Francesca Biagini, Georg Bollweg, Katharina Oberpriller
Published 2022-07-08Version 1
We present a probabilistic construction of $\mathbb{R}^d$-valued non-linear affine processes with jumps. Given a set $\Theta$ of affine parameters, we define a family of sublinear expectations on the Skorokhod space under which the canonical process $X$ is a (sublinear) Markov process with a non-linear generator. This yields a tractable model for Knightian uncertainty for which the sublinear expectation of a Markovian functional can be calculated via a partial integro-differential equation.
Sublinear expectations for countable-state uncertain processes
A Strong Law of Large Numbers under Sublinear Expectations
Stochastic heat equations driven by space-time $G$-white noise under sublinear expectation
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