Graph Signal Processing Over a Probability Space of Shift Operators

被引：4

作者：

Ji, Feng ^{[1
]}

Tay, Wee Peng ^{[1
]}

Ortega, Antonio ^{[2
]}

机构：

[1] Nanyang Technol Univ, Sch Elect & Elect Engn, Singapore 639798, Singapore

[2] Univ Southern Calif, Viterbi Sch Engn, Los Angeles, CA 90089 USA

来源：

IEEE TRANSACTIONS ON SIGNAL PROCESSING | 2023年 / 71卷

关键词：

Band-pass; distribution of operators; Fourier transform; graph signal processing; MFC filters; sampling; NETWORK;

D O I：

10.1109/TSP.2023.3263675

中图分类号：

TM [电工技术]; TN [电子技术、通信技术];

学科分类号：

0808 ; 0809 ;

摘要：

Graph signal processing (GSP) uses a shift operator to define a Fourier basis for the set of graph signals. The shift operator is often chosen to capture the graph topology. However, in many applications, the graph topology may be unknown a priori, its structure uncertain, or generated randomly from a predefined set for each observation. Each graph topology gives rise to a different shift operator. In this paper, we develop a GSP framework over a probability space of shift operators. We develop the corresponding notions of Fourier transform, MFC filters, and band-pass filters, which subsumes classical GSP theory as the special case where the probability space consists of a single shift operator. We show that an MFC filter under this framework is the expectation of random convolution filters in classical GSP, while the notion of bandlimitedness requires additional wiggle room from being simply a fixed point of a band-pass filter. We develop a mechanism that facilitates mapping from one space of shift operators to another, which allows our framework to be applied to a rich set of scenarios. We demonstrate how the theory can be applied by using both synthetic and real datasets.

引用

页码：1159 / 1174

页数：16

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