The paper introduces the concept of continuous-time diffusion processes, which evolve continuously over time rather than in discrete steps. Unlike discrete-time Markov processes, the continuous-time setting poses new challenges in defining and characterizing behavioral equivalences and metrics.
The authors first define Feller-Dynkin processes, which satisfy certain regularity conditions, and then focus on a subclass called diffusions that have continuous trajectories and additional properties.
The main contributions are:
Defining two functionals on the space of 1-bounded pseudometrics, where each functional aims to quantify the behavioral differences between diffusion processes. One functional is based on the Markov kernels describing the process dynamics, while the other is based on the probability distributions over trajectories.
Showing that the fixpoints of these functionals yield two distinct pseudometrics that capture different notions of behavioral equivalence, and characterizing them using real-valued modal logics.
Establishing the mathematical machinery, including results from optimal transport theory, needed to handle the continuous-time setting and prove the key properties of the pseudometrics.
The authors restrict their study to diffusions satisfying certain regularity conditions, which allows them to leverage tools from optimal transport theory. This limits the generality compared to previous work, but enables a rigorous development of the pseudometric framework for continuous-time processes.
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by Linan Chen,F... alle arxiv.org 05-01-2024
https://arxiv.org/pdf/2312.16729.pdfDomande più approfondite