Short Range Interaction Model

Chen based this contribution on the Nonrandom. Two Liquid (NRTL) model proposed by Renon and Prausnitz in 1968 (C5). He felt it is valid since the heat of mixing for electrolyte systems Is very large and, in comparison, the nonideal entropy of mixing is negligible. The algebraic simplicity and the fact that no specific area or volume data are needed were further recommendations. He described his derivation in the following manner. 

1) The like-ion repulsion assumption - that is, due to large repulsive forces between ions of the same charge, the area immediately surrounding a cation will not contain other cations and the area immediately surrounding an anion will not contain other anions. 

2) The local electroneutrality assumption - which states that, around a central solvent molecule, the arrangement of cations and anions will be such that the net ionic charge is zero. 

These assumptions were displayed pictorially for a solution of one solvent with one completely dissociated electrolyte as  

In order to define the local mole fractions, the following expressions are given  

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It has been found that the short-range interaction model can be applied to study the vibrational relaxation of molecules in condensed phases. This model is applied to treat vibrational relaxation and pure dephasing in condensed phases. For this purpose, the secular approximation is employed to Eq. (129). This assumption allows one to focus on several important system-heat bath induced processes such as the vibrational population transition processes, the vibrational coherence transfer processes, and the vibronic processes. 

Sutton and Chen extended the potential to longer range to enable the study of certain problems such as the interactions between clusters of afoms [Sutton and Chen 1990]. Their objective was to combine the superior Fiimis-Sinclair description of short-range interactions with a van der Waals tail to model the long-range interactions. The form of the Sutton-Chen potential is ... 

We have assumed so far, implicitly, that the interactions are strictly local between neighboring atoms and that long-ranged forces are unimportant. Of course the atom-atom interaction is based on quantum mechanics and is mediated by the electron as a Fermi particle. Therefore the assumption of short-range interaction is in principle a simplification. For many relevant questions on crystal growth it turns out to be a good and reasonable approximation but nevertheless it is not always permissible. For example, the surface of a crystal shows a superstructure which cannot be explained with our simple lattice models. 

The popular and well-studied primitive model is a degenerate case of the SPM with = 0, shown schematically in Figure (c). The restricted primitive model (RPM) refers to the case when the ions are of equal diameter. This model can realistically represent the packing of a molten salt in which no solvent is present. For an aqueous electrolyte, the primitive model does not treat the solvent molecules exphcitly and the number density of the electrolyte is umealistically low. For modeling nano-surface interactions, short-range interactions are important and the primitive model is expected not to give adequate account of confinement effects. For its simphcity, however, many theories [18-22] and simulation studies [23-25] have been made based on the primitive model for the bulk electrolyte. Ap-phcations to electrolyte interfaces have also been widely reported [26-30]. 

The Born equation thus derived is based on very simple assumptions that the ion is a sphere and that the solvents are homogeneous dielectrics. In practice, however, ions have certain chemical characters, and solvents consist of molecules of given sizes, which show various chemical properties. In the simple Born model, such chemical properties of ions as well as solvents are not taken into account. Such defects of the simple Born model have been well known for at least 60 years and some attempts have been made to modify this model. On the other hand, there has been another approach that focuses on short-range interactions of an ion with solvent molecules. 

While nonbonded atom pairs will typically not come within 1A of each other, it is possible for covalently bound pairs, either directly bounds, as in 1-2 pairs, or at the vertices of an angle, as in 1-3 pairs. Accordingly it may be considered desirable to omit the 1-2 and 1-3 dipole-dipole interactions as is commonly performed on additive force fields for the Coulombic and van der Waals terms. However, it has been shown that inclusion of the 1-2 and 1-3 dipole-dipole interactions is required to achieve anistropic molecular polarizabilites when using isotropic atomic polariz-abilites [50], For example, in a Drude model of benzene in which isotropic polarization was included on the carbons only inclusion of the 1-2 and 1-3 dipole-dipole interactions along with the appropriate damping of those interactions allowed for reproduction of the anisotropic molecular polarizability of the molecule [64], Thus, it may be considered desirable to include these short range interactions in a polarizable force field. 

Lattice gas models are simple to construct, but the gross approximations that they involve mean that their predictions must be treated with care. There are no long-range interactions in the model, which is unrealistic for real molecules the short-range interactions are effectively hard-sphere, and the assumption that collisions lead to a 90° deflection in the direction of movement of both particles is very drastic. At the level of the individual molecule then, such a simulation can probably tell us nothing. However, at the macroscopic level such models have value, especially if a triangular or hexagonal lattice is used so that three-body collisions are allowed. 

Although the trajectory and convective diffusion techniques are conceptually simple, certain mechanisms, in particular, the exact role of the intermolecular force between the particle and the electrode remains an element of debate. Most of these problems arise because continuum models about short-range interactions break down at very short distances, where other factors, much less defined come into play. A complete understanding of the coelectrodeposition process requires a synergy between theoretical models and thorough experimental work. 

Multilayer Adsorption of Water. As the amount of water in the clay increases over that needed for a one- or two-layer hydrate, the study of the properties of the water becomes experimentally more difficult. This is important because it is only at water contents in excess of the two-layer hydrate that a conflict arises between the short-range and long-range interaction models. In support of the short-range model, two studies are noteworthy. A small angle... 

It is difficult to reconcile these very different views of the interaction of water and clay surfaces. Sposito (8.) has attempted this. He points out that the thermodynamic properties have an essentially infinite time scale, whereas the spectroscopic measurements look at some variant of the vibrational or a predecessor of the diffusional structure of water. It is possible that the thermodynamic properties reflect a number of cooperative interactions which can be seen only on a very long time scale. Still, the X-ray diffraction studies seemingly also operate on as long a time scale as the thermodynamic properties. There is still not a clear choice between the short-range and long-range interaction models. 

The Forster resonance energy transfer can be used as a spectroscopic ruler in the range of 10-100 A. The distance between the donor and acceptor molecules should be constant during the donor lifetime, and greater than about 10 A in order to avoid the effect of short-range interactions. The validity of such a spectroscopic ruler has been confirmed by studies on model systems in which the donor and acceptor are separated by well-defined rigid spacers. Several precautions must be taken to ensure correct use of the spectroscopic ruler, which is based on the use of Eqs (9.1) to (9.3) ... 

Among the various models incorporating the local composition concept for short-range interactions, the NRTL equation is adopted in this study. Electrolyte systems are characterized by extraordinarily large heats of mixing. 

A number of techniques have been employed to model the framework structure of silica and zeolites (Catlow Cormack, 1987). Early attempts at calculating the lattice energy of a silicate assumed only electrostatic interactions. These calculations were of limited use since the short-range interactions had been ignored. The short-range terms are generally modelled in terms of the Buckingham potential,... 

In order to understand the effects of filler loading and filler-filler interaction strength on the viscoelastic behavior, Chabert et al. [25] proposed two micromechanical models (a self-consistent scheme and a discrete model) to account for the short-range interactions between fillers, which led to a good agreement with the experimental results. The effect of the filler-filler interactions on the viscoelasticity... 

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