Integrable discrete nets in Grassmannians
Abstract
We consider discrete nets in Grassmannians Gdr which generalize Q-nets (maps ZNd with planar elementary quadrilaterals) and Darboux nets (Pd-valued maps defined on the edges of ZN such that quadruples of points corresponding to elementary squares are all collinear). We give a geometric proof of integrability (multidimensional consistency) of these novel nets, and show that they are analytically described by the noncommutative discrete Darboux system.
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