The determinant representation of the gauge transformation for the discrete KP hierarchy
Abstract
A successive gauge transformation operator Tn+k for the discrete KP(dKP) hierarchy is defined, which is involved with two types of gauge transformations operators. The determinant representation of the Tn+k is established,and then it is used to get a new tau function τ(n+k) of the dKP hierarchy from an initial τ. In this process, we introduce a generalized discrete Wronskian determinant and some useful properties of discrete difference operator.
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