On the Fixed-Parameter Tractability of Some Matching Problems Under the Color-Spanning Model

TL;DR

This paper investigates the fixed-parameter tractability of various matching problems under the color-spanning model, showing some are polynomially solvable while others are W[1]-hard, advancing understanding of their computational complexity.

Contribution

It establishes the FPT status of three color-spanning matching problems and proves W[1]-hardness for a related graph matching problem, clarifying their computational boundaries.

Findings

MinSum, MaxMin, and MinMax matching problems are polynomially solvable.

The k-Multicolored Independent Matching problem is W[1]-hard.

Results differentiate the complexity of matching problems under the color-spanning model.

Abstract

Given a set of $n$ points $P$ in the plane, each colored with one of the $t$ given colors, a color-spanning set $S\subset P$ is a subset of $t$ points with distinct colors. The minimum diameter color-spanning set (MDCS) is a color-spanning set whose diameter is minimum (among all color-spanning sets of $P$). Somehow symmetrically, the largest closest pair color-spanning set (LCPCS) is a color-spanning set whose closest pair is the largest (among all color-spanning sets of $P$). Both MDCS and LCPCS have been shown to be NP-complete, but whether they are fixed-parameter tractable (FPT) when $t$ is a parameter is still open. Motivated by this question, we consider the FPT tractability of some matching problems under this color-spanning model, where $t=2k$ is the parameter. The problems are summarized as follows: (1) MinSum Matching Color-Spanning Set, namely, computing a matching of $2k$ points with distinct colors such that their total edge length is minimized; (2) MaxMin Matching Color-Spanning Set, namely, computing a matching of $2k$ points with distinct colors such that the minimum edge length is maximized; (3) MinMax Matching Color-Spanning Set, namely, computing a matching of $2k$ points with distinct colors such that the maximum edge length is minimized; and (4) $k$-Multicolored Independent Matching, namely, computing a matching of $2k$ vertices in a graph such that the vertices of the edges in the matching do not share common edges in the graph. We show that the first three problems are polynomially solvable (hence in FPT), while problem (4) is W[1]-hard.