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Let us write the obtained components of inverse stiffness tensor  (see (2) in chapter 2.1.1) into the representative matrix for mathematical convenience:
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(1) |
The  coefficient of inverse stiffness is the largest of other tensor components. In formula (12) of chapter 2.1.2 this parameter is specially denoted as  without indexes. It is namely the quantity  that characterizes a cantilever stiffness which is one of its major parameters. Below, for the sake of clearness, we will take outside as a common multiplier of all the matrix elements [1]:
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(2) |
Tensor is symmetric. That is true. The left side of expression (1) in chapter 2.1.1 –  is a polar vector, therefore, the right side must have the same transformational properties. The force  is a polar vector; therefore, the tensor must be symmetric in order to properly transform the expression (2) in chapter 2.1.1 at coordinates reflections.
The presence of
non-diagonal elements leads to the difference in directions of the
applied force and of the tip deflection vector and is an evidence of
limited applicability of the elastic cantilever simplified model based
on three perpendicular springs. To apply this model, one should
determine not only stiffness but true directions of three springs that
do not coincide with coordinate axes. This problem is reduced to the
tensor (2) diagonalization in order to obtain its eigenvalues as well
as to determine the directions of transformed co-ordinates along which
the model springs should be oriented.
It is seen that the
cantilever elastic properties are completely defined by five
parameters. We can find all tensorial components knowing geometrical
characteristics of the cantilever and its stiffness constant.
To facilitate computation at experiments, the obtained components are introduced into the matrix in formula (3) of chapter 2.1.1:
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(3) |
Summary.
- The tensor component
corresponding to the vertical displacement at z-type deflection is the
largest. Its inverse value is the beam stiffness constant that
characterizes a cantilever.
- Tensorial nature of a cantilever elastic properties leads to the limited applicability of simplified models based on springs.
- To properly model a cantilever
elastic properties by three springs, one should determine their
parameters correctly by diagonalization of the inverse stiffness tensor.
References.
- Handbook of Micro/Nanotribology / Ed. by Bhushan Bharat. - 2d ed. - Boca Raton etc.: CRC press, 1999. – 859 c.
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