To assess the quality of a probabilistic prediction for stochastic dynamical systems (SDSs), scoring rules assign a numerical score based on the predictive distribution and the measured state. In this paper, we propose an $\epsilon$-logarithm score that generalizes the celebrated logarithm score by considering a neighborhood with radius $\epsilon$. To begin with, we prove that the $\epsilon$-logarithm score is proper (the expected score is optimized when the predictive distribution meets the ground truth) based on discrete approximations. Then, we characterize the probabilistic predictability of an SDS by the optimal expected score and approximate it with an error of scale $\mathcal{O}(\epsilon)$. The approximation quantitatively shows how the system predictability is jointly determined by the neighborhood radius, the differential entropies of process noises, and the system dimension. In addition to the expected score, we also analyze the asymptotic behaviors of the score on individual trajectories. Specifically, we prove that the score on a trajectory will converge to the probabilistic predictability when the process noises are independent and identically distributed. Moreover, the convergence speed against the trajectory length $T$ is of scale $\mathcal{O}(T^{-\frac{1}{2}})$ in the sense of probability. Finally, we apply the predictability analysis to design unpredictable SDSs. Numerical examples are given to elaborate the results.
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