The continuity equation: Difference between revisions
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First, because of the intuition, we will introduce definition of the continuity equation in fluid mechanics. The exposition in this section will follow the book by Chorin and Marsden<ref name="Marsden" />. | First, because of the intuition, we will introduce definition of the continuity equation in fluid mechanics. The exposition in this section will follow the book by Chorin and Marsden<ref name="Marsden" />. | ||
== Continuity equation in optimal transport == | |||
Sometimes in the literature, authors use continuity equation, and transport equation as synonyms. On the other hand, in the optimal transport we differentiate these two and the standard Cauchy problem. Here, we will present definitions and reasoning from the book by L.Ambrosio, E.Brué, and D.Semola<ref name="Ambrosio" />. | |||
: '''Definition.''' A length of the curve <math> \omega:[0,1] \rightarrow X</math> is defined by | : '''Definition.''' A length of the curve <math> \omega:[0,1] \rightarrow X</math> is defined by | ||
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<math> d(\omega(s),\omega(t))=|t-s|d(\omega(0),\omega(1)) </math> for all <math> t,s \in [0,1]</math> | <math> d(\omega(s),\omega(t))=|t-s|d(\omega(0),\omega(1)) </math> for all <math> t,s \in [0,1]</math> | ||
Revision as of 04:34, 12 February 2022
Introduction
The continuity equation is an important equation in many science fields, for example, electromagnetism, computer vision, fluid dynamics etc. However, in the field of optimal transport, the formulation from fluid dynamics is of a large significance. This form helps to explain dynamics formulation of special cases of Wasserstein metric, and we will focus in this direction. For more general information about the continuity equation, look at the article Continuity equation.
Continuity equation in fluid dynamics
First, because of the intuition, we will introduce definition of the continuity equation in fluid mechanics. The exposition in this section will follow the book by Chorin and Marsden[1].
Continuity equation in optimal transport
Sometimes in the literature, authors use continuity equation, and transport equation as synonyms. On the other hand, in the optimal transport we differentiate these two and the standard Cauchy problem. Here, we will present definitions and reasoning from the book by L.Ambrosio, E.Brué, and D.Semola[2].
- Definition. A length of the curve is defined by
Secondly, we use the definition of length of a curve to introduce a geodesic curve.
- Definition. A curve is said to be geodesic between and in if it minimizes the length among all the curves
such that and .
Since we have a definition of a geodesic in the general metric space, it is natural to think of Riemannian structure. It can be formally defined. More about this topic can be seen in the following article Formal Riemannian Structure of the Wasserstein_metric.
Now, we proceed with necessary definitions in order to be able to understand Wasserstein metric in a different way.
- Definition. A metric space is called a length space if it holds
A space is called geodesic space if the distance is attained for some curve .
- Definition. In a length space, a curve is said to be constant speed geodesic between and in if it satisfies
for all
Applications
Benamou-Bernier
Whenever is convex set, is a geodesic space. Proof can be found in the book by Santambrogio[3].
- Theorem.[3] Let . Then
References
- ↑ A.J.Chorin, J.E.Marsden, A Mathematical Introduction to Fluid Mechanics, Chapter 1, pages 1-11
- ↑ [https://link.springer.com/book/10.1007/978-3-030-72162-6 L.Ambrosio, E.Brué, D.Semola, Lectures on Optimal Transport, Lecture 16.1., pages 183-189]
- ↑ 3.0 3.1 F. Santambrogio, Optimal Transport for Applied Mathematicians, Chapter 4, pages 123-126