An Analytic Description of the Vector Constrained KP Hierarchy

We use the representation theory of the infinite matrix group to show that (in the polynomial case) the n-vector k-constrained KP hierarchy has a natural geometrical interpretation on Sato's infinite Grassmannian. This description generalizes the k-reduced KP or Gelfand-Dickey hierarchies.

In this Letter, we study the constrained KP hierarchies by employing Segal-Wilson's theory on the r-functions of the KP hierarchy. We first describe the elements of the Grassmannian which correspond to solutions of the constrained KP hierarchy, and then we show how to construct its rational and soli

We extend the conventional Analytic Hierarchy Process (AHP) to an Euclidean vector space and develop formulations for aggregation of the alternative preferences with the criteria preferences. Relative priorities obtained from such a formulation are almost identical with the ones obtained using conve