Frames and Bases of Translates of Signals on Undirected Graphs

Abstract

We study a shift invariant space on an undirected graphs G having N vertices. We obtain a characterization theorem for a system of generalized translates \Tig : 1≤ i≤ N\, for g∈ CN, to form an orthonormal basis. Moreover, we find a necessary and sufficient condition for the system \Tig : 1≤ i≤ m\, m≤ N, to form a linearly independent set and an orthonormal set. Further, we obtain a characterization result for a system of generalized translates which is generated by multiple generators g1,...,gM to form a frame for CN. In particular, we deduce similar results for the system \TiMsg : 1≤ i,s≤ N\ with modulation Ms and the spectral graph wavelet system. We also provide an illustration for the spectral graph wavelet system.

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