@article{oai:nagoya.repo.nii.ac.jp:00005464,
 author = {Hamanaka, Masashi},
 issue = {5},
 journal = {Journal of Mathematical Physics},
 month = {May},
 note = {We discuss commuting flows and conservation laws for Lax hierarchies on noncommutative spaces in the framework of the Sato theory. On commutative spaces, the Sato theory has revealed essential aspects of the integrability for wide class of soliton equations which are derived from the Lax hierarchies in terms of pseudodifferential operators. Noncommutative extension of the Sato theory has been already studied by the author and Toda, and the existence of various noncommutative Lax hierarchies are guaranteed. In this paper, we present conservation laws for the noncommutative Lax hierarchies with both space–space and space–time noncommutativities and prove the existence of infinite number of conserved densities. We also give the explicit representations of them in terms of Lax operators. Our results include noncommutative versions of KP, KdV, Boussinesq, coupled KdV, Sawada- Kotera, modified KdV equation and so on.},
 pages = {052701--052701},
 title = {Commuting flows and conservation laws for noncommutative Lax hierarchies},
 volume = {46},
 year = {2005}
}