Matrix transform of irregular weyl-heisenberg wave packet frames for L2 (R)
MetadataShow full item record
CitationKumar, R. & Sah, A. K. (2017). Matrix transform of irregular weyl-heisenberg wave packet frames for L2 (R). TWMS Journal Of Applied And Engineering Mathematics, 7(2), 200-208.
Cordoba and Fefferman  introduced wave packet systems by applying certain collections of dilations, modulations and translations to the Gaussian function in the study of some classes of singular integral operators. In this paper, we introduce the concept of matrix transform M = (αp,q,r,j,k,m) and with the help of matrix transform we study the action of M on f ∈ L2 (R) and on its wave packet coefficients. Further, we also obtain the tight frame condition for matrix transform of f ∈ L2 (R) whose wave packet series expansion is known.
SourceTWMS Journal Of Applied And Engineering Mathematics
The following license files are associated with this item: