English

Non-Markovian Impulse Control Under Nonlinear Expectation

Optimization and Control 2022-06-30 v1

Abstract

We consider a general type of non-Markovian impulse control problems under adverse non-linear expectation or, more specifically, the zero-sum game problem where the adversary player decides the probability measure. We show that the upper and lower value functions satisfy a dynamic programming principle (DPP). We first prove the dynamic programming principle (DPP) for a truncated version of the upper value function in a straightforward manner. Relying on a uniform convergence argument then enables us to show the DPP for the general setting. Following this, we use an approximation based on a combination of truncation and discretization to show that the upper and lower value functions coincide, thus establishing that the game has a value and that the DPP holds for the lower value function as well. Finally, we show that the DPP admits a unique solution and give conditions under which a saddle-point for the game exists. As an example, we consider a stochastic differential game (SDG) of impulse versus classical control of path-dependent stochastic differential equations (SDEs).

Keywords

Cite

@article{arxiv.2206.14785,
  title  = {Non-Markovian Impulse Control Under Nonlinear Expectation},
  author = {Magnus Perninge},
  journal= {arXiv preprint arXiv:2206.14785},
  year   = {2022}
}
R2 v1 2026-06-24T12:08:39.482Z