Stopping power (particle radiation): Difference between revisions

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In [[physics]], the '''gyration tensor''' is a [[tensor]] that describes the second [[moment (mathematics)|moment]]s of position of a collection of [[Elementary particle|particle]]s
 
:<math>
S_{mn} \ \stackrel{\mathrm{def}}{=}\  \frac{1}{N}\sum_{i=1}^{N} r_{m}^{(i)} r_{n}^{(i)}
</math>
 
where <math>r_{m}^{(i)}</math> is the <math>\mathrm{m^{th}}</math>
[[Cartesian coordinate system|Cartesian coordinate]] of the position [[vector (geometric)|vector]] <math>\mathbf{r}^{(i)}</math> of the
<math>\mathrm{i^{th}}</math> particle. The [[origin (mathematics)|origin]] of the [[coordinate system]] has been chosen such that
 
:<math>
\sum_{i=1}^{N} \mathbf{r}^{(i)} = 0
</math>
 
i.e. in the system of the [[center of mass]] <math>r_{CM}</math>. Where
 
:<math>
r_{CM}=\frac{1}{N}\sum_{i=1}^{N} \mathbf{r}^{(i)}
</math>
 
Another definition, which is mathematically identical but gives an alternative calculation method, is:
 
:<math>
S_{mn} \ \stackrel{\mathrm{def}}{=}\  \frac{1}{2N^{2}}\sum_{i=1}^{N}\sum_{j=1}^{N} (r_{m}^{(i)} - r_{m}^{(j)}) (r_{n}^{(i)} - r_{n}^{(j)})
</math>
 
Therefore, the x-y component of the gyration tensor for particles in Cartesian coordinates would be:
 
:<math>
S_{xy} = \frac{1}{2N^{2}}\sum_{i=1}^{N}\sum_{j=1}^{N} (x_{i} - x_{j}) (y_{i} - y_{j})
</math>
 
In the continuum limit,
 
:<math>
S_{mn} \ \stackrel{\mathrm{def}}{=}\  \dfrac{\int d\mathbf{r} \ \rho(\mathbf{r}) \ r_{m} r_{n}}{\int d\mathbf{r} \ \rho(\mathbf{r})}
</math>
 
where <math>\rho(\mathbf{r})</math> represents the number density of particles at position <math>\mathbf{r}</math>.
 
Although they have different units, the gyration tensor is related to the
[[moments of inertia|moment of inertia tensor]].  The key difference is that the particle positions are weighted by [[mass]] in the inertia tensor, whereas the gyration tensor depends only on the particle positions; mass plays no role in defining the gyration tensor.  Thus, the gyration tensor would be proportional to the inertial tensor if all the particle masses were identical.
 
==Diagonalization==
 
Since the gyration tensor is a symmetric 3x3 [[matrix (mathematics)|matrix]], a [[Cartesian coordinate system]] can be found in which it is diagonal
 
:<math>
\mathbf{S} = \begin{bmatrix}
\lambda_{x}^{2} & 0 & 0 \\
0 & \lambda_{y}^{2} & 0 \\
0 & 0 & \lambda_{z}^{2}
\end{bmatrix}
</math>
 
where the axes are chosen such that the diagonal elements are ordered <math>\lambda_{x}^{2} \leq \lambda_{y}^{2} \leq \lambda_{z}^{2}</math>. 
These diagonal elements are called the '''principal moments''' of the gyration tensor.
 
==Shape descriptors==
 
The principal moments can be combined to give several parameters that describe the distribution of particles.  The squared [[radius of gyration]] is the sum of the principal moments
 
:<math>
R_{g}^{2} = \lambda_{x}^{2} + \lambda_{y}^{2} + \lambda_{z}^{2}
</math>
 
The [[asphericity]] <math>b</math> is defined by
 
:<math>
b \ \stackrel{\mathrm{def}}{=}\ \lambda_{z}^{2} - \frac{1}{2} \left( \lambda_{x}^{2} + \lambda_{y}^{2} \right) = \frac{3}{2} \lambda_{z}^{2} - \frac{R_{g}^{2}}{2}
</math>
 
which is always non-negative and zero only when the three principal moments are equal, λ<sub>x</sub> = λ<sub>y</sub> = λ<sub>z</sub>. This zero condition is met when the distribution of particles is spherically symmetric (hence the name ''asphericity'') but also whenever the particle distribution is symmetric with respect to the three coordinate axes, e.g., when the particles are distributed uniformly on a [[cube]], [[tetrahedron]] or other [[Platonic solid]].
 
Similarly, the [[acylindricity]] <math>c</math> is defined by
 
:<math>
c \ \stackrel{\mathrm{def}}{=}\  \lambda_{x}^{2} - \lambda_{y}^{2}
</math>
 
which is always non-negative and zero only when the two principal moments are equal, λ<sub>x</sub> = λ<sub>y</sub>.
This zero condition is met when the distribution of particles is cylindrically symmetric (hence the name, ''acylindricity''), but also whenever the particle distribution is symmetric with respect to the two coordinate axes, e.g., when the particles are distributed uniformly on a [[prism (geometry)|regular prism]]. 
 
Finally, the [[relative shape anisotropy]] <math>\kappa^{2}</math> is defined
 
:<math>
\kappa^{2} \ \stackrel{\mathrm{def}}{=}\  \frac{b^{2} + (3/4) c^{2}}{R_{g}^{4}} = \frac{3}{2} \frac{\lambda_{x}^{4}+\lambda_{y}^{4}+\lambda_{z}^{4}}{(\lambda_{x}^{2}+\lambda_{y}^{2}+\lambda_{z}^{2})^{2}} - \frac{1}{2}
</math>
 
which is bounded between zero and one. <math>\kappa^{2}</math> = 0 only occurs if all points are spherically symmetric, and <math>\kappa^{2}</math> = 1 only occurs if all points lie on a line.
 
==References==
 
* {{cite book | last = Mattice | first = WL | coauthors = Suter UW | title = Conformational Theory of Large Molecules | publisher = Wiley Interscience | year = 1994}} ISBN 0-471-84338-5
 
* {{cite journal | last = Theodorou | first = DN | coauthors = Suter UW | year = 1985 | title = Shape of Unperturbed Linear Polymers: Polypropylene | journal = Macromolecules | volume = 18 | pages = 1206&ndash;1214 | doi = 10.1021/ma00148a028|bibcode = 1985MaMol..18.1206T | issue = 6 }}
 
[[Category:Polymer physics]]
[[Category:Tensors]]

Revision as of 11:52, 30 January 2014

In physics, the gyration tensor is a tensor that describes the second moments of position of a collection of particles

Smn=def1Ni=1Nrm(i)rn(i)

where rm(i) is the mth Cartesian coordinate of the position vector r(i) of the ith particle. The origin of the coordinate system has been chosen such that

i=1Nr(i)=0

i.e. in the system of the center of mass rCM. Where

rCM=1Ni=1Nr(i)

Another definition, which is mathematically identical but gives an alternative calculation method, is:

Smn=def12N2i=1Nj=1N(rm(i)rm(j))(rn(i)rn(j))

Therefore, the x-y component of the gyration tensor for particles in Cartesian coordinates would be:

Sxy=12N2i=1Nj=1N(xixj)(yiyj)


In the continuum limit,

Smn=defdrρ(r)rmrndrρ(r)

where ρ(r) represents the number density of particles at position r.

Although they have different units, the gyration tensor is related to the moment of inertia tensor. The key difference is that the particle positions are weighted by mass in the inertia tensor, whereas the gyration tensor depends only on the particle positions; mass plays no role in defining the gyration tensor. Thus, the gyration tensor would be proportional to the inertial tensor if all the particle masses were identical.

Diagonalization

Since the gyration tensor is a symmetric 3x3 matrix, a Cartesian coordinate system can be found in which it is diagonal

S=[λx2000λy2000λz2]

where the axes are chosen such that the diagonal elements are ordered λx2λy2λz2. These diagonal elements are called the principal moments of the gyration tensor.

Shape descriptors

The principal moments can be combined to give several parameters that describe the distribution of particles. The squared radius of gyration is the sum of the principal moments

Rg2=λx2+λy2+λz2

The asphericity b is defined by

b=defλz212(λx2+λy2)=32λz2Rg22

which is always non-negative and zero only when the three principal moments are equal, λx = λy = λz. This zero condition is met when the distribution of particles is spherically symmetric (hence the name asphericity) but also whenever the particle distribution is symmetric with respect to the three coordinate axes, e.g., when the particles are distributed uniformly on a cube, tetrahedron or other Platonic solid.

Similarly, the acylindricity c is defined by

c=defλx2λy2

which is always non-negative and zero only when the two principal moments are equal, λx = λy. This zero condition is met when the distribution of particles is cylindrically symmetric (hence the name, acylindricity), but also whenever the particle distribution is symmetric with respect to the two coordinate axes, e.g., when the particles are distributed uniformly on a regular prism.

Finally, the relative shape anisotropy κ2 is defined

κ2=defb2+(3/4)c2Rg4=32λx4+λy4+λz4(λx2+λy2+λz2)212

which is bounded between zero and one. κ2 = 0 only occurs if all points are spherically symmetric, and κ2 = 1 only occurs if all points lie on a line.

References

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