On Lipschitz-free spaces over spheres of Banach spaces (Q2661256)

\textit{F. Albiac} et al. [Isr. J. Math. 240, No. 1, 65--98 (2020; Zbl 1462.46003)] have shown that for any metric space there is a bounded one such that the corresponding Lipschitz-free spaces are isomorphic. In case the metric space is a Banach space, one can be more specific. Indeed, \textit{P. L. Kaufmann} [Stud. Math. 226, No. 3, 213--227 (2015; Zbl 1344.46008)] proved that the Lipschitz-free space \(\mathcal F(X)\) is isomorphic to \(\mathcal F(B_X)\) for any Banach space \(X\). In this short paper, it is shown that the Lipschitz-free space on a Banach space \(X\) is isomorphic to the one on its sphere, provided that \(X\) is isomorphic to its hyperplanes.