Monotonicity of principal eigenvalue for elliptic operators with incompressible flow: A functional approach

Abstract

We establish the monotonicity of the principal eigenvalue λ1(A), as a function of the advection amplitude A, for the elliptic operator LA=-div(a(x)∇)+AV·∇ +c(x) with incompressible flow V, subject to Dirichlet, Robin and Neumann boundary conditions. As a consequence, the limit of λ1(A) as A ∞ always exists and is finite for Robin boundary conditions. These results answer some open questions raised by [Berestycki, H., Hamel, F., Nadirashvili, N.: Elliptic eigenvalue problems with large drift and applications to nonlinear propagation phenomena, Commun. Math. Phys. 253, 451-480 (2005)]. Our method relies upon some functional which is associated with principal eigenfuntions for operator LA and its adjoint operator. As a byproduct of the approach, a new min-max characterization of λ1(A) is given.