Mathematics – Differential Geometry
Scientific paper
2006-07-27
Siberian Electronic Mathematical Reports. 2004. V. 1. P. 38-46
Mathematics
Differential Geometry
12 pages
Scientific paper
We associate a periodic two-dimensional Schrodinger operator to every Lagrangian torus in CP^2 and define the spectral curve of a torus as the Floquet spectrum of this operator on the zero energy level. In this event minimal Lagrangian tori correspond to potential operators. We show that Novikov-Veselov hierarchy of equations induces integrable deformations of minimal Lagrangian torus in CP^2 preserving the spectral curve. We also show that the highest flows on the space of smooth periodic solutions of the Tzizeica equation are given by the Novikov-Veselov hierarchy.
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