Sublinear elliptic equations with a sharp change of sign in the nonlinearity
Abstract
We study the semilinear indefinite elliptic problem \[ - u = Q |u|p-2u in RN, \] where Q = - RN , ⊂ RN is a bounded smooth subset, N ≥ 3, and 1 ≤ p < 2, with p=1 corresponding to the sign nonlinearity. Using a variational approach, we investigate the uniqueness or multiplicity of nonnegative solutions depending on the shape of and the existence of different types of nodal solutions. We also show that all solutions have compact support and analyze how the support of the ground state depends on p, proving convergence to the whole space as p 2- and identifying some qualitative features such as starshapedness and Lipschitz regularity of the support. We also establish a link between these problems and a two-phase Serrin-type torsion overdetermined problem.
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