An Erdos-Gallai-type theorem for keyrings with larger number of leaves
Abstract
A keyring is a graph obtained from a cycle by appending r0 leaves to one of its vertices. Sidorenko proved an Erdos-Gallai-type theorem: Every graph of order n and size more than (k-1)n2 contains a keyring of size at least k and with r leaves for rk-12 (Theorem 1.4, An Erdos-Gallai-type theorem for keyrings, Graphs Combin., 2018). In this note, we show that Sidorenko's theorem holds for larger r and so complete the Erdos-Gallai-type theorem for keyrings.
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