Inversion formula and Parsval theorem for complex continuous wavelet transforms studied by entangled state representation
arXiv:0910.5354 · doi:10.1088/1674-1056/19/7/074205
Abstract
In a preceding Letter (Opt. Lett. 32, 554 (2007)) we have proposed complex continuous wavelet transforms (CCWTs) and found Laguerre--Gaussian mother wavelets family. In this work we present the inversion formula and Parsval theorem for CCWT by virtue of the entangled state representation, which makes the CCWT theory complete. A new orthogonal property of mother wavelet in parameter space is revealed.
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