A saturation phenomenon for a nonlinear nonlocal eigenvalue problem
Abstract
Given 1 q 2 and α∈ R, we study the properties of the solutions of the minimum problem \[ λ(α,q)=\∫-11|u'|2dx+α|∫-11|u|q-1u\, dx|2q∫-11|u|2dx, u∈ H01(-1,1),\,u 0\. \] In particular, depending on α and q, we show that the minimizers have constant sign up to a critical value of α=αq, and when α>αq the minimizers are odd.
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