Introduction

There are many ways that we can describe Wasserstein metric. One of them is to characterize absolutely continuos curves (AC)(p.188^[1]) and provide a dynamic formulation of the special case ${\displaystyle W_{2}^{2}}$ Namely, it is possible to see ${\displaystyle W_{2}^{2}(\mu ,\nu )}$ as an infimum of the lengts of curves that satisfy Continuity equation
(${\displaystyle \partial _{t}\mu +\nabla (v\mu )=0}$).

Geodesics in general metric spaces

Definition. A curve ${\displaystyle c:[0,1]\rightarrow X}$ is said to be geodesic in ${\displaystyle X}$ if it minimizes the lenght

Definition. A metric space ${\displaystyle (X,d)}$ is called a length space if it holds

                    ${\displaystyle d(x,y)=\inf\{Length(\omega )|\omega \in AC(X),\omega (0)=x\quad \omega (1)=y\}.}$

Definition. In a length space, a curve ${\displaystyle l:[0,1]\rightarrow X}$ is said to be constant speed geodesic between ${\displaystyle \omega (0)}$ and ${\displaystyle \omega (1)}$ in ${\displaystyle X}$ if it satisfies

                    ${\displaystyle d(\omega (s),\omega (t))=|t-s|d(\omega (0),\omega (1))}$ for all ${\displaystyle t,s\in [0,1]}$

Statement of Theorem

Now, we can rephrase Wasserstein metrics in dynamic language. In special case:

Theorem.(Benamou-Brenier)^[1] Let ${\displaystyle \mu ,\nu \in P_{2}(R^{d})}$. Then we have

      ${\displaystyle W_{2}^{2}(\mu ,\nu )=\inf _{(\mu (t).\nu (t))}\{\int _{0}^{1}|v(,t)|_{L^{2}(\mu (t))}^{2}dt,\quad \partial _{t}\mu +\nabla (v\mu )=0,\mu (0)=\mu ,\mu (1)=\nu \}}$

Generalization

It is possible to generalize the previous theorem and theory to ${\displaystyle W_{p}}$ metrics. More about that could be seen in the book ^[2].

However, it is possible to generalize theorem for a different kind of geodesics ^[3].

References