Estimates on the spectral interval of validity of the anti-maximum principle
Abstract
The anti-maximum principle for the homogeneous Dirichlet problem to -p u = λ |u|p-2u + f(x) with positive f ∈ L∞() states the existence of a critical value λf > λ1 such that any solution of this problem with λ ∈ (λ1, λf) is strictly negative. In this paper, we give a variational upper bound for λf and study its properties. As an important supplementary result, we investigate the branch of ground state solutions of the considered boundary value problem in (λ1,λ2).
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