Definition and certain convergence properties of a two-scale method for Monge-Ampère type equations
The Monge-Ampère equation arises in the theory of optimal transport. When more complicated cost functions are involved in the optimal transportation problem, which are motivated e.g. from economics, the corresponding equation for the optimal transportation map becomes a Monge-Ampère type equation. Such Monge-Ampère type equations are a topic of current research from the viewpoint of mathematical analysis. From the numerical point of view there is a lot of current research for the Monge-Ampère equation itself and rarely for the more general Monge-Ampère type equation. Introducing the notion of discrete Q-convexity as well as specifically designed barrier functions this purely theoretical paper extends the very recently studied two-scale method approximation of the Monge-Ampère itself <cit.> to the more general Monge-Ampère type equation as it arises e.g. in <cit.> in the context of Sobolev regularity.
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