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APPENDIX I.
In the early model of the microscope Solver P47 the cantilever axis is inclined 20° to the sample plane (Fig. 1).
The plane of incident and reflected beams is perpendicular to the
cantilever axis. The angle between these beams is 40°. The beam
reflected off the non-deflected cantilever is perpendicular to the
photodiode plane.
 |
| Fig. 1. Optical detection system orientation in space. |
Omitting calculations, we present the angles value:
| |
| |
angle, ° |
cos |
 |
20 |
0.94 |
 |
83.3 |
0.12 |
 |
90 |
0 |
 |
20 |
0.94 |
|
APPENDIX II.
Given below is an
example of the calibration constant calculation (LAT signal vs. lateral
force) for the early model of the Solver P47 microscope having silicon
cantilever CSC12 with the following characteristics:
| length |
l = 90 mm |
| tip height |
 = 10 mm |
| spring constant |
1/c = 0.52 N/m |
Experimental plots of the DFL and LAT signals vs. adjusting screws travel x and h are shown in Fig. 2.
 |
 |
Fig. 2a. Experimental plots
DFL(x), LAT(x). |
Fig. 2b. Experimental plots
DFL(h), LAT(h). |
The laser spot on
the photodetector is of irregular shape and has irregular intensity. As
a result, obtained relations differ from the ideal ones (see Fig. 5 chapter 2.2.6.3).
The uneven curve in Fig. 2b is the evidence of the spot intensity side
maximums arising apparently from the light diffraction. The reason for
the lack of plateau on plots is the spot diameter exceeding half the
photodetector size. To determine the B constant, the linear portion of the plot LAT(x) in Fig. 2a and data from Appendix I are used.
Substituting values into expression (2) chapter 2.2.6.4, we get
APPENDIX III.
Problem.
Determine the
interaction potential of a polyatomic tip with a surface within the
model of the pairwise Van der Waals interaction of individual molecules.
Solution.
The potential of
two atoms interaction (neutral atoms having no dipole moment) at large
(relative to the atom size) separation is given by
 |
(1) |
where  – separation between atoms,  – constant of Van der Waals interaction which can be expressed through atoms polarizability.
Consider potential  of interaction between an atomic chain of identical atoms separated by distance  and a single atom at distance  from the chain;  is the distance to the neighbor atom along the chain.
It is obvious that
 |
(2) |
where  – atom number in chain.
Normalizing lengths by period  and introducing designations  and  , we get
 |
(3) |
The sum in this expression can be calculated accurately which gives
 |
(4) |
where
The sum calculation results for two different values of parameter  are shown in Fig. 1.
 |
 |
| a) |
b) |
Fig. 1. Dependence of potential (value of dimensionless sum) on atom shiftalong the chain
(absciss of both plots is dimensionless parameter  ) at constant distance
between atom and chain axis: (a) = 0.3, (b) = 1. |
As seen from Fig. 1a, at small distance to the chain axis, the potential is of complicated form, but as the distance increases (Fig. 1b),
the potential becomes sineshaped. Note that assuming the interatomic
potential to be that for the Van der Waals interaction, we thereby
supposed that the distance between atoms is more then atom size.
In extreme case of large values  the sum can be approximated by following expression
 |
(6) |
where  ,  .
To obtain the
potential of interaction with atomic plane one should sum the derived
formula over all atomic chains on the surface properly changing
parameter .
However, calculation of such a sum in analytic form is impossible.
Nevertheless, the mean value of potential can be easily obtained by
reducing summation to integration and assuming that atomic density is
"uniformly spread" over a sample volume.
The oscillating term 
in the formula is responsible for the pseudoatomic resolution of
scanning microscopy. Evidently, due to the exponential factor, the
noticeable contribution into the interaction can give only neighbor
atomic chains. As an example, consider [100] plane of a cubic lattice.
The accurate calculation of the contribution of underlying layers into
the potential for such a surface do not exceed 0.1%, therefore we shall
restrict ourselves to considering only the top layer. Let  be the dimensionless distance over the surface in units and  – dimensionless distance across the chain axis. Then, the potential of interaction with the surface is written as:
 |
(7) |
Taking into account three neighbor atomic chains, we get:
 we can obtain a good approximation:
 .
 |
(9) |
where
 |
(8) |
Considering only case of large
Returning to dimensional units, we can write:
 .
 |
(10) |
где
Result.
The oscillating
part of the atom-surface interaction potential at the distance of the
order of atomic period and more is the periodic function (cosine) with
the period of atomic lattice (for the [100] plane of cubic lattice).
Note.
For the other lattice types, e.g. graphite, the contribution of
underlying layers can be considerable, therefore, the period in the
image can be less than the interatomic distance in the top layer.
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