Soliton resolution for equivariant wave maps on a wormhole: I

Abstract

In this paper, we initiate the study of finite energy equivariant wave maps from the (1+3)-dimensional spacetime R × ( R × S2) → S3 where the metric on R × ( R × S2) is given by ds2 = -dt2 + dr2 + (r2 + 1) ( d θ2 + 2 θ d 2 ), t,r ∈ R, (θ,) ∈ S2. The constant time slices are each given by the Riemannian manifold M := R × S2 with metric ds2 = dr2 + (r2 + 1) ( d θ2 + 2 θ d 2 ). The Riemannian manifold M contains two asymptotically Euclidean ends at r → ∞ that are connected by a spherical throat of area 4 π2 at r = 0. The spacetime R × M is a simple example of a wormhole geometry in general relativity. In this work we will consider 1--equivariant or corotational wave maps. Each corotational wave map can be indexed by its topological degree n. For each n, there exists a unique energy minimizing corotational harmonic map Qn : M → S3 of degree n. In this work, we show that modulo a free radiation term, every corotational wave map of degree n converges strongly to Qn. This resolves a conjecture made by Bizon and Kahl in the corotational case.