Sharp multiscale control for high order nonlinear equations
Abstract
We analyze the behavior of families (uα)α>0 of solutions to the high-order critical equation Pα uα=gk uα +lot=|uα|2-2uα on a Riemannian manifold M, with a uniform bound on the Dirichlet energy. We prove a sharp pointwise control of the uα's by a sum of bubbles uniformly with respect to α +∞, that is |uα|≤ C u∞ ∞ +CΣi=1NBi,α where u∞ ∈ C2k(M) and the (Bi,α)α, i=1,...,N are explicit standard peaks.
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