A Polynomial Kernel for Paw-Free Editing
Abstract
For a fixed graph , the -free-editing problem asks whether we can modify a given graph by adding or deleting at most edges such that the resulting graph does not contain as an induced subgraph. The problem is known to be NP-complete for all fixed with at least vertices and it admits a algorithm. Cai and Cai showed that the -free-editing problem does not admit a polynomial kernel whenever or its complement is a path or a cycle with at least edges or a -connected graph with at least edge missing. Their results suggest that if is not independent set or a clique, then -free-editing admits polynomial kernels only for few small graphs , unless . Therefore, resolving the kernelization of -free-editing for small graphs plays a crucial role in obtaining a complete dichotomy for this problem. In this paper, we positively answer the question of compressibility for one of the last two unresolved graphs on vertices. Namely, we give the first polynomial kernel for paw-free editing with vertices.
Keywords
Cite
@article{arxiv.1911.03683,
title = {A Polynomial Kernel for Paw-Free Editing},
author = {Eduard Eiben and William Lochet and Saket Saurabh},
journal= {arXiv preprint arXiv:1911.03683},
year = {2019}
}