Paper detail

New Reductions and Nonlinear Systems for 2D Schrodinger Operators

New Completely Integrable (2+1)-System is studied. It is based on the so-called L-A-B-triples $L_t=[H,L]-fL$ where L is a 2D Schrodinger Operator. This approach was invented by S.Manakov and B.Dubrovin, I.Krichever, S.Novikov(DKN) in the works published in 1976. A nonstandard reduction for the 2D Schrodinger Operator (completely different from the one found by S.Novikov and A.Veselov in 1984) compatible with time dynamics of the new Nonlinear System, is studied here. It can be naturally treated as a 2D extension of the famous Burgers System. The Algebro-Geometric (AG) Periodic Solutions here are very specific and unusual (for general and reduced cases). The reduced system is linearizable like Burgers. However, the general one (and probably the reduced one also) certainly lead in the stationary AG case to the nonstandard examples of algebraic curves $Γ\subset W$ in the full complex 2D manifold of Bloch-Floquet functions W for the periodic elliptic 2D operator H where $Hψ(x,y,P)=λ(P)ψ(x,y,P),P\in Γ$. However, in the nontrivial case the operators are nonselfadjoint. A Conjecture is formulated that for the nontrivial selfadjoint elliptic 2D Schrodinger operators H with periodic coefficients The Whole 2D Complex Manifolds W cannot not contain any Zariski open part of algebraic curve $Γ$ except maybe one selected level $Hψ=const$ found in 1976 by DKN. Version 2 contains new results. It also corrects some non-accurate claims; in particular, the non-reduced system is non-linearizable in any trivial sense. In version 3 a misprint in the formulation of Theorem 1 was corrected.