Limiting behavior of principal eigenvalues for a class of mixed boundary value problems as the measure of the support domain goes to zero
Abstract
In this paper we characterize the limiting behavior of the principal eigenvalue, 1[-,,], of the boundary value problem 1.1 as the Lebesgue measure of the underlying domain, , tends to zero. Naturally, the domains are assumed to be included on a fixed open set D such that ∈C(D), and they satisfy ⊂ D. Our main result establishes that, in the classical case when ∈fD >0, || 01[-,,] =+∞, whereas || 01[-,,] =-∞\;\;if\;\; D <0, which is a surprising result at the light of the classical existing theorems for Dirichlet boundary conditions. Furthermore, in the special case when >0 is a constant, we can prove that R 0( R 1[-,,BR])= Area( B1)|B1|, where, we are denoting B:=\x∈N\;:\;|x|<\ for all >0.
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