$\newcommand{\R}{\mathbb R }$ $\newcommand{\N}{\mathbb N }$ $\newcommand{\Z}{\mathbb Z }$ $\newcommand{\bfa}{\mathbf a}$ $\newcommand{\bfb}{\mathbf b}$ $\newcommand{\bfc}{\mathbf c}$ $\newcommand{\bff}{\mathbf f}$ $\newcommand{\bfF}{\mathbf F}$ $\newcommand{\bfk}{\mathbf k}$ $\newcommand{\bfg}{\mathbf g}$ $\newcommand{\bfG}{\mathbf G}$ $\newcommand{\bfh}{\mathbf h}$ $\newcommand{\bfu}{\mathbf u}$ $\newcommand{\bfv}{\mathbf v}$ $\newcommand{\bfx}{\mathbf x}$ $\newcommand{\bfp}{\mathbf p}$ $\newcommand{\bfy}{\mathbf y}$ $\newcommand{\ep}{\varepsilon}$
This page supplements results in the paper Vanishing geodesic distance for right-invariant Sobolev metrics on diffeomorphism groups.
[BBHM]: M. Bauer, M. Bruveris, P. Harms, and P.W. Michor, Geodesic distance for right invariant Sobolev metrics of fractional order on the diffeomorphism group, Annals of Global Analysis and Geometry 44 (2013), no. 1, 5-21.
[BBM]: M. Bauer, M. Bruveris, and P.W Michor, Geodesic distance for right invariant Sobolev metrics of fractional order on the diffeomorphism group, Annals of Global Analysis and Geometry 44 (2013), no. 4, 361-368.
[JM]: R. Jerrard and C. Maor, Vanishing geodesic distance for right-invariant Sobolev metrics on diffeomorphism groups, Annals of Global Analysis and Geometry, to appear.
[MM]: P.W. Michor and D. Mumford, Vanishing geodesic distance on spaces of submanifolds and diffeomorphisms, Doc. Math. 10 (2005), 217-245.
page created: December, 2018