Slavskii, V. V. On a theorem of Fermi. (English) Zbl 0888.53030 Commentat. Math. Univ. Carol. 37, No. 4, 867-872 (1996). Summary: A conformally flat metric \(\bar g\) is said to be Ricci superosculating with \(g\) at the point \(x_0\) if \(g_{ij}(x_0)=\bar g_{ij} (x_0),\;\Gamma^k_{ij} (x_0)=\overline\Gamma^k_{ij}(x_0),\;R^k_{ij} (x_0)=\overline R^k_{ij}(x_0)\), where \(R_{ij}\) is the Ricci tensor. In this paper the following theorem is proved: If \(\gamma\) is a smooth curve in the Riemannian manifold \(M\) (without self-intersections), then there is a neighbourhood of \(\gamma\) and a conformally flat metric \(\bar g\) which is Ricci superosculating with \(g\) along the curve \(\gamma\). MSC: 53C20 Global Riemannian geometry, including pinching 53A30 Conformal differential geometry (MSC2010) Keywords:conformal connection; development PDFBibTeX XMLCite \textit{V. V. Slavskii}, Commentat. Math. Univ. Carol. 37, No. 4, 867--872 (1996; Zbl 0888.53030) Full Text: EuDML