Litcius/Paper detail

Optimal Fractional Fourier Filtering for Graph Signals

Cuneyd Ozturk, Haldun M. Özaktaş, Sinan Gezici, Aykut Koç

2021IEEE Transactions on Signal Processing39 citationsDOI

Abstract

Graph signal processing has recently received considerable attention. Several concepts, tools, and applications in signal processing such as filtering, transforming, and sampling have been extended to graph signal processing. One such extension is the optimal filtering problem. The minimum mean-squared error estimate of an original graph signal can be obtained from its distorted and noisy version. However, the best separation of signal and noise, and thus the least error, is not always achieved in the ordinary Fourier domain, but rather a fractional Fourier domain. In this work, the optimal filtering problem for graph signals is extended to fractional Fourier domains, and theoretical analysis and solution of the proposed problem are provided along with computational cost considerations. Numerical results are presented to illustrate the benefits of filtering in fractional Fourier domains.

Topics & Concepts

Fourier transformSignal processingAlgorithmFourier analysisFractional Fourier transformMultidimensional signal processingFrequency domainDiscrete-time signalGraphDiscrete-time Fourier transformMathematicsComputer scienceMathematical optimizationDigital signal processingAnalog signalDiscrete mathematicsSignal transfer functionMathematical analysisComputer hardwareMathematical Analysis and Transform MethodsAdvanced Graph Neural NetworksSparse and Compressive Sensing Techniques