# Structural Parameterization for Graph Deletion Problems over Data   Streams

**Authors:** Arijit Bishnu, Arijit Ghosh, Sudeshna Kolay, Gopinath Mishra, and Saket Saurabh

arXiv: 1906.05458 · 2019-10-03

## TL;DR

This paper introduces the first parameterized streaming algorithms for graph deletion problems using structural parameters like vertex cover size, across multiple streaming models, overcoming previous limitations tied to solution size parameters.

## Contribution

It pioneers the use of structural parameters in parameterized streaming complexity, expanding beyond solution size parameters and addressing multiple streaming models.

## Key findings

- Developed streaming algorithms parameterized by vertex cover size K.
- Achieved results across EA, DEA, VA, and AL streaming models.
- Overcame previous barriers for problems like Feedback Vertex Set and Triangle Deletion.

## Abstract

The study of parameterized streaming complexity on graph problems was initiated by Fafianie et al. (MFCS'14) and Chitnis et al. (SODA'15 and SODA'16). Simply put, the main goal is to design streaming algorithms for parameterized problems such that $O\left(f(k)\log^{O(1)}n\right)$ space is enough, where $f$ is an arbitrary computable function depending only on the parameter $k$. However, in the past few years, very few positive results have been established. Most of the graph problems that do have streaming algorithms of the above nature are ones where localized checking is required, like Vertex Cover or Maximum Matching parameterized by the size $k$ of the solution we are seeking. Many important parameterized problems that form the backbone of traditional parameterized complexity are known to require $\Omega(n)$ bits for any streaming algorithm; e.g., Feedback Vertex Set, Even/Odd Cycle Transversal, Triangle Deletion or the more general ${\cal F}$-Subgraph Deletion when parameterized by solution size $k$.   Our main conceptual contribution is to overcome the obstacles to efficient parameterized streaming algorithms by utilizing the power of parameterization. To the best of our knowledge, this is the first work in parameterized streaming complexity that considers structural parameters instead of the solution size as a parameter. We focus on the vertex cover size $K$ as the parameter for the parameterized graph deletion problems we consider. At the same time, most of the previous work in parameterized streaming complexity was restricted to the EA (edge arrival) or DEA (dynamic edge arrival) models. In this work, we consider the above mentioned graph deletion problems in the four most well-studied streaming models, i.e., the EA, DEA, VA (vertex arrival) and AL (adjacency list) models.

## Full text

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## Figures

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## References

28 references — full list in the complete paper: https://tomesphere.com/paper/1906.05458/full.md

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Source: https://tomesphere.com/paper/1906.05458