AbstractIt is well known that the spectral radius of a tree whose maximum degree is Δ cannot exceed 2Δ−1. In this paper we derive similar bounds for arbitrary planar graphs and for graphs of bounded genus. Using the decomposition result of Gonçalves (2009) [9], we prove that the spectral radius ρ(G) of a planar graph G of maximum vertex degree Δ⩾2 satisfies ρ(G)⩽8Δ−16+3.47. This result is best possible up to the additive constant—we construct an (infinite) planar graph of maximum degree Δ, whose spectral radius is 8Δ−16. This generalizes and improves several previous results and solves an open problem proposed by Tom Hayes. Similar bounds are derived for graphs of bounded genus. For every k, these bounds can be improved by excluding K2,k as...