A parameterized algorithm for $K_r$-factors in graphs of high minimum degree

TL;DR

This paper presents a fixed-parameter tractable algorithm for finding $K_r$-factors in graphs with high minimum degree, extending classical theorems and connecting to equitable colorings.

Contribution

It introduces a parameterized algorithm for $K_r$-factors in graphs with high minimum degree, bridging classical combinatorial results with algorithmic solutions.

Findings

Algorithm runs in $2^{c^{O(1)}} n^{O(1)}$ time for fixed $c$.

Provides a characterization of $K_r$-factor existence via $K_r$-tilings.

Connects $K_r$-factor problems to equitable colorings and $K_r$-tilings.

Abstract

A $K_r$-factor of a graph $G$ is a collection of vertex-disjoint $r$-cliques covering $V(G)$. We prove the following algorithmic version of the classical Hajnal--Szemer\'edi Theorem in graph theory, when $r$ is considered as a constant. Given $r, c, n\in \mathbb{N}$ such that $n\in r\mathbb N$, let $G$ be an $n$-vertex graph with minimum degree at least $(1-1/r)n - c$. Then there is an algorithm with running time $2^{c^{O(1)}} n^{O(1)}$ that outputs either a $K_r$-factor of $G$ or a certificate showing that none exists, namely, this problem is fixed-parameter tractable in $c$. On the other hand, it is known that if $c = n^{\varepsilon}$ for fixed $\varepsilon \in (0,1)$, the problem is \texttt{NP-C}. By taking the complement, our result yields a similar result on the equitable $\Delta$-colorings of graphs of maximum degree $\Delta+c$, for $\Delta\in [n/r, n/(r-1)]$. We indeed establish characterization theorems for this problem, showing that the existence of a $K_r$-factor is equivalent to the existence of certain class of $K_r$-tilings of size $o(n)$, whose existence can be searched by the color-coding technique developed by Alon--Yuster--Zwick.