Polynomial method for perfect 2-colourings of circulant graphs
Abstract
In this paper we prove that if an infinite circulant graph with k distances has a perfect 2-colouring with parameters (b, c), then b + c ≤ 2k + b+cqt for all positive integers t and primes q satisfying b+cgcd(b,c) qt. In addition, we show that if b + c = qt, then this necessary condition becomes sufficient for the existence of perfect 2-colourings in circulant graphs.
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