On the structure of the nodal set and asymptotics of least energy sign-changing radial solutions of the fractional Brezis-Nirenberg problem

Abstract

In this paper we study the asymptotic and qualitative properties of least energy radial sign-changing solutions of the fractional Brezis--Nirenberg problem ruled by the s-laplacian, in a ball of Rn, when s ∈ (0,1) and n > 6s. As usual, λ is the (positive) parameter in the linear part in u, and we consider λ close to zero. We prove that if such solutions vanish at the center of the ball then they vanish everywhere, we establish a bound on the number of sign-changes and, when s is close to 1, for a suitable value of the parameter λ such solutions change sign exactly once. Moreover, for any s ∈ (0,1) and λ sufficiently small we prove that the number of connected components of the complement of the nodal set corresponds to the number of sign-changes plus one. In addition, for any s ∈ (12,1), we prove that least energy nodal solutions which change sign exactly once have the limit profile of a "tower of bubbles", as λ 0+, i.e. the positive and negative parts concentrate at the same point (which is the center of the ball) with different concentration speeds.