Multisoliton solutions and blow up for the L²-critical Hartree equation
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We construct multisoliton solutions for the $L^2$-critical Hartree equation with trajectories asymptotically obeying a many-body law for an inverse square potential. Precisely, we consider the $m$-body hyperbolic and parabolic non-trapped dynamics. The pseudo-conformal symmetry then implies finite-time collision blow up in the latter case and a solution blowing up at $m$ distinct points in the former case. The approach we take is based on the ideas of [Krieger-Martel-Rapha\"el, 2009] and the third author's recent extension [Wu, 2026]. The approximation scheme requires new aspects in order to deal with a certain degeneracy for generalized root space elements.
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Cited by 2 Pith papers
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On soliton clusters and collision blow up for the $L^2$-critical Hartree equation
Constructs soliton clusters for the L²-critical Hartree equation that follow m-body dynamics and produce finite-time collision blow-up at prescribed points.
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Expansive solutions with prescribed asymptotics of the classical $N$-body problem
Constructs hyperbolic, parabolic, and hyperbolic-parabolic expansive solutions with prescribed asymptotic data at +∞ for the N-body problem with 1/|x|^p potentials, p>0.
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