# On the tightness of graph-based statistics

**Authors:** Lynna Chu, Hao Chen

arXiv: 2303.00136 · 2023-03-02

## TL;DR

This paper proves the tightness of graph-based stochastic processes with potential discontinuities, using higher moments analysis, applicable to various graph types including dense graphs, to facilitate convergence results.

## Contribution

It introduces an alternative method to establish tightness via higher moments bounds for graph-based statistics, overcoming intractability of classic approaches.

## Key findings

- Established tightness of graph-based processes with discontinuities.
- Derived explicit formulas for higher moments of graph-based statistics.
- Applicable to a wide range of graphs, including dense graphs.

## Abstract

We establish tightness of graph-based stochastic processes in the space $D[0+\epsilon,1-\epsilon]$ with $\epsilon >0$ that allows for discontinuities of the first kind. The graph-based stochastic processes are based on statistics constructed from similarity graphs. In this setting, the classic characterization of tightness is intractable, making it difficult to obtain convergence of the limiting distributions for graph-based stochastic processes. We take an alternative approach and study the behavior of the higher moments of the graph-based test statistics. We show that, under mild conditions of the graph, tightness of the stochastic process can be established by obtaining upper bounds on the graph-based statistics' higher moments. Explicit analytical expressions for these moments are provided. The results are applicable to generic graphs, including dense graphs where the number of edges can be of higher order than the number of observations.

## Full text

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## Figures

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## References

15 references — full list in the complete paper: https://tomesphere.com/paper/2303.00136/full.md

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Source: https://tomesphere.com/paper/2303.00136