Abstract
An edge subset S of a connected graph G is a k-restricted edge cut if G - S is disconnected, and every component of G - S has at least k vertices. The k-restricted edge connectivity is the cardinality of a minimum k-restricted edge cut. In this note, we show that except for a well-defined class of graphs, k-restricted edge cuts of a connected graph G exist for any k ⩽ δ ( G ) + 1 , where δ ( G ) is the minimum degree of G. Furthermore, we obtain an upper bound for k-restricted edge connectivity.
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