An exceptional property of the one-dimensional Bianchi-Egnell inequality

Abstract

In this paper, for d ≥ 1 and s ∈ (0,d2), we study the Bianchi-Egnell quotient \[ Q(f) = ∈ff ∈ Hs( Rd) B \|(-)s/2 f\|L2( Rd)2 - Sd,s \|f\|L2dd-2s( Rd)2distHs( Rd)(f, B)2, f ∈ Hs( Rd) B, \] where Sd,s is the best Sobolev constant and B is the manifold of Sobolev optimizers. By a fine asymptotic analysis, we prove that when d = 1, there is a neighborhood of B on which the quotient Q(f) is larger than the lowest value attainable by sequences converging to B. This behavior is surprising because it is contrary to the situation in dimension d ≥ 2 described recently in Koenig. This leads us to conjecture that for d = 1, Q(f) has no minimizer on Hs( Rd) B, which again would be contrary to the situation in d ≥ 2. As a complement of the above, we study a family of test functions which interpolates between one and two Talenti bubbles, for every d ≥ 1. For d ≥ 2, this family yields an alternative proof of the main result of Koenig. For d =1 we make some numerical observations which support the conjecture stated above.