论文信息 - Infinite‐dimensional symmetry algebras and an infinite number of conserved quantities of the (2+1)‐dimensional Davey–Stewartson equation

Infinite‐dimensional symmetry algebras and an infinite number of conserved quantities of the (2+1)‐dimensional Davey–Stewartson equation

An infinite‐dimensional symmetry algebra of the Davey–Stewartson equation is explicitly presented. It is shown that this algebra is a gauge generalization of the symmetry transformation for the Schrodinger equation, and that the Virasoro algebra appears as the subalgebra. An infinite number of conserved quantities associated with the transformations are also obtained.

M. Omote

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