RamseyRL: A Framework for Intelligent Ramsey Number Counterexample Searching

08/23/2023
by   Steve Vott, et al.
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The Ramsey number is the minimum number of nodes, n = R(s, t), such that all undirected simple graphs of order n, contain a clique of order s, or an independent set of order t. This paper explores the application of a best first search algorithm and reinforcement learning (RL) techniques to find counterexamples to specific Ramsey numbers. We incrementally improve over prior search methods such as random search by introducing a graph vectorization and deep neural network (DNN)-based heuristic, which gauge the likelihood of a graph being a counterexample. The paper also proposes algorithmic optimizations to confine a polynomial search runtime. This paper does not aim to present new counterexamples but rather introduces and evaluates a framework supporting Ramsey counterexample exploration using other heuristics. Code and methods are made available through a PyPI package and GitHub repository.

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