Abstract
In this Letter, by considering two new ( 2 + 1 ) -dimensional discrete linear spectral problems, new ( 2 + 1 ) -dimensional integrable lattice hierarchies are constructed. It is shown that the two new ( 2 + 1 ) -dimensional integrable lattice hierarchies are extensions (to nonisospectral and ( 2 + 1 ) -dimensional cases) of a ( 1 + 1 ) -dimensional 3-field lattice hierarchy of Zhang et al. and a ( 1 + 1 ) -dimensional 2-field lattice hierarchy due to Merola, Ragnisco and Tu. We also obtain new ( 1 + 1 ) -dimensional nonisospectral lattice hierarchies which include a nonisospectral relativistic Toda lattice hierarchy.
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