Spectral curves for Cauchy-Riemann operators on punctured elliptic curves
Abstract
We show that one can define a spectral curve for the Cauchy-Riemann operator on a punctured elliptic curve if one imposes appropriate boundary conditions. Algebraic curves of the type thus obtained appear as irreducible components of spectral curves of minimal tori with planar ends in R3. It appears that these curves coincide with the spectral curves of certain elliptic KP solitons as studied by Krichever.
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