A Universal Lossless Compression Method applicable to Sparse Graphs and Heavy-Tailed Sparse Graphs

TL;DR

This paper introduces a universal lossless compression method designed for both sparse and heavy-tailed sparse graphs, leveraging local weak convergence and sparse graphon frameworks to handle different scaling behaviors.

Contribution

The paper presents a novel universal compression technique applicable to diverse sparse graph classes using advanced graph convergence frameworks.

Findings

Effective compression across sparse and heavy-tailed sparse graphs

Utilizes local weak convergence and graphon frameworks

Addresses scalability in graphical data compression

Abstract

Graphical data arises naturally in several modern applications, including but not limited to internet graphs, social networks, genomics and proteomics. The typically large size of graphical data argues for the importance of designing universal compression methods for such data. In most applications, the graphical data is sparse, meaning that the number of edges in the graph scales more slowly than $n^2$, where $n$ denotes the number of vertices. Although in some applications the number of edges scales linearly with $n$, in others the number of edges is much smaller than $n^2$ but appears to scale superlinearly with $n$. We call the former sparse graphs and the latter heavy-tailed sparse graphs. In this paper we introduce a universal lossless compression method which is simultaneously applicable to both classes. We do this by employing the local weak convergence framework for sparse graphs and the sparse graphon framework for heavy-tailed sparse graphs.