Asymptotic Behavior of the Principal Eigenvalue Problems with Large Divergence-Free Drifts

Abstract

In this paper, we consider the following principal eigenvalue problem with a large divergence-free drift: equation0.1 - φ-2α∇ m(x)·∇ φ+V(x)φ=λα φ\ \,\ in\, \ H01(),0.1 equation where the domain ⊂ RN (N 1) is bounded with smooth boundary ∂, the constants >0 and α>0 are the diffusion and drift coefficients, respectively, and m(x)∈ C2(), V (x)∈ Cγ()~(0<γ<1) are given functions. For a class of divergence-free drifts where m is a harmonic function in and has no first integral in H01(), we prove the convergence of the principal eigenpair (λα, φ) for (0.1) as α→+∞, which addresses a special case of the open question proposed in [H. Berestycki, F. Hamel and N. Nadirashvili, CMP, 2005]. Moreover, we further investigate the refined limiting profiles of the principal eigenpair (λα, φ) for (0.1) as α→+∞, which display the visible effects of the large divergence-free drifts on the principal eigenpair (λα, φ).