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. and 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
Hosseini Giv, H. , and Radjabalipour, M. . "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
CHICAGO
H. Hosseini Giv and 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
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
)