Forward, backward, and symmetric solutions of discrete ARMA representations

in the forward equation (see also [13] for the existence of solution to one-dimensional FBSDEs with bounded Lipschitz coe cients and non-degenerate di usion in the forward equation). In [14], Hu and Peng introduced the monotonicity condition, under which the FBSDEs can be solved, and their main idea

In this paper the symmetric-iterative method of coupled FE and BE discretizations is adopted to investigate elastoplastic problems. In order to improve computational eciency, all degrees of freedom related to the BE region, except those degrees of freedom associated with interface, are condenced. Th

## Abstract In this paper we consider a generalization of the classical time‐harmonic Maxwell equations, which as an additional feature includes a radial symmetric perturbation in the form of the Euler operator $E:={\textstyle\sum\nolimits\_{i}}\,x\_i {\partial }/{\partial x\_i}$. We show how one

## SUMMARY In this paper, we consider the problem of existence of certain global solutions for general discrete‐time backward nonlinear equations, defined on infinite dimensional ordered Banach spaces. This class of nonlinear equations includes as special cases many of the discrete‐time Riccati equ