Patent Application
20140379313
The present invention relates to a method for calculating an interaction potential between filler particles in a polymeric material, more particularly to a method for determining parameters of the Lennard-Jones potential between the filler particles.
In recent years, in order to develop or design rubber compositions, various computer simulation methods for evaluating properties of a composite of a polymeric material and filler have been proposed.
In such a simulation method, for example, filler models of filler particles are defined, and the Lennard-Jones potential ULJ given by the following equation (1) (namely, an interaction potential between two filler models) is defined between the filler models.
wherein
Heretofore, the above-mentioned parameters σLJ and εLJ have been determined by an operator based on his/her intuition and experience, therefore, it is difficult to perform the simulation with high accuracy.
It is therefore, an object of the present invention to provide a method for calculating an interaction potential between filler particles in a polymeric material, by which parameters of the interaction potential, in particular, the Lennard-Jones potential between the filler particles can be determined by the use of a computer though a calculation.
According to the present invention, a method for calculating an interaction potential between filler particles in a polymeric material by using a computer, comprises:
a process in which a filler model of each of the filler particles is defined,
a process in which a polymer model of each of macromolecular chains of the polymeric material is defined,
a process in which the filler models and the polymer models are set in a predetermined virtual space,
a process in which a free energy in the virtual space is calculated based on the mean field theory, and
a process in which, by approximating the free energy to the Lennard-Jones potential, parameters of the Lennard-Jones potential are obtained.
In the present invention, therefore, the parameters of the Lennard-Jones potential can be determined based on the free energy in the virtual space. This is based on findings of the present inventor obtained through experiments, namely, the free energy in the virtual space calculated based on the mean field theory approximates the interaction potential between the filler models. Thus, the parameters can be determined without the need for human intuition and experience. As a result, it is possible to perform the simulation with high accuracy.
The calculating method according to the present invention may further include the following features (1)-(3):
(1) the filler models are a pair of the filler models, and the process for calculating the free energy comprises
a step (a) in which, by abutting the filler models, a minimum value Es of the free energy is calculated, and
a step (b) in which, by separating the filler models from each other, a maximum value Fm of the free energy is calculated;
(2) the filler models have a certain diameter, and the parameters of the Lennard-Jones potential include
a parameter εLJ relating to the strength of a repulsive force exerted between the filler models by the Lennard-Jones potential, and
a parameter σLJ corresponding to the diameter of the filler models, and
the process for obtaining the parameter εLJ and parameter σLJ comprises
a step (c) in which the parameter εLJ is obtained from the difference between the maximum value Fm and the minimum value Fs of the free energy, and
a step (d) in which the parameter σLJ is obtained from a distance between the filler models which abut each other to calculate the minimum value Fs of the free energy;
(3) a χ parameter relating to an interaction between a filler model and a polymer model is set in a range of from 0.0 to 10.0.
a) and 7(b) are diagrams showing the filler models in the virtual space for explaining processes for obtaining the minimum value Fs and the maximum value Fm of the free energy F in the virtual space.
Embodiments of the present invention will now be described in detail in conjunction with the accompanying drawings.
The method for calculating an interaction potential between filler particles in a polymeric material according to the present invention (abbreviated to “calculating method”) is carried out by the use of a computer 1.
Here, the filler may be any kind of filler including carbon black, silica, alumina and the like. The polymeric material may be any kind of polymer including rubber, elastomer, resin and the like.
As shown in
In the process S1, a virtual space 3 is defined. In this embodiment, as shown in
The length L1 of the sides 3a and the length L2 of the sides 3b may be set arbitrarily, but it is preferable that the length L1 and the length L2 are set in a range of not less than 2 times, more preferably not less than 10 times the radius of gyration of the filler models 4 and the polymer model 6 (shown in
In the process S2, a filler model of each of the filler particles is defined.
As shown in
In this embodiment, the domain 5 is two-dimensional and defined as being of a circular shape. However, in the case of a three-dimensional filler model 4 where the filler segment 4s is also three-dimensional, it is preferable that the domain 5 is defined as being of a spherical shape.
In any case, data about the filler model 4 are stored in the computer 1.
In this embodiment, the filler segment 4s is treated as a minimum unit of a simulation based on the mean field theory (Flory-Huggins theory, etc.). Here, the mean field theory is a statistical thermodynamic theory for polymer solution used to mean-field approximate the interactions between a polymer and its surroundings.
In the process S3, a polymer model of each of macromolecular chains of the polymeric material is defined. As shown in
Between the polymer segments 7, a joining chain 8 is defined. For example, the length K1 of the joining chain 8 is set to a value corresponding to the mesh size of the system. Thus, the polymer model 6 is defined to have a two-dimensional straight-chain structure in which the relative distances between the polymer segments 7 are held stably.
A χ parameter K2 employed in the Flory-Huggins theory and relating to an interaction between a polymer segment 7 of a polymer model 6 and a polymer segment 7 of another polymer model 6 is set in a range of from 0.0 to 10.0 for example. As a result, between the polymer segments 7, a repulsive interaction and the intensity thereof are defined. Data about such the polymer segments 7 are stored in the computer 1.
In the process S4, the filler models 4 and the polymer models 6 are set in the virtual space 3 to have a predetermined volume fraction. For example, the volume fraction is set in a range of from 50% to 99%. In this embodiment, a pair of the filler models are set in the virtual space 3. Data about the concentration distribution of the polymer segments 7 of the polymer models 6 are stored in the computer 1.
In the process S5, a χ parameter K3 employed in the Flory-Huggins theory and relating to an interaction between a filler model 4 and a polymer model 6 is defined.
As shown in
In this embodiment, the χ parameters K3 are set in a range of from 0.0 to 10.0. As a result, between the filler segment 4S and the polymer segment 7, a repulsive interaction and the intensity thereof are defined.
If the χ parameters K3 are more than 10.0, there is a possibility that, in the simulation based on the mean field theory, even if the arrangement of the filler models 4 and the polymer models 6 becomes close to their equilibrium state, the difference in the calculated energy from that calculated in the most recent calculation step is still large, and the computation can not be converged.
Therefore, preferably, the χ parameters K3 are set in a range of not more than 5.0. Such χ parameters K3 are stored in the computer 1.
In the simulation process S6, using the filler models 4 and the polymer models 6 set in the virtual space 3, a free energy in the virtual space 3 is calculated based on the mean field theory. Here, the free energy F is the Helmholtz free energy.
As shown in
Such simulation based on the mean field theory can be implemented, for example, by the use of a simulation engine SUSHI built in a simulation system OCTA available from a website.
In the process S61, by abutting the filler models 4, a minimum value Fs of the free energy F is calculated.
As shown in
In the abutting state of the pair of the filler models 4, the number of the polymer models 6 entering into the vicinity of the filler models 4 becomes least.
Therefore, a reduction in the entropy of the arrangement of the polymer models 4 is suppressed, and the free energy F in the virtual space 3 becomes a minimum value Fs.
In
Further, in the process S61, a distance R between the filler models 4 abutting each other, namely, the minimum distance Rs is obtained.
Here, the distance R between the filler models 4 is defined as the distance between the centers (centroids) 5c of the domains in which the filler segment 5 are disposed.
The obtained minimum value Fs of the free energy F and the obtained minimum distance Rs are stored in the computer 1.
In the process S62, by separating the abutting filler models 4 from each other, a maximum value Fm of the free energy F is calculated.
As shown in
The distances R and the free energy F of the entire system calculated at each distance R are stored in the computer 1. Thus, a relationship between the free energy F and the distance R can be obtained as shown in
In the calculation process S7, by approximating the free energy F to the Lennard-Jones potential ULJ, parameters of the Lennard-Jones potential ULJ are obtained by the computer 1. The Lennard-Jones potential ULJ is given by the following equation (1).
wherein
when the distance rij is 21/6σLJ, the Lennard-Jones potential ULJ becomes a minimum value −εLJ.
when the pair of the filler models abut each other, the Lennard-Jones potential ULJ becomes minimized.
Accordingly, the distance rij when the pair of the filler models abut each other is 21/6σLJ.
when the distance rij is decreased toward zero from 21/6σLJ, the Lennard-Jones potential ULJ increases to infinity and exerts a large repulsive force between the filler models.
when the distance rij is increased from 21/6σLJ, the Lennard-Jones potential ULJ gradually decreases and approaches to zero. This means that the influence of the Lennard-Jones potential ULJ is reduced with the increase in the distance rij.
The inventor found that, as a result of the above facts correlated, there is a correlation between the free energy F and the Lennard-Jones potential ULJ.
In the present invention, by making a calculation based on the free energy F which varies according to the distance R, the parameters σLJ and εLJ of the Lennard-Jones potential ULJ is determined without the need for someone's intuition and experience.
In the process S71, the parameter εLJ is obtained from the difference (Fm−Fs) between the maximum value Fm and the minimum value Fs of the free energy.
As shown in
In the process S71, this difference (εLJ) is regarded as the same value as the difference (Fm−Fs).
εLJ=Fm−Fs Expression (2).
Using this relational expression (2), the parameter εLJ is obtained. The obtained parameter εLJ is stored in the computer 1.
In the process S72, the parameter σLJ is obtained from a distance between the filler models abutting each other.
As shown in
In the process S72, this distance rij (21/6σLJ) is regarded as the same value as the minimum distance Rs.
21/6σLJ=Rs.
Accordingly,
σLJ=Rs/21/6 Expression (3).
using this relational expression (3), the parameter σLJ is obtained. The obtained parameter σLJ is stored in the computer 1.
In the process S7, therefore, the parameters εLJ and σLJ of the Lennard-Jones potential can be obtained by the calculation based on the free energy F in the virtual space including the filler models as the analysis object. Thus, depending on the analysis object (filler models), the parameters εLJ and σLJ suitable for the analysis object can be obtained without the need for someone's intuition and experience, therefore, it is possible to perform the simulation with high accuracy.
In the process S8, a virtual space 13 including filler models 11 and polymer models 14 and corresponding to a micro-structural part of the polymeric material as the analysis object is newly defined, and
a deformation calculation of the virtual space 13 is performed.
In this embodiment, as shown in
The filler models 11 are each defined by a single filler particle model 12 having a spherical shape and treated as a mass point of the equation of motion.
Between the filler models 11, there is defined the Lennard-Jones potential ULJ given by the above-mentioned equation (1) to which the values of the parameters εLJ and σLJ obtained in the above-mentioned process S7 are assigned.
The polymer models 14 which are of macromolecular chains of the polymeric material, are defined as a uniform fluid existing in the virtual space 13 between the filler models 11 and the wall surfaces 13s. on the polymer models 14, the viscosity of the polymeric material is defined.
Data about such virtual space 13 including the filler models 11 and the polymer models 12 are stored in the computer 1.
Then, the deformation calculation of the virtual space 13 is performed based on the Navier-stokes equation and the motion equation.
In this embodiment, the deformation calculation is performed until the strain becomes a value in a range of from 1 to 100, and a physical property (for example, viscosity, stress etc.) of the virtual space 13 is calculated.
The deformation rate of the virtual space 13 is set in a range of from about 10−6 to 1 σ/τ.
On the assumption that the filler models 11 follow the classical dynamics, the Newton's equation of motion is employed.
The motions of the filler models 11 are tracked at regular time intervals.
During the deformation calculation, the number of the filler models in the virtual space, and the temperature and the volume of the virtual space are kept constant.
For example, such deformation calculation can be implemented by the use of a simulation software KAPSEL available from the same website as the above-mentioned simulation system OCTA.
As explained above, in the process S8, the parameters εLJ and σLJ of the Lennard-Jones potential ULJ are set to the values of the parameters εLJ and σLJ obtained by the calculation process S7.
In the process S9, the computer 1 judges whether the physical property of the virtual space 13 is acceptable or not.
If not acceptable, the conditions of the filler models 11 and the polymer models 14 are changed.—Process S11
Then, the processes S1 to S9 are repeated.
If acceptable, based on the conditions of the filler models 11 and the polymer models 14, the polymeric material including the filler is actually produced.—Process S10
Thus, in this embodiment, the conditions of the filler models 11 and the polymer models 14 are changed until the physical property of the virtual space 13 becomes acceptable, therefore, the polymeric material with desired performance can be developed efficiently.
According to the procedure shown in
In the process for obtaining the parameters εLJ and αLJ, virtual space 3:
L1: 30 σ
L2: 60 σ
Number in the virtual space: 2
Diameter: 6 σ
volume fraction in the virtual space: 80%
Chain length of polymer segment: 50 (Linear molecule)
Diameter of polymer segment: 1 σ
χ parameter K2 between polymer models: 0.0
χ parameter K3 between filler model and polymer model: 3.0.
In the deformation calculation,
virtual space 13: cube
L1 of each side: 300 σ
Filler model 11:
Number in the virtual space: 100
Diameter: 6 σ
Polymer model 14:
Viscosity: 1.0 η
Absolute temperature: 1.0ε/kB.
| Number | Date | Country | Kind |
|---|---|---|---|
| 2013-133001 | Jun 2013 | JP | national |
