Star subdivisions and connected even factors in the square of a graph
Abstract
For any positive integer s, a [2,2s]-factor in a graph G is a connected even factor with maximum degree at most 2s. We prove that if every induced S(K1, 2s+1) in a graph G has at least 3 edges in a block of degree at most two, then G2 has a [2,2s]-factor. This extends the results of Hendry and Vogler and of Abderrezzak et al.
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