Non-convergence of the principal eigenvalue of elliptic operators for large advection

Abstract

This paper investigates the limit of the principal eigenvalue λ(s) as s+∞ for the following elliptic equation align* -(x)-2sv·∇(x)+c(x)(x)=λ(s)(x), x∈ align* in a bounded domain ⊂ Rd (d≥ 1) with the Neumann boundary condition. Previous studies have shown that under certain conditions on v, λ(s) converges as s∞ (including cases where s ∞ λ(s)=∞). This work constructs an example such that λ(s) is divergent as s+∞. This seems to be the first rigorous result demonstrating the non-convergence of the principal eigenvalue for second-order linear elliptic operators with some strong advection. As an application, we demonstrate that for the classical advection-reaction-diffusion model with advective velocity field v=∇ m, where m is a potential function with infinite oscillations, the principal eigenvalue changes sign infinitely often along a subsequence of s∞. This leads to solution behaviors that differ significantly from those observed when m is non-oscillatory.