Spectral Picard-Vessiot fields for Algebro-geometric Schr\"odinger operators

Abstract

This work is a galoisian study of the spectral problem L=λ, for algebro-geometric second order differential operators L, with coefficients in a differential field, whose field of constants C is algebraically closed and of characteristic zero. Our approach regards the spectral parameter λ an algebraic variable over C, forcing the consideration of a new field of coefficients for L-λ, whose field of constants is the field C() of the spectral curve . Since C() is no longer algebraically closed, the need arises of a new algebraic structure, generated by the solutions of the spectral problem over , called "Spectral Picard-Vessiot field" of L-λ. An existence theorem is proved using differential algebra, allowing to recover classical Picard-Vessiot theory for each λ = λ0 . For rational spectral curves, the appropriate algebraic setting is established to solve L=λ analitically and to use symbolic integration. We illustrate our results for Rosen-Morse solitons.