Constructs uncountably many pairwise conformally inequivalent non-rotationally symmetric type II ancient Yamabe flows on S^n (n≥3) via non-radial inner-outer gluing after stereographic projection.
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3 Pith papers cite this work. Polarity classification is still indexing.
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math.AP 3years
2026 3verdicts
UNVERDICTED 3representative citing papers
For the 2D Keller-Segel equation at critical mass 8π with finite second momentum, all solutions converge asymptotically to a renormalized stationary state concentrating at the center of mass on a logarithmic-in-time scale, without symmetry assumptions.
Under the assumption of asymptotic multi-bubble decomposition with comparable scales, scaling parameters of 5D energy-critical wave solutions are of order t^{-2} and the modulation vector converges to a component of an algebraic set determined by the limiting bubble configuration.
citing papers explorer
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Uncountably many non-rotationally symmetric type II ancient Yamabe flows on the sphere
Constructs uncountably many pairwise conformally inequivalent non-rotationally symmetric type II ancient Yamabe flows on S^n (n≥3) via non-radial inner-outer gluing after stereographic projection.
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Determination of the long-time dynamics for the 2D Keller-Segel equation at critical mass
For the 2D Keller-Segel equation at critical mass 8π with finite second momentum, all solutions converge asymptotically to a renormalized stationary state concentrating at the center of mass on a logarithmic-in-time scale, without symmetry assumptions.
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Rigidity of the multi-bubble solutions to the energy critical wave equation in dimension five
Under the assumption of asymptotic multi-bubble decomposition with comparable scales, scaling parameters of 5D energy-critical wave solutions are of order t^{-2} and the modulation vector converges to a component of an algebraic set determined by the limiting bubble configuration.