Nonseparating trees in 2-connected graphs and oriented trees in strongly connected digraphs
Abstract
Mader [J. Graph Theory 65 (2010) 61-69] conjectured that for every positive integer and every finite tree with order , every -connected, finite graph with contains a subtree isomorphic to such that is -connected. The conjecture has been verified for paths, trees when , and stars or double-stars when . In this paper we verify the conjecture for two classes of trees when . For digraphs, Mader [J. Graph Theory 69 (2012) 324-329] conjectured that every -connected digraph with minimum semi-degree for a positive integer has a dipath of order with . The conjecture has only been verified for the dipath with , and the dipath with and . In this paper, we prove that every strongly connected digraph with minimum semi-degree contains an oriented tree isomorphic to some given oriented stars or double-stars with order such that is still strongly connected.
Keywords
Cite
@article{arxiv.1710.01883,
title = {Nonseparating trees in 2-connected graphs and oriented trees in strongly connected digraphs},
author = {Yingzhi Tian and Hong-Jian Lai and Liqiong Xu and Jixiang Meng},
journal= {arXiv preprint arXiv:1710.01883},
year = {2017}
}