English

Deterministic "Snakes and Ladders" Heuristic for the Hamiltonian Cycle Problem

Combinatorics 2019-02-28 v1 Discrete Mathematics

Abstract

We present a polynomial complexity, deterministic, heuristic for solving the Hamiltonian Cycle Problem (HCP) in an undirected graph of order nn. Although finding a Hamiltonian cycle is not theoretically guaranteed, we have observed that the heuristic is successful even in cases where such cycles are extremely rare, and it also performs very well on all HCP instances of large graphs listed on the TSPLIB web page. The heuristic owes its name to a visualisation of its iterations. All vertices of the graph are placed on a given circle in some order. The graph's edges are classified as either snakes or ladders, with snakes forming arcs of the circle and ladders forming its chords. The heuristic strives to place exactly nn snakes on the circle, thereby forming a Hamiltonian cycle. The Snakes and Ladders Heuristic (SLH) uses transformations inspired by kk-opt algorithms such as the, now classical, Lin-Kernighan heuristic to reorder the vertices on the circle in order to transform some ladders into snakes and vice versa. The use of a suitable stopping criterion ensures the heuristic terminates in polynomial time if no improvement is made in n3n^3 major iterations.

Keywords

Cite

@article{arxiv.1902.10337,
  title  = {Deterministic "Snakes and Ladders" Heuristic for the Hamiltonian Cycle Problem},
  author = {Pouya Baniasadi and Vladimir Ejov and Jerzy A Filar and Michael Haythorpe and Serguei Rossomakhine},
  journal= {arXiv preprint arXiv:1902.10337},
  year   = {2019}
}
R2 v1 2026-06-23T07:52:35.501Z