A better bound on the largest induced forests in triangle-free planar graphs
Abstract
It is well-known that there exists a triangle-free planar graph of n verticess such that the largest induced forest has size at most 5n8. Salavatipour proved that there is a forest of size at least 5n9.41 in any triangle-free planar graph of n vertices. Dross, Montassier and Pinlou improved Salavatipour's bound to 5n9.17. In this work, we further improve the bound to 5n9. Our technique is inspired by the recent ideas from Lukot'ka, Maz\'ak and Zhu.
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