Cages and cyclic connectivity
Abstract
A graph G is cyclically c-edge-connected if there is no set of fewer than c edges that disconnects G into at least two cyclic components. We prove that if a (k, g)-cage G has at most 2M(k, g) - g2 vertices, where M(k, g) is the Moore bound, then G is cyclically (k - 2)g-edge-connected, which equals the number of edges separating a g-cycle, and every cycle-separating (k - 2)g-edge-cut in G separates a cycle of length g. In particular, this is true for unknown cages with (k, g) ∈ \(3, 13), (3, 14), (3, 15), (4, 9), (4, 10), (4, 11), (5, 7), (5, 9), (5, 10), (5, 11), (6, 7), (9, 7)\ and also the potential missing Moore graph with degree 57 and diameter 2. Keywords: cage, cyclic connectivity, girth, lower bound
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