Abstract

The components of a third-rank ${\mathrm{\ensuremath{\chi}}}^{(2)}$ tensor have been split into contributions due to 1-fold, 2-fold, 3-fold, and \ensuremath{\infty}-fold or isotropic rotation axes for a surface of ${\mathit{C}}_{\mathit{s}}$ symmetry. Theoretical analysis of the rotation patterns obtained by the surface second-harmonic (SH) generation indicates that a complete symmetry analysis cannot be performed without knowledge of the relevant distribution functions. Rotation axes of lower symmetry create via ``overtones'' or ``harmonics'' contributions apparent in the analysis of the rotation axes of higher symmetry. An experimental example is the observation of structural changes of Au(111) surfaces in an aqueous electrolytic environment. Potential-dependent buildup and removal of a Au(111)-(1\ifmmode\times\else\texttimes\fi{}23) surface could be monitored in situ and in real time. Symmetry analysis of the SH rotation patterns reveals both contributions due to a 3-fold axis due to the regular (1\ifmmode\times\else\texttimes\fi{}1) structure and simultaneously a 1-fold and a 2-fold axis due to the (1\ifmmode\times\else\texttimes\fi{}23) reconstruction.