Mean Squared Displacement: Difference between revisions
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Finding the MSD of the simulation is ([http://en.wikipedia.org/wiki/Mean_squared_displacement a trivial task]) using a Matlab toolbox (see video below). The target extrasynaptic MSD was '''0.1 <sup>µm²</sup>⁄<sub>s</sub>''' (from Choquet {{Fig|[[File:ChoquetDiffusionRate1.png]]}}). Scaling the model PSD size and distance between synapses to real-world values based on the target MSD is not a trivial task, and may actually be related only indirectly. Just because a particle moves quickly, does not mean it moves from A to B quickly - it depends on how much stuff there is to collide with. Linear estimates have shown that glycine receptor movements along dendrites at a speed of 1–2 µm/min (.016-.008 µm/s). | Finding the MSD of the simulation is ([http://en.wikipedia.org/wiki/Mean_squared_displacement a trivial task]) using a Matlab toolbox (see video below). The target extrasynaptic MSD was '''0.1 <sup>µm²</sup>⁄<sub>s</sub>''' (from Choquet {{Fig|[[File:ChoquetDiffusionRate1.png]]}}). Scaling the model PSD size and distance between synapses to real-world values based on the target MSD is not a trivial task, and may actually be related only indirectly. Just because a particle moves quickly, does not mean it moves from A to B quickly - it depends on how much stuff there is to collide with. Linear estimates have shown that glycine receptor movements along dendrites at a speed of 1–2 µm/min (.016-.008 µm/s). | ||
First, the randomly generated step-size was scaled to produce an MSD of '''0.1 <sup>units²</sup>⁄<sub>step</sub>''' using the Matlab Brownian motion toolbox. Second, the dimensions of the model need to be scaled. It was found that an XY random step-size of µ{{=}}0.4 (σ{{=}}.2) units produced an MSE ≈ '''0.1 <sup>units²</sup>⁄<sub>step</sub>'''. Next, the arbitrary 0.4 units need to be given meaning... | |||
Given movements along dendrites at a speed of 1–2 µm/min (.016-.008 µm/s) observation, we can use a derivation of the MSD equation to help scale the model. The root-mean-square distance after N unit steps, with a step length of (L) is: | |||
* d {{=}} L*sqrt(N) | |||
In order to travel a distance d, N steps are required by this equation | |||
* N {{=}} (d/L)² | |||
* N {{=}} (1000 nm /400 nm)² {{=}} 6.25 | |||
* N {{=}} (2000 nm /400 nm)² {{=}} 25 | |||
* Lets say a particle is traveling linearly at a rate of 1 µm / 100 s | |||
* And takes between 6-25 steps to cover 1-2 µm. | |||
Revision as of 03:26, 5 August 2013
Finding the MSD of the simulation is (a trivial task) using a Matlab toolbox (see video below). The target extrasynaptic MSD was 0.1 µm²⁄s (from Choquet FIG: {{#info: 
{{{2}}} CLICK AWAY FROM IMAGE TO CLOSE }}). Scaling the model PSD size and distance between synapses to real-world values based on the target MSD is not a trivial task, and may actually be related only indirectly. Just because a particle moves quickly, does not mean it moves from A to B quickly - it depends on how much stuff there is to collide with. Linear estimates have shown that glycine receptor movements along dendrites at a speed of 1–2 µm/min (.016-.008 µm/s).
First, the randomly generated step-size was scaled to produce an MSD of 0.1 units²⁄step using the Matlab Brownian motion toolbox. Second, the dimensions of the model need to be scaled. It was found that an XY random step-size of µ=0.4 (σ=.2) units produced an MSE ≈ 0.1 units²⁄step. Next, the arbitrary 0.4 units need to be given meaning...
Given movements along dendrites at a speed of 1–2 µm/min (.016-.008 µm/s) observation, we can use a derivation of the MSD equation to help scale the model. The root-mean-square distance after N unit steps, with a step length of (L) is:
- d = L*sqrt(N)
In order to travel a distance d, N steps are required by this equation
- N = (d/L)²
- N = (1000 nm /400 nm)² = 6.25
- N = (2000 nm /400 nm)² = 25
- Lets say a particle is traveling linearly at a rate of 1 µm / 100 s
- And takes between 6-25 steps to cover 1-2 µm.
here are two good resources explaining MSD:
VIDEO
{{{2}}}
MEAN SQUARED DISPLACEMENT
- Brownian Motion Mean Squared Displacement
- The goal of this calculation is to relate the simulated particle diffusion to real world values, namely velocity.
- Particle velocity will be a function of MSD x units ²⁄s which scales on space (units) and time (s) parameters.
- Space and time in the model are defined arbitrarily as Step_Size and Step where each Step a particle moves a distance randomly chosen from a normal distribution (µ=1,σ=.2)
- a step size of 1 unit/step will produce a brownian motion MSD of ~0.52 ±0.2 units ²/s
- empirical observations show that reasonable values for MSD are:
- PSD 0.01 µm ²/s
- synaptic 0.05 µm ²/s
- extrasynaptic 0.1 µm ²/s
- given an MSD of 0.52 ±0.2 units ²/s at the current parameters: 1 step = 1 unit (at µ=1,σ=.2), the model will need to be scaled such that particles move at an extrasynaptic rate of 0.1 µm ²/s.
- spines are on average 1 to 10 µm apart, if the model is comparing two spines 1 µm apart, they should be separated by 5 units of model space. This is because the current particle diffusion rate of the model is .5 µm ²/s and the empirical MSD is .1 µm ²/s
to make 0.1 units²⁄step ≈ 0.1 µm²⁄s. It was found that an XY random step-size of µ=0.4 (σ=.2) units produced an MSE ≈ 0.1 units²⁄step. Then, the arbitrary 0.5 units were given meaning (converted to 0.5 µm) by scaling the model according to real-world values (see below) by making 1 unit = 1 µm; as a convention, a subunit will be 1/10th of a unit, thus 1 subunit = 0.1 µm). The PSD areas were set to 3-subunits (.3 µm) square, 20 subunits (2 µm) apart, within a rectangular field 20 subunits (2 µm) wide and 60 subunits (6 µm) long. Given these scaled dimensions where 10 subunits ≈ 1 µm, a particle with an XY step-size of 0.5 units moving in a straight line, could theoretically go from PSD1 to PSD2 in 4 steps (obviously given the simulated particles are moving with Brownian motion, this lower-bound would be extremely rare).
Michalet • 2010 • Phys Rev E Stat Nonlin Soft Matter Phys - PDF
Expand to view experiment summary
We examine the capability of mean square displacement analysis to extract reliable values of the diffusion coefficient D of single particle undergoing Brownian motion in an isotropic medium in the presence of localization uncertainty. The theoretical results, supported by simulations, show that a simple unweighted least square fit of the MSD curve can provide the best estimate of D provided an optimal number of MSD points is used for the fit. We discuss the practical implications of these results for data analysis in single-particle tracking experiments.