Adelic and Rational Grassmannians for finite dimensional algebras

Abstract

We develop a theory of Wilson's adelic Grassmannian Grad(R) and Segal-Wilson's rational Grasssmannian Gr rat(R) associated to an arbitrary finite dimensional complex algebra R. We provide several equivalent descriptions of the former in terms of the indecomposable projective modules of R and its primitive idempotents, and prove that it classifies the bispectral Darboux transformations of the R-valued exponential function. The rational Grasssmannian Grrat(R) is defined by using certain free submodules of R(z) and it is proved that it can be alternatively defined via Wilson type conditions imposed in a representation theoretic settings. A canonical embedding Grad(R) Grrat(R) is constructed based on a perfect pairing between the R-bimodule of quasiexponentials with values in R and the R-bimodule R[z].