 10.22099/ijsts.2013.1598
VANCOUVER
Hosseini Giv, H., Radjabalipour, M. On the structure and properties of lower bounded analytic frames. Iranian Journal of Science, 2013; 37(3): 227-230. doi: 10.22099/ijsts.2013.1598
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