@ARTICLE{10.3389/fncom.2017.00014, AUTHOR={Monti, Ricardo P. and Lorenz, Romy and Hellyer, Peter and Leech, Robert and Anagnostopoulos, Christoforos and Montana, Giovanni}, TITLE={Decoding Time-Varying Functional Connectivity Networks via Linear Graph Embedding Methods}, JOURNAL={Frontiers in Computational Neuroscience}, VOLUME={11}, YEAR={2017}, URL={https://www.frontiersin.org/articles/10.3389/fncom.2017.00014}, DOI={10.3389/fncom.2017.00014}, ISSN={1662-5188}, ABSTRACT={An exciting avenue of neuroscientific research involves quantifying the time-varying properties of functional connectivity networks. As a result, many methods have been proposed to estimate the dynamic properties of such networks. However, one of the challenges associated with such methods involves the interpretation and visualization of high-dimensional, dynamic networks. In this work, we employ graph embedding algorithms to provide low-dimensional vector representations of networks, thus facilitating traditional objectives such as visualization, interpretation and classification. We focus on linear graph embedding methods based on principal component analysis and regularized linear discriminant analysis. The proposed graph embedding methods are validated through a series of simulations and applied to fMRI data from the Human Connectome Project.} }