寻找哈密顿环

Csongor György Csehi, J. Tóth
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引用次数: 4

摘要

确定图中是否存在哈密顿环是一个np完全问题,因此对于大型图,组合函数哈密顿环速度很慢也就不足为奇了。狄拉克、奥雷、Pósa和Chvátal的定理提供了容易检验这种循环是否存在的充分条件。本文提供了用于这些条件的Mathematica程序,从而扩展了HamiltonianQ的功能,HamiltonianQ仅测试给定图的双连通性(一个简单的必要条件)。我们还通过实验研究了大型随机图是否满足条件的极限行为。所看到的现象被证明为一个定理,与Karp和Pósa早先的结果密切相关。
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Search for Hamiltonian Cycles
Determining whether Hamiltonian cycles exist in graphs is an NP-complete problem, so it is no wonder that the Combinatorica function HamiltonianCycle is slow for large graphs. Theorems by Dirac, Ore, Pósa, and Chvátal provide sufficient conditions that are easy to check for the existence of such cycles. This article provides Mathematica programs for those conditions, thus extending the capability of HamiltonianQ, which only tests the biconnectivity—a simple necessary condition—of a given graph. We also investigate experimentally the limiting behavior of whether the conditions are fulfilled for large random graphs. The phenomenon seen is proved as a theorem, closely related to earlier results by Karp and Pósa.
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