The following construction provides an example of an infinite network (featured on the cover of the book), which Dirichlet-to-Neumann operator satisfies the equation in the title of this chapter.
The matrix equation reflects the self-duality and self-symmetry of the network.
Exercise (**). Prove that the Dirichlet-to-Neumann operator of the network on the picture w/the natural boundary satisfies the equation.
The self-dual self-symmetric infinite graph w/its dual
(Hint:) Use the fact that the operator/matrix is the fixed point of the Schur complement]]:
where
is the circulant matrix, such that