Electrical Networks, Lagrangian Grassmannians and Symplectic Groups

Abstract

We refine the result of T. Lam L on embedding the space En of electrical networks on a planar graph with n boundary points into the totally non-negative Grassmannian Gr≥ 0(n-1,2n) by proving first that the image lands in Gr(n-1,V)⊂ Gr(n-1,2n) where V⊂ R2n is a certain subspace of dimension 2n-2. The role of this reduction in the dimension of the ambient space is crucial for us. We show next that the image lands in fact inside the Lagrangian Grassmannian LG(n-1,V)⊂ Gr(n-1,V). As it is well known LG(n-1) can be identified with Gr(n-1,2n-2) P L where L⊂ n-1 R2n-2 is a subspace of dimension equal to the Catalan number Cn, moreover it is the space of the fundamental representation of the symplectic group Sp(2n-2) which corresponds to the last vertex of the Dynkin diagram. We show further that the linear relations cutting the image of En out of Gr(n-1,2n) found in L define that space L. This connects the combinatorial description of En discovered in L and representation theory of the symplectic group.