Lollipops, dense cycles and chords
Abstract
In 1980, Gupta, Kahn and Robertson proved that every graph G with minimum degree at least k≥ 2 contains a cycle C containing at least k+1 vertices each having at least k neighbors in C (so C has at least (k+1)(k-2)2 chords). In this work, we go further by showing that some of its edges can be contracted to obtain a graph with high minimum degree (we call such a minor of C a cyclic minor). We then investigate further cycles having cliques as cyclic minors, and show that minimum degree at least O(k2) guarantees a cyclic Kk-minor.
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