A general Doob-Meyer-Mertens decomposition for $g$-supermartingale systems
We provide a general Doob-Meyer decomposition for $g$-supermartingale systems, which does not require any right-continuity on the system. In particular, it generalizes the Doob-Meyer decomposition of Mertens (1972) for classical supermartingales, as well as Peng's (1999) version for right-continuous $g$-supermartingales. As examples of application, we prove an optional decomposition theorem for $g$-supermartingale systems, and also obtain a general version of the well-known dual formation for BSDEs with constraint on the gains-process, using very simple arguments.
Year of publication: |
2015-05
|
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Authors: | Bouchard, Bruno ; Dylan Possama\"i ; Tan, Xiaolu |
Institutions: | arXiv.org |
Saved in:
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