±(N−1), then the rogue waveu N(x, t)asymptotically splits intoN(N+ 1)/2fundamental rogue wavesu 1(x−ˆx0, t− ˆt0), whose spatial-temporal locations(ˆx0, ˆt0)are given by Eq

Ifµ̸= 0,±1

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Rogue-wave and lump patterns associated with the third Painlev\'{e} equation

nlin.SI · 2026-04-25 · unverdicted · novelty 6.0

Rogue wave and lump patterns in several integrable equations are asymptotically predicted by the root distributions of Umemura polynomials associated with the third Painlevé equation.

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Rogue-wave and lump patterns associated with the third Painlev\'{e} equation nlin.SI · 2026-04-25 · unverdicted · none · ref 6
Rogue wave and lump patterns in several integrable equations are asymptotically predicted by the root distributions of Umemura polynomials associated with the third Painlevé equation.

±(N−1), then the rogue waveu N(x, t)asymptotically splits intoN(N+ 1)/2fundamental rogue wavesu 1(x−ˆx0, t− ˆt0), whose spatial-temporal locations(ˆx0, ˆt0)are given by Eq

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