Limiting behavior of principal eigenvalues and eigenfunctions for a class of elliptic operators with degenerate large advection

Abstract

In this paper we study, both numerically and analytically, the asymptotic behavior of the principal eigenfunction of 1.1, normalized by 1.2, as s +∞. Based on the numerical computations of this paper, we can prove that, under condition (Hm) bellow, s approximates 1 and s' approximates 0, uniformly in [-1,1], as s +∞. As a byproduct of this result, we can derive the asymptotic behavior of the principal eigenvalue in a one-dimensional situation not previously covered by ChLo and PeZh, as we are working under minimal regularity assumptions on m(x). A recent result of BWZ shows that the principal eigenvalue might oscillate as s +∞ if m(x) is highly oscillatory. Thus, the oscillatory and regularity properties of m(x) might severely affect the asymptotic behavior of (λs,s) as s +∞.