The Iso-spectral problem

4. The Iso-spectral problem

An algebraic construction for the KP Hierarchy can be given analogous to the “exp” map for Drinf’eld modules. The infinite Grassmannian is described as follows:

- n G = {V ⊂ C ((T)) | dim (V ∩ T C[[T ]]) = n,∀n ≫ 0 }

Let X be any variety and p a smooth point on it. This gives us a base point n ⋅ p in Symⁿ(X), the n-fold symmetric product of X with itself. We then have natural base point preserving maps Symⁿ(X) → Sym^n+k(X) obtained by adding the zero-cycle k ⋅ p. The direct limit

G = lim Symn (X) →

has a natural multiplication induced by the morphisms

Symn (X ) × Symm (X ) → Symn+m (X ).

If X is 1-dimensional this group G acts on and the flow associated with this action is then the KP flow.

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