In recent years probabilistic model checking has become an important area of research because of the diffusion of computational systems of stochastic nature. Despite its great success, standard probabilistic model checking suffers the limitation of requiring a sharp specification of the probabilities governing the model behaviour. The theory of imprecise probabilities offers a natural approach to overcome such limitation by a sensitivity analysis with respect to the values of these parameters. However, only extensions based on discrete-time imprecise Markov chains have been considered so far for such a robust approach to model checking. We present a further extension based on imprecise Markov reward models. In particular, we derive efficient algorithms to compute lower and upper bounds of the expected cumulative reward and probabilistic bounded rewards based on existing results for imprecise Markov chains. These ideas are tested on a real case study involving the spend-down costs of geriatric medicine departments.
翻译:近年来,由于传播了具有随机性质的计算系统,概率模型检查已成为一个重要的研究领域。标准概率模型检查尽管取得了巨大成功,但要求精确地说明规范模型行为的概率是有限制的。不精确概率理论通过对这些参数的价值进行敏感性分析,为克服这种局限性提供了自然的方法。然而,迄今为止,只有以不连续时间不精确的马尔科夫链为基础的扩展才被认为是这样一个强有力的模型检查方法。我们根据不精确的马尔可夫奖赏模式提出进一步的扩展。特别是,我们根据不精确的马尔可夫链的现有结果,获得低、高水平的预期累积奖赏和概率约束奖赏的有效算法。这些想法是在涉及老年医学部门支出成本的实际案例研究中测试的。
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