Sign-changing bubble-tower solutions to fractional semilinear elliptic problems

Abstract

We study the asymptotic and qualitative properties of least energy radial sign-changing solutions to fractional semilinear elliptic problems of the form \[ cases (-)s u = |u|2*s-2-u &in BR, \\ u = 0 &in Rn BR, cases \] where s ∈ (0,1), (-)s is the s-Laplacian, BR is a ball of Rn, 2*s := 2nn-2s is the critical Sobolev exponent and >0 is a small parameter. We prove that such solutions have the limit profile of a "tower of bubbles", as 0+, i.e. the positive and negative parts concentrate at the same point with different concentration speeds. Moreover, we provide information about the nodal set of these solutions.