Every non-smooth $2$-dimensional Banach space has the Mazur-Ulam property

Authors :: Javier Cabello Sánchez
Taras Banakh
Publication Year :: 2021
Publisher :: arXiv, 2021.
Abstract: A Banach space $X$ has the $Mazur$-$Ulam$ $property$ if any isometry from the unit sphere of $X$ onto the unit sphere of any other Banach space $Y$ extends to a linear isometry of the Banach spaces $X,Y$. A Banach space $X$ is called $smooth$ if the unit ball has a unique supporting functional at each point of the unit sphere. We prove that each non-smooth 2-dimensional Banach space has the Mazur-Ulam property.<br />Comment: 13 pages