Nonexistence of blow-up solutions with smooth radiation for energy-critical equivariant wave maps
Abstract
We study k-equivariant energy critical wave maps R1+2 S2, for any equivariance degree k 2. We prove that the radiation associated with any finite-energy blow-up solution cannot satisfy a certain regularity condition; in particular, it cannot be smooth. The assumption k ≥ 2 is necessary, since for k = 1 such solutions are known to exist. The starting point of our analysis is the soliton resolution theorem. The key ingredient is a novel application of the modulation method, in which we compare the effects of the radiation and inner bubbles to study the dynamic behavior of the widest bubble.
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