Planar networks and simple Lie groups beyond type A

The general linear group $G{L}_n$, along with its adjoint simple group $PG{L}_n$, can be described by means of weighted planar networks. In this paper, we give a network description for simple Lie groups of types B and C. The corresponding networks are axially symmetric modulo a sequence of cluster mutations along the axis of symmetry. We extend to this setting the result of Gekhtman, Shapiro, and Vainshtein on the Poisson property of Postnikov's boundary measurement map. We also show that B and C type networks with positive weights parametrize the totally nonnegative part of the respective group. Finally, we construct network parametrizations of double Bruhat cells in symplectic and odd-dimensional orthogonal groups, and identify the corresponding face weights with Fock-Goncharov cluster coordinates.