English

Parameterized Complexity of Vertex Splitting to Pathwidth at most 1

Data Structures and Algorithms 2023-07-12 v2

Abstract

Motivated by the planarization of 2-layered straight-line drawings, we consider the problem of modifying a graph such that the resulting graph has pathwidth at most 1. The problem Pathwidth-One Vertex Explosion (POVE) asks whether such a graph can be obtained using at most kk vertex explosions, where a vertex explosion replaces a vertex vv by deg(v)(v) degree-1 vertices, each incident to exactly one edge that was originally incident to vv. For POVE, we give an FPT algorithm with running time O(4km)O(4^k \cdot m) and an O(k2)O(k^2) kernel, thereby improving over the O(k6)O(k^6)-kernel by Ahmed et al. [GD 22] in a more general setting. Similarly, a vertex split replaces a vertex vv by two distinct vertices v1v_1 and v2v_2 and distributes the edges originally incident to vv arbitrarily to v1v_1 and v2v_2. Analogously to POVE, we define the problem variant Pathwidth-One Vertex Splitting (POVS) that uses the split operation instead of vertex explosions. Here we obtain a linear kernel and an algorithm with running time O((6k+12)km)O((6k+12)^k \cdot m). This answers an open question by Ahmed et al. [GD22]. Finally, we consider the problem Π\Pi Vertex Splitting (Π\Pi-VS), which generalizes the problem POVS and asks whether a given graph can be turned into a graph of a specific graph class Π\Pi using at most kk vertex splits. For graph classes Π\Pi that can be tested in monadic second-order graph logic (MSO2_2), we show that the problem Π\Pi-VS can be expressed as an MSO2_2 formula, resulting in an FPT algorithm for Π\Pi-VS parameterized by kk if Π\Pi additionally has bounded treewidth. We obtain the same result for the problem variant using vertex explosions.

Keywords

Cite

@article{arxiv.2302.14725,
  title  = {Parameterized Complexity of Vertex Splitting to Pathwidth at most 1},
  author = {Jakob Baumann and Matthias Pfretzschner and Ignaz Rutter},
  journal= {arXiv preprint arXiv:2302.14725},
  year   = {2023}
}
R2 v1 2026-06-28T08:52:04.325Z