Graphs with the minimum spectral radius for given independence number

Abstract

Let Gn,α be the set of connected graphs with order n and independence number α. Given k=n-α, the graph with minimum spectral radius among Gn,α is called the minimizer graph. Stevanovi\'c in the classical book [D. Stevanovi\'c, Spectral Radius of Graphs, Academic Press, Amsterdam, 2015.] pointed that determining minimizer graph in Gn,α appears to be a tough problem on page 96. Very recently, Lou and Guo in Lou proved that the minimizer graph of Gn,α must be a tree if αn2. In this paper, we further give the structural features for the minimizer graph in detail, and then provide of a constructing theorem for it. Thus, theoretically we completely determine the minimizer graphs in Gn,α along with their spectral radius for any given k=n-α n2. As an application, we determine all the minimizer graphs in Gn,α for α=n-1,n-2,n-3,n-4,n-5,n-6 along with their spectral radii, the first four results are known in Xu,Lou and the last two are new.