Electrostatic multipole moment

Born s idea was taken up by Kirkwood and Onsager [24,25], who extended the dielectric continuum solvation approach by taking into account electrostatic multipole moments, Mf, i.e., dipole, quadrupole, octupole, and higher moments. Kirkwood derived the general formula ... 

A factor -2 included in the last term here compensates for the use of Rydberg units and for the omission of the negative electronic charge in potential functions derived from Eq. (7.14). Hence the electrostatic multipole moments of atomic cell r/( are... 

We will return to the quadrupole interaction in following chapters, but we now re-examine the general expansion of the electrostatic interaction and, in particular, the possibility of other nuclear electrostatic multipole moments. Because our multipole expansion is performed in a coordinate system with origin at the centre of charge of the protons p in the nucleus, the nuclear electric dipole moment is zero. However, this result arises only from our choice of origin and we now show that there are much... 

The molecular electrostatic multipole moments here are defined following Buckingham [19] ... 

Electrostatic multipole moments of molecules, i.e., dipoles, quadrupoles, or octupoles, can also be obtained from QM wave functions. Methods like distributed multipole analysis (DMA) [84] or AIM [85] assign multipole moments to each atom or to specified sites of a molecule. The DMA method estimates multipole moments from QM wave functions and the highest obtained multipole moment depends on the basis set used. There are no limitations in this method on number or position of the multipoles anisotropic effects due to lone pairs or n electrons can also be considered. 

Molecular properties can be calculated at any given geometry, including electrostatic multipole moments up to hexadecapoles polarizabilities and hyperpolarizabilities electrostatic potential fitted charges Mulliken population electron density vibrational spectrum and thermochemical properties. 

The electrostatic potential generated by a molecule A at a distant point B can be expanded m inverse powers of the distance r between B and the centre of mass (CM) of A. This series is called the multipole expansion because the coefficients can be expressed in temis of the multipole moments of the molecule. With this expansion in hand, it is... 

The electrostatic interaction results from the interaction of tire ion with the pennanent multipole moments of the neutral. For cylindrically synnnetric neutrals or linear molecules, the ion-neutral multipole interaction is... 

Task 1 Calculate the first non-vanishing multipole moment of the electrostatic potential of composed objects (i.e., structural units and clusters). 

The raie gas atoms reveal through their deviation from ideal gas behavior that electrostatics alone cannot account for all non-bonded interactions, because all multipole moments are zero. Therefore, no dipole-dipole or dipole-induced dipole interactions are possible. Van der Waals first described the forces that give rise to such deviations from the expected behavior. This type of interaction between two atoms can be formulated by a Lennaid-Jones [12-6] function Eq. (27)). 

A central multipole expansion therefore provides a way to calculate the electrostatic interaction between two molecules. The multipole moments can be obtained from the wave-function and can therefore be calculated using quantum mechanics (see Section 2.7.3) or can be determined from experiment. One example of the use of a multipole expansion is... 

Fowler P W and A D Buckingham 1991. Central or Distributed Multipole Moments Electrostatic Models of Aromatic Dimers. Chemical Physics Letters 176 11-18. 

Multipole moments are useful quantities in that they collectively describe an overall charge distribution. In Chapter 0, I explained how to calculate the electrostatic field (and electrostatic potential) due to a charge distribution, at an arbitrary point in space. 

Conceptually, the self-consistent reaction field (SCRF) model is the simplest method for inclusion of environment implicitly in the semi-empirical Hamiltonian24, and has been the subject of several detailed reviews24,25,66. In SCRF calculations, the QM system of interest (solute) is placed into a cavity within a polarizable medium of dielectric constant e (Fig. 2.2). For ease of computation, the cavity is assumed to be spherical and have a radius ro, although expressions similar to those outlined below have been developed for ellipsoidal cavities67. Using ideas from classical electrostatics, we can show that the interaction potential can be expressed as a function of the charge and multipole moments of the solute. For ease... 

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