Saturation phenomena for some classes of nonlinear nonlocal eigenvalue problems

Abstract

Let us consider the following minimum problem \[ λα(p,r)= u∈ W01,p(-1,1)\\ u0∫-11|u'|pdx+α|∫-11|u|r-1u\, dx| pr∫-11|u|pdx, \] where α∈ R, p 2 and p2 r p. We show that there exists a critical value αC=αC (p,r) such that the minimizers have constant sign up to α=αC and then they are odd when α>αC.