Partition of unity methods (PUMs) on graphs are simple and highly adaptive auxiliary tools for graph signal processing. Based on a greedy-type metric clustering and augmentation scheme, we show how a partition of unity can be generated in an efficient way on graphs. We investigate how PUMs can be combined with a local graph basis function (GBF) approximation method in order to obtain low-cost global interpolation or classification schemes. From a theoretical point of view, we study necessary prerequisites for the partition of unity such that global error estimates of the PUM follow from corresponding local ones. Finally, properties of the PUM as cost-efficiency and approximation accuracy are investigated numerically.

Partition of Unity Methods for Signal Processing on Graphs

Cavoretto R.
First
;
De Rossi A.;Erb W.
2021-01-01

Abstract

Partition of unity methods (PUMs) on graphs are simple and highly adaptive auxiliary tools for graph signal processing. Based on a greedy-type metric clustering and augmentation scheme, we show how a partition of unity can be generated in an efficient way on graphs. We investigate how PUMs can be combined with a local graph basis function (GBF) approximation method in order to obtain low-cost global interpolation or classification schemes. From a theoretical point of view, we study necessary prerequisites for the partition of unity such that global error estimates of the PUM follow from corresponding local ones. Finally, properties of the PUM as cost-efficiency and approximation accuracy are investigated numerically.
2021
27
4
1
29
https://arxiv.org/abs/2012.10636
Graph basis functions (GBFs); Graph signal processing; Kernel-based approximation and interpolation; Partition of unity method (PUM); Spectral graph theory
Cavoretto R.; De Rossi A.; Erb W.
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/2318/1799363
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