Saved in:
Bibliographic Details
Main Authors: Lai, Yingcheng, Chai, Li, Xu, Jinming
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2412.20041
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866929652114653184
author Lai, Yingcheng
Chai, Li
Xu, Jinming
author_facet Lai, Yingcheng
Chai, Li
Xu, Jinming
contents The sampling of graph signals has recently drawn much attention due to the wide applications of graph signal processing. While a lot of efficient methods and interesting results have been reported to the sampling of band-limited or smooth graph signals, few research has been devoted to non-smooth graph signals, especially to sparse graph signals, which are also of importance in many practical applications. This paper addresses the random sampling of non-smooth graph signals generated by diffusion of sparse inputs. We aim to present a solid theoretical analysis on the random sampling of diffused sparse graph signals, which can be parallel to that of band-limited graph signals, and thus present a sufficient condition to the number of samples ensuring the unique recovery for uniform random sampling. Then, we focus on two classes of widely used binary graph models, and give explicit and tighter estimations on the sampling numbers ensuring unique recovery. We also propose an adaptive variable-density sampling strategy to provide a better performance than uniform random sampling. Finally, simulation experiments are presented to validate the effectiveness of the theoretical results.
format Preprint
id arxiv_https___arxiv_org_abs_2412_20041
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle On Random Sampling of Diffused Graph Signals with Sparse Inputs on Vertex Domain
Lai, Yingcheng
Chai, Li
Xu, Jinming
Signal Processing
The sampling of graph signals has recently drawn much attention due to the wide applications of graph signal processing. While a lot of efficient methods and interesting results have been reported to the sampling of band-limited or smooth graph signals, few research has been devoted to non-smooth graph signals, especially to sparse graph signals, which are also of importance in many practical applications. This paper addresses the random sampling of non-smooth graph signals generated by diffusion of sparse inputs. We aim to present a solid theoretical analysis on the random sampling of diffused sparse graph signals, which can be parallel to that of band-limited graph signals, and thus present a sufficient condition to the number of samples ensuring the unique recovery for uniform random sampling. Then, we focus on two classes of widely used binary graph models, and give explicit and tighter estimations on the sampling numbers ensuring unique recovery. We also propose an adaptive variable-density sampling strategy to provide a better performance than uniform random sampling. Finally, simulation experiments are presented to validate the effectiveness of the theoretical results.
title On Random Sampling of Diffused Graph Signals with Sparse Inputs on Vertex Domain
topic Signal Processing
url https://arxiv.org/abs/2412.20041