Bounds on the spectral radius of real-valued non-negative Kernels on measurable spaces

Abstract

In this short technical note, we extend a recently published result [Liao2017] on the Perron root (or the spectral radius) of non-negative matrices to real-valued non-negative kernels on an arbitrary measurable space (E, E). To be precise, for any real-valued non-negative kernel K : E× E → R, we prove that the spectral radius (K) of K satisfies ∈fx ∈ E R K ·p L (x) R L (x) (K) x ∈ E R K·p L (x) R L (x) , where L is an arbitrary Kernel on (E, E), which is integrable with respect to the left eigenmeasure of K and satisfies R L (x) >0 for all x ∈ E, and the operator R is defined by RL (x) :=∫E L(x, dy) .