Linear algebraic analysis of fractional Fourier domain interpolation
Proceedings of the 17th Signal Processing and Communications Applications Conference, SIU 2009
872 - 875
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In this work, we present a novel linear algebraic approach to certain signal interpolation problems involving the fractional Fourier transform. These problems arise in wave propagation, but the proposed approach to these can also be applicable to other areas. We see this interpolation problem as the problem of determining the unknown signal values from the given samples within some tolerable error. We formulate the problem as a linear system of equations and use the condition number as a measure of redundant information in given samples. By analyzing the effect of the number of known samples and their distributions on the condition number with simulation examples, we aim to investigate the redundancy and information relations between the given data.
Fractional Fourier domains
Fractional Fourier transforms
Linear system of equations