We provide a framework to derive a variational formulation for $-\log\mathbb{E}_\nu\left[e^{-f}\right]$ for a large class of measures $\nu$. We use a family of perturbations of the identity $(W^u)$ whose invertibility we characterize thanks to entropy. This yields results of strong existence for various stochastic differential equations. We also discuss the attainability of the infimum in the variational formulation and we derive a Pr\'ekopa-Leindler theorem for the measure $\nu$.
Extinction probabilities in branching processes with countably many types: a general framework
An extension of the Yamada-Watanabe condition for pathwise uniqueness to stochastic differential equations with jumps
Dynkin games in a general framework
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