On Gibbs measures and topological solitons of exterior equivariant wave maps

Abstract

We consider k-equivariant wave maps from the exterior spatial domain R3 B(0,1) into the target S3. This model has infinitely many topological solitons Qn,k, which are indexed by their topological degree n∈ Z. For each n∈ Z and k≥ 1, we prove the existence and invariance of a Gibbs measure supported on the homotopy class of Qn,k. As a corollary, we obtain that soliton resolution fails for random initial data. Since soliton resolution is known for initial data in the energy space, this reveals a sharp contrast between deterministic and probabilistic perspectives.