Linear Kernels for $l$-Exact Component Order Connectivity
数据结构与算法
2026-05-20 v1
摘要
The \textsc{-Exact Component Order Connectivity} problem asks whether, given an input graph and an integer , there exists a vertex subset of size at most such that every connected component in has exactly vertices. In this paper, we present an -vertex kernel for this problem, computable in time. This is the first known linear kernel for each fixed . For , this problem reduces to the classical \textsc{Vertex Cover}, and our result matches the best-known -vertex kernel. For (known as \textsc{Deletion to Induced Matching}), we can get a -vertex kernel, improving the previously known result of vertices. Our kernelization algorithm is built upon on an extended crown decomposition combined with linear programming and other techniques.
引用
@article{arxiv.2605.19853,
title = {Linear Kernels for $l$-Exact Component Order Connectivity},
author = {Yuxi Liu and Mingyu Xiao},
journal= {arXiv preprint arXiv:2605.19853},
year = {2026}
}