Splines and wavelets on circulant graphs

Madeleine Kotzagiannidis, Pier Luigi Dragotti

Research output: Contribution to journalArticlepeer-review

Abstract / Description of output

We present novel families of wavelets and associated filterbanks for the analysis and representation of functions defined on circulant graphs. In this work, we leverage the inherent vanishing moment property of the circulant graph Laplacian operator, and by extension, the e-graph Laplacian, which is established as a parameterization of the former with respect to the degree per node, for the design of vertex-localized and critically-sampled higher-order graph (e-)spline wavelet filterbanks, which can reproduce and annihilate classes of (exponential) polynomial signals on circulant graphs. In addition, we discuss similarities and analogies of the detected properties and resulting constructions with splines and spline wavelets in the Euclidean domain. Ultimately, we consider generalizations to arbitrary graphs in the form of graph approximations, with focus on graph product decompositions. In particular, we proceed to show how the use of graph products facilitates a multi-dimensional extension of the proposed constructions and properties.
Original languageEnglish
JournalApplied and Computational Harmonic Analysis
Early online date14 Oct 2017
DOIs
Publication statusE-pub ahead of print - 14 Oct 2017

Keywords / Materials (for Non-textual outputs)

  • Graph signal processing
  • Graph wavelet
  • Sparse representation
  • Circulant graphs
  • Splines

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