A Polynomial Kernel for Vertex Deletion to the Scattered Class of Proper Interval Graph and Trees

Abstract

Vertex deletion to hereditary graph class is well-studied in parameterized complexity. Vertex deletion to the scattered graph classes has gained attention in recent years. In this paper, we consider (Proper-Interval, Tree)-Vertex Deletion, the input to which is an undirected graph G = (V, E) and an integer k. The goal is to pick a set X ⊂eq V(G) of at most k vertices such that G - X is a simple graph and every connected component of G - X is a proper interval graph or a tree. When parameterized by the solution size k, (Proper-Interval, Tree)-Vertex Deletion has been proved to be fixed-parameter tractable by Jacob et al. [JCSS-2023, FCT-2021]. In this paper, we consider this problem from the perspective of polynomial kernelization. We provide a first nontrivial polynomial kernel for (Proper-Interval, Tree)-Vertex Deletion, with O(k33) vertices.