In this paper, we extend CSL (continuous stochastic logic) with an expected time and an expected reward operator, both of which are parameterized by a random terminal time. With the help of such operators we can state, for example, that the expected sojourn time in a set of goal states within some generally distributed delay is at most (at least) some time threshold. In addition, certain performance measures of systems which contain general distributions can be calculated with the aid of this extended logic. We extend the efficient model checking of CTMCs against the logic CSL developed by Katoen et al. [1] to cater for the new operator. Our method involves precomputing a family of mixed Poisson expected sojourn time coefficients for a range of random variables which includes Pareto, uniform and gamma distributions, but otherwise carries the same computational cost as calculating CSL until formulae.

CEMAT - Center for Computational and Stochastic Mathematics