Graph Signal Processing of Indefinite and Complex Graphs using Directed Variation
Abstract
In the field of graph signal processing (GSP), directed graphs present a particular challenge for the "standard approaches" of GSP to due to their asymmetric nature. The presence of negative- or complex-weight directed edges, a graphical structure used in fields such as neuroscience, critical infrastructure, and robot coordination, further complicates the issue. Recent results generalized the total variation of a graph signal to that of directed variation as a motivating principle for developing a graphical Fourier transform (GFT). Here, we extend these techniques to concepts of signal variation appropriate for indefinite and complex-valued graphs and use them to define a GFT for these classes of graph. Simulation results on random graphs are presented, as well as a case study of a portion of the fruit fly connectome.
Cite
@article{arxiv.2003.00621,
title = {Graph Signal Processing of Indefinite and Complex Graphs using Directed Variation},
author = {Kevin Schultz and Marisel Villafane-Delgado},
journal= {arXiv preprint arXiv:2003.00621},
year = {2020}
}
Comments
Submitted to EUSIPCO 2020