On the dispersionless Davey-Stewartson hierarchy: Zakharov-Shabat
equations, twistor structure and Lax-Sato formalism
In this paper, we continue the study of the Davey-Stewartson system
which is one of the most important ( 2 + 1 ) dimensional integrable
models. As we showed in the previous paper, the dDS (dispersionless
Davey-Stewartson) system arises from Hamiltonian vector fields Lax pair.
A new hierarchy of compatible PDEs defining infinitely many symmetries,
which is associated with the dDS system, is defined in this paper. We
show that this hierarchy arises from the commutation condition of a
particular series of one-parameter Hamiltonian vector fields.