Geodesic
Ermakov–Painlevé II Symmetry Reduction of a Korteweg Capillarity System
Symmetry, integrability and geometry: methods and applications, Tome 13 (2017) Cet article a éte moissonné depuis la source Math-Net.Ru

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A class of nonlinear Schrödinger equations involving a triad of power law terms together with a de Broglie–Bohm potential is shown to admit symmetry reduction to a hybrid Ermakov–Painlevé II equation which is linked, in turn, to the integrable Painlevé XXXIV equation. A nonlinear Schrödinger encapsulation of a Korteweg-type capillary system is thereby used in the isolation of such a Ermakov–Painlevé II reduction valid for a multi-parameter class of free energy functions. Iterated application of a Bäcklund transformation then allows the construction of novel classes of exact solutions of the nonlinear capillarity system in terms of Yablonskii–Vorob'ev polynomials or classical Airy functions. A Painlevé XXXIV equation is derived for the density in the capillarity system and seen to correspond to the symmetry reduction of its Bernoulli integral of motion.
Keywords: Ermakov–Painlevé II equation; Painlevé capillarity; Korteweg-type capillary system; Bäcklund transformation. 
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     author = {Colin Rogers and Peter A. Clarkson},
     title = {Ermakov{\textendash}Painlev\'e~II {Symmetry} {Reduction} of a {Korteweg} {Capillarity} {System}},
     journal = {Symmetry, integrability and geometry: methods and applications},
     year = {2017},
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     language = {en},
     url = {http://geodesic.mathdoc.fr/item/SIGMA_2017_13_a17/}
}
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Colin Rogers; Peter A. Clarkson. Ermakov–Painlevé II Symmetry Reduction of a Korteweg Capillarity System. Symmetry, integrability and geometry: methods and applications, Tome 13 (2017). http://geodesic.mathdoc.fr/item/SIGMA_2017_13_a17/

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