On pseudo-conformal transformations of hypersurfaces
On pseudo-conformal transformations of hypersurfaces
Given a real differentiable hypersurface $S_{i},$ $i=1,2$, of a complex manifold $M_{i}$ , we say that a mapping $f$ of $S_{1}$ into $S_{2}$ is pseudo-conformal if $f$ extends to a holomorphic mapping of a neighborhood of $S_{1}$ in $M_{1}$ into that of $S_{2}$ in $M_{2}$ .$S_{1}$ is called pseudo-conformally equivalent …