From Ramond Fermions to Lame Equations for Orthogonal Curvilinear Coordinates
classification
solv-int
hep-thmath-phmath.DGmath.MPnlin.SI
keywords
coordinatescurvilinearramondclassicaldeformationsdescribesequationsfermi
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We show how Ramond free neutral Fermi fields lead to a $\tau$-function theory of BKP type which describes iso-orthogonal deformations of systems of ortogonal curvilinear coordinates. We also provide a vertex operator representation for the classical Ribaucour transformation.
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