Abstract
We consider the class of semi-Markov modulated jump diffusions (sMMJDs) whose operator turns out to be an integro-partial differential operator. We find conditions under which the solutions of this class of switching jump-diffusion processes are almost surely exponentially stable and moment exponentially stable. We also provide conditions that imply almost sure convergence of the trivial solution when the moment exponential stability of the trivial solution is guaranteed. We further investigate and determine the conditions under which the trivial solution of the sMMJD-perturbed nonlinear system of differential equations is almost surely exponentially stable. It is observed that for a one-dimensional state space, a linear unstable system of differential equations when stabilized just by the addition of the jump part of an sMMJD process does not get destabilized by any addition of a Brownian motion. However, in a state space of dimension at least two, we show that a corresponding nonlinear system of differential equations stabilized by jumps gets destabilized by addition of Brownian motion.
Highlights
The stability of stochastic differential equations SDEs has a long history with some key works being those of Arnold 1, Khasminskii 2, and Ladde and Lakshmikantham 3
We investigate the perturbation of the nonlinear differential equation dXt/dt f Xt by an sMMJD
We show that for a one-dimensional state space, the deterministic linear unstable system of differential equations that can be stabilized by the addition of a jump component of the process Xt, surprisingly can never be destabilized by an addition of a Brownian motion
Summary
The stability of stochastic differential equations SDEs has a long history with some key works being those of Arnold 1 , Khasminskii 2 , and Ladde and Lakshmikantham 3. We show that for a one-dimensional state space, the deterministic linear unstable system of differential equations that can be stabilized by the addition of a jump component of the process Xt, surprisingly can never be destabilized by an addition of a Brownian motion. We show that for a state space with dimension greater than or equal to 2, a corresponding nonlinear system that is stabilized by the jump component of the process Xt can be destabilized by addition of the Brownian motion part. Under additional conditions one can say when does the moment exponential stability guarantees or implies almost sure exponential stability We elaborate on this aspect while concluding this section.
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