Attaining the optimal constant for higher-order Sobolev inequalities on manifolds via asymptotic analysis

Abstract

Let (M,g) be a closed Riemannian manifold of dimension n, and k≥ 1 an integer such that n>2k. We show that there exists B0>0 such that for all u ∈ Hk(M), \[\|u\|L2(M)2 ≤ K02 ∫M |gk/2 u|2 \,dvg + B0 \|u\|Hk-1(M)2,\] where 2 = 2nn-2k and g = -divg(∇·). Here K0 is the optimal constant for the Euclidean Sobolev inequality (∫Rn |u|2)2/2 ≤ K02 ∫Rn |∇k u|2 for all u ∈ Cc∞(Rn). This result is proved as a consequence of the pointwise blow-up analysis for a sequence of positive solutions (uα)α to polyharmonic critical non-linear equations of the form (g + α)k u = u2-1 in M. We obtain a pointwise description of uα, with explicit dependence in α as α ∞.