Refined Limiting Profiles of the Principal Eigenvalue Problems with Large Advection

Abstract

In this paper, we are concerned with the following eigenvalue problem with an advection term: equation0.1 \ split -ε φ-2α∇ m(x)·∇ φ+V(x)φ&=λ φ\ \ in\ \ ,\\ φ&=0\ \ on\ \ ∂, ~~~(0.1) split . equation where ⊂RN~(N≥1) satisfying ∂∈ C2 is a bounded domain and contains the origin as an interior point, the constants ε>0 and α>0 are the diffusive and advection coefficients, respectively, and m(x)∈ C2(), V (x)∈ Cγ()~(0<γ<1) are given functions. We analyze the refined limiting profiles of the principal eigenpair (λ, φ) for (0.1) as α→∞, which display the visible effect of the large advection on (λ, φ). It expects that our argument is applicable to investigating the refined expansions of the general principal eigenvalue problems.

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