A decomposition of Toeplitz matrices and optimal circulant preconditioning

In this paper we show that feedback matrices of ring CNNs are block circulants; as special cases, for example, feedback matrices of one-dimensional ring CNNs are circulant matrices. Circulants and their close relations the block circulants possess many pleasant properties which allow one to describe

The authors study symmetric operator matrices A B = ( B ' C ) in the product of Hilbert spaces H = Hi xH2, where the entries are not necessarily bounded operators. Under suitable assumptions the closure Lo exists and is a selfadjoint operator in H. With Lo, the closure of the transfer function M(X)

AbsOIcL Wc consider the se; of n x n ma,'rtces X = (x~i) fog which ~i~iEi~.,xii ~ ill ~-;3;-n, ft~r all t,J c: {I, 2 ..... n~. with x/j ;) 0 fo¢ all J, IE~i, 2, .... q}. it is sl~,;)wn that such ma-~:rk¢~ may bt (Ik ~:ompoted as X --$+ N. whe~.e S is a &~bly stochastic matrix 'and N is now ne~ttive