%0 Journal Article
%T On the Fiedler value of large planar graphs
%A Lali Barri¨¨re
%A Clemens Huemer
%A Dieter Mitsche
%A David Orden
%J Computer Science
%D 2012
%I arXiv
%R 10.1016/j.laa.2013.05.032
%X The Fiedler value $\lambda_2$, also known as algebraic connectivity, is the second smallest Laplacian eigenvalue of a graph. We study the maximum Fiedler value among all planar graphs $G$ with $n$ vertices, denoted by $\lambda_{2\max}$, and we show the bounds $2+\Theta(\frac{1}{n^2}) \leq \lambda_{2\max} \leq 2+O(\frac{1}{n})$. We also provide bounds on the maximum Fiedler value for the following classes of planar graphs: Bipartite planar graphs, bipartite planar graphs with minimum vertex degree~3, and outerplanar graphs. Furthermore, we derive almost tight bounds on $\lambda_{2\max}$ for two more classes of graphs, those of bounded genus and $K_h$-minor-free graphs.
%U http://arxiv.org/abs/1206.3870v2