Multisoliton solutions for equivariant wave maps on a 2+1 dimensional wormhole
Abstract
We study equivariant wave maps from the 2+1 dimensional wormhole to the 2-sphere. This model has explicit harmonic map solutions which, in suitable coordinates, have the form of the sine-Gordon kinks/anti-kinks. We conjecture that there exist asymptotically static chains of N≥ 2 alternating kinks and anti-kinks whose subsequent rates of expansion increase in geometric progression as t→ ∞. Our argument employs the method of collective coordinates to derive effective finite-dimensional ODE models for the asymptotic dynamics of N-chains. For N=2,3 the predictions of these effective models are verified by direct PDE computations which demonstrate that the N-chains lie at the threshold of kink-anti-kink annihilation.
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