双泡等变波图的连续时间孤子分辨率

Pub Date : 2020-10-23 DOI:10.4310/mrl.2022.v29.n6.a5
Jacek Jendrej, A. Lawrie
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引用次数: 4

摘要

在等变情况下,我们考虑从1+2维闵可夫斯基空间到2球的能量临界波映射方程。我们证明,如果一个波图沿着时间序列分解成至多两个重标度谐波图(气泡)和辐射的叠加,那么这种分解在连续时间内成立。如果等变度等于1或2,根据Cote、Jia和Kenig的连续孤子解析结果,我们推断,任何能量小于气泡能量四倍的拓扑平凡等变波图都渐近分解为(最多两个)气泡和辐射。
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Continuous time soliton resolution for two-bubble equivariant wave maps
We consider the energy-critical wave maps equation from 1+2 dimensional Minkowski space into the 2-sphere, in the equivariant case. We prove that if a wave map decomposes, along a sequence of times, into a superposition of at most two rescaled harmonic maps (bubbles) and radiation, then such a decomposition holds for continuous time. If the equivariance degree equals one or two, we deduce, as a consequence of sequential soliton resolution results of Cote, and Jia and Kenig, that any topologically trivial equivariant wave map with energy less than four times the energy of the bubble asymptotically decomposes into (at most two) bubbles and radiation.
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