C2k+1-coloring of bounded-diameter graphs: Polynomial-time Solvability and Subexponential Algorithms

이 논문은 C2k+1-coloring 문제에 대한 다양한 해법과 알고리즘에 대한 연구 결과를 제시하고 있습니다. 논문에서는 bounded-diameter 그래프에서의 C2k+1-coloring 문제에 대해 다루고 있으며, 다양한 해법과 알고리즘을 소개하고 있습니다. 또한, 다양한 경우에 대한 해법과 알고리즘을 통해 문제를 다루는 방법을 제시하고 있습니다.

Introduction

• Graph homomorphism problem focuses on edge-preserving mappings between graphs.
• Study on Hom(C2k+1) problem on bounded-diameter graphs for k ≥ 2.
• Polynomial-time solvability for diameter-(k + 1) graphs.
• Subexponential-time algorithms for diameter-(k + 2) and -(k + 3) graphs.
• Lower bound for diameter-(2k+2) graphs.

Key Insights

• Bounded-diameter graphs are common in applications like social networks.
• Graph homomorphism problem complexity varies based on target graphs.
• Odd cycles play a significant role in graph coloring problems.
• Polynomial-time and subexponential-time algorithms for different graph diameters.

Further Research

• Can the results of this study be applied to other graph coloring problems?
• How do the findings of this study contribute to the broader field of graph theory?
• What implications do the subexponential-time algorithms have for solving other complex graph problems?