Finding an NARE whose minimal nonnegative solution represents first-passage increments in two-dimensional Markov modulated Brownian motion

This article aims to derive the Laplace-Stieltjes transform matrix for the total increment of a one-level process during the first passage of another level process to level zero in so-called the two-dimensional Markov modulated Brownian motion. The process comprises an irreducible continuous-time Markov process with a finite state space, alongside two level processes modulated by the Markov process. These paired level processes can be viewed as a two-dimensional Brownian motion, with Brownian parameters varying based on the Markov process. Due to the infeasibility of explicit computation, we formulate a nonsymmetric algebraic Riccati equation with a minimal nonnegative solution that represents the transform matrix through a matrix exponential function. To our knowledge, this achievement is innovative within the context of the two- dimensional Markov modulated Brownian motion.