The Otto calculus (also known as Otto's calculus) is a mathematical system for studying diffusion equations that views the space of probability measures as an infinite dimensional Riemannian manifold by interpreting the Wasserstein distance as if it was a Riemannian metric.
[1][2] It is named after Felix Otto,[1] who developed it in the late 1990s and published it in a 2001 paper on the geometry of dissipative evolution equations.
[3][4] Otto acknowledges inspiration from earlier work by David Kinderlehrer and conversations with Robert McCann and Cédric Villani.
This differential geometry-related article is a stub.
You can help Wikipedia by expanding it.