Principal eigenvectors and principal ratios in hypergraph Tur\'an problems

Abstract

For a general class of hypergraph Tur\'an problems with uniformity r, we investigate the principal eigenvector for the p-spectral radius (in the sense of Keevash--Lenz--Mubayi and Nikiforov) for the extremal graphs, showing in a strong sense that these eigenvectors have close to equal weight on each vertex (equivalently, showing that the principal ratio is close to 1). We investigate the sharpness of our result; it is likely sharp for the Tur\'an tetrahedron problem. In the course of this latter discussion, we establish a lower bound on the p-spectral radius of an arbitrary r-graph in terms of the degrees of the graph. This builds on earlier work of Cardoso--Trevisan, Li--Zhou--Bu, Cioaba--Gregory, and Zhang. The case 1 < p < r of our results leads to some subtleties connected to Nikiforov's notion of k-tightness, arising from the Perron-Frobenius theory for the p-spectral radius. We raise a conjecture about these issues, and provide some preliminary evidence for our conjecture.