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The Van der Waals force
or the intermolecular attractive force has three components of slightly
different physical nature but having the same potential dependence on
the intermolecular distance –  .
This lucky circumstance allows to compare directly constants of
interaction that correspond to three Van der Waals force components
because proportions between them will be held constant at different  magnitudes. Constants at multiplier will differ for various materials.
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(1) |
All three Van der Waals force components are based on dipoles interaction, therefore we should remember two basic formulas:
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the energy of dipole  placed in field  is [1]: |
and the electric field produced by the dipole is [1]: |
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(2) |
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(3) |
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where  – unit vector directed from the point at which the energy is determined to the dipole. |
The orientational interaction (or the Casimir force)
arises between two polar molecules each of which has the electric
dipole moment. In accordance with (2), (3) the interaction energy of
dipoles  and  separated by distance
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(4) |
depends sufficiently upon the molecules relative position. Here is the unit vector directed along the line between molecules.
In order to reach the potential minimum, dipoles tend to align along the common axis (Fig. 1). The thermal motion, however, breaks this order. To determine the "resulting" orientation potential 
one should average statistically interactions over all possible
orientations of molecules pair. Notice that in accordance with the
Gibbs distribution  , which gives the probability of the system being in the state with energy  at temperature  ,
the energetically advantageous orientations are preferable. That is why
despite the isotropy of possible mutual orientations, the average
result will be nonzero.
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Fig. 1. The energy of dipoles interaction depends on their mutual orientation.
To
find the "effective" potential it is necessary to perform the
thermodynamic averaging over all directions of dipoles in space. |
Averaging with the use of the Gibbs distribution is performed in accordance with the following formula:
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(5) |
where, for the sake of normalization, the denominator is the statistical sum and  is the integration parameter providing enumeration of all the system possible states (a pair of dipoles mutual orientations).
If  the exponent can be approximated by the series expansion:
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(7) |
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(6) |
so the energy of orientation interaction is approximated as:
On performing integration it can be shown that  , thus,  . Introducing constant  in accordance with (4), we finally have:
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(8) |
The induction interaction (or the Debye force) arises between polar and nonpolar molecules. Electric field generated by dipole polarizes the other molecule (Fig. 2). The induced moment calculated in the first order of the quantum perturbation theory is equal to  where  stands for the molecule polarizability.
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| Fig. 2. Under the polar molecule field the neighboring one acquires the induced dipole moment. |
Then, the potential of induction interaction is computed as follows:
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(9) |
Thus, this kind of interaction also "universally" depends on though having the other reason and the other constant.
It should be noted
that in liquids and solids the polarized molecule experiences the
symmetric influence of many neighbor molecules, the induction
interaction being strongly compensated by their action. The result is
that the real induction interaction is estimated as:
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(10) |
The dispersion interaction (or the London force)
is a prevailing one because it involves nonpolar molecules as well.
This third term in (1) is always presented that is why it is the major
one.
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| Fig. 3. Due to the quantum uncertainty,
nonpolar molecules have "momentary" dipole moments, interaction between
which is of the second order of smallness of the perturbation theory. |
In a system of nonpolar molecules the electrons wave function  is such that average values of dipole moments in any state  are equal to zero:  . However, nondiagonal matrix elements  are nonzero. Moreover, the second quantum mechanical correction to the interaction energy calculated as is known [2] according to the formula below, is nonzero too:
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(11) |
where perturbation  is given by (4),  ,  – energies of the system of two molecules in arbitrary states and  .
In a certain sense, "momentary" magnitudes of dipole moments (at zero average value) are nonzero and they interact (Fig. 3).
In the second order of smallness the averaged magnitude of such
"momentary" potential is not already vanished and namely this is the
potential of dispersion interaction.
Correction (11) as is seen, is proportional to the square of perturbation  . From this it is clear that
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, |
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(12) |
Constant  is called the Hamaker constant (here  ,  – ionization potentials,  ,  – molecules polarizability).
The classical
interpretation of this interaction is as follows. The dipole moment of
one molecule arisen from fluctuations, generates field which, in turn,
polarizes the second molecule. The already nonzero field of the second
molecule polarizes the first one. The potential of this peculiar system
with a "positive feedback" is calculated similarly to the induction
interaction.
Relative values of Van der Waals force components are presented in Table 1 [3].
| Substance |
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 |
 |
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0.667 |
0 |
13.6 |
0 |
0 |
6.3 |
 |
1.57 |
0 |
13.6 |
0 |
0 |
41.3 |
 |
1.74 |
0 |
15.8 |
0 |
0 |
59.3 |
 |
1.6 |
0 |
15.8 |
0 |
0 |
48 |
 |
0.2 |
0 |
24.7 |
0 |
0 |
1.2 |
 |
1.99 |
0.12 |
14.3 |
0.0034 |
0.057 |
67.5 |
 |
2.63 |
1.03 |
13.7 |
18.6 |
5.4 |
105 |
 |
1.48 |
1.84 |
18.0 |
197 |
10 |
48.8 |
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2.24 |
1.5 |
11.7 |
87 |
10 |
72.6 |
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| Table 1. Magnitudes of polarizability,
dipole moment, ionization potential and energies of different weak
interactions between various atoms and molecules. |
Obviously, the force is determined by
 |
, |
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(13) |
Estimations of the Van der Waals attraction for AFM studies in the contact mode give:  .
Summary.
- The Van der Waals force which arises
from the electrostatic interaction of molecular shells has three
components: orientation, induction and dispersion interactions.
- Despite the different nature of the Van der Waals force components, their dependence on distance is of the same character – .
References.
- Sivukhin D.V. General physics course: Electricity – Moscow. Nauka Publ., 1983. – 687 pp (in Russian)
- Landau L.D. Quantum mechanics: Nonrelativistic theory. – Moscow.: Nauka Publ., 1989. – 767 pp (in Russian)
- Rubin A.B. Biophysics: Theoretical biophysics. – Moscow.: Knizny dom Universitet, 1999. – 448 pp (in Russian)
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