The Number of Harmonic Frequencies of a Symmetrical Molecule: A Correction

This paper advances a new method which can correct the spectrum peak value of the rms spectrum in order to decrease the errors that exist when the spectral line is not on the peak. The authors first use the barycentre of spectral lines in the main lobe to obtain the coordinate of the spectrum peak.

We study a second order ordinary differential equation which is the EulerLagrange equation of the energy functional for maps with prescribed rotational symmetry. We obtain Liouville's type theorems for symmetric harmonic maps into ellipsoids, Euclidean and Hyperbolic spaces, and existence results as

Propp conjectured that the number of lozenge tilings of a semiregular hexagon of sides 2n&1, 2n&1, and 2n which contain the central unit rhombus is precisely one third of the total number of lozenge tilings. Motivated by this, we consider the more general situation of a semiregular hexagon of sides