arXiv:1608.06989 Abstract | arXiv Analytics

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A better lower bound on average degree of k-list-critical graphs

Published 2016-08-24Version 1

We improve the best known bounds on average degree of $k$-list-critical graphs for $k \ge 6$. Specifically, for $k \ge 7$ we show that every non-complete $k$-list-critical graph has average degree at least $k-1 + \frac{(k-3)^2 (2 k-3)}{k^4-2 k^3-11 k^2+28 k-14}$ and every non-complete $6$-list-critical graph has average degree at least $5 + \frac{93}{766}$. The same bounds hold for online $k$-list-critical graphs.

Categories: math.CO

Keywords: average degree, better lower bound, k-list-critical graphs, non-complete

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arXiv:1608.06989 [math.CO]Abstract References Reviews Resources

A better lower bound on average degree of k-list-critical graphs

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A better lower bound on average degree of k-list-critical graphs

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arXiv:1608.06989 [math.CO]Abstract References Reviews Resources