A Counterexample for the Principal Eigenvalue of An Elliptic Operator with Large Advection

Abstract

There are numerous studies focusing on the convergence of the principal eigenvalue λ(s) as s+∞ corresponding to the elliptic eigenvalue problem align* -(x)-2sv·∇(x)+c(x)(x)=λ(s)(x), x∈ , align* where is a bounded domain and the advection term v under some certain restrictions. In this paper, we construct an infinitely oscillating gradient advection term v=∇ m(x)∈ C1() such that the principal eigenvalue λ(s) does not converge as s+∞. As far as we know, this is the first result that guarantee the non-convergence of the principal eigenvalue.

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