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Stochastic modeling of
molecular reaction networks
Daniel Forger
University of Michigan
Let’s begin with a simple
genetic network
We can list the basic reaction
rates and stochiometry
numsites = total # of sites on a gene, G = # sites bound
M = mRNA, Po = unmodified protein, Pt = modified protein
Transcription
Translation
Protein Modification
M degradation
Po degradation
Pt degradation
Binding to DNA
Unbinding to DNA
trans or 0
tl*M
conv*Po
degM*M
degPo*Po
degPt*Pt
bin(numsites - G)*Pt
unbin*G
+M
+Po
-Po, +Pt
-M
-Po
-Pt
-Pt, +G
-G
We normally track concentration
Let’s track # molecules instead
• Let M, Po, Pt be # molecules
• First order rate constants (tl, unbin, conv,
degM, degPo and degPt) have units 1/time
and stay constant
• Zero order rate constant (trans) has units
conc/time, so multiply it by volume
• 2nd order rate constant (bin) has units
1/(conc*time), so divide it by volume
numsites = total # of sites on a gene, G = # sites bound
M = mRNA, Po = unmodified protein, Pt = modified protein
V = Volume
Transcription
Translation
Protein Modification
M degradation
Po degradation
Pt degradation
Binding to DNA
Unbinding to DNA
trans*V or 0
tl*M
conv*Po
degM*M
degPo*Po
degPt*Pt
bin/V(numsites - G)*Pt
unbin*G
+M
+Po
-Po, +Pt
-M
-Po
-Pt
-Pt, +G
-G
How would you simulate this?
• Choose which reaction happens next
– Find next reaction
– Update species by stochiometry of next
reaction
– Find time to this next reaction
How to find the next reaction
• Choose randomly based on their
reaction rates
trans*V
tl*M
conv*Po
degM*M degPo*Po degPt*Pt
Random #
unbin*G
bin/V(numsites - G)*Pt
Now that we know the next
reaction modifies the protein
• Po = Po - 1
• Pt = Pt + 1
• How much time has elapsed
– a0 = sum of reaction rates
– r0 = random # between 0 and 1

1 1
ln  
a0  r0 
This method goes by many
names
• Computational Biologists typically call
this the Gillespie Method
– Gillespie also has another method
• Material Scientists typically call this
Kinetic Monte Carlo
Myth 1:
“Mass Action Formulations do
not account for Stochasticity”
Consider a simple model
inspired by the circadian clock
in Cyanobacteria
A
B
C
A
B
C
• Here a protein can be in 3 states, A, B
or C
• We start the system with 100 molecules
of A
• Assume all rates are 1, and that
reactions occur without randomness (it
takes one time unit to go from A to B,
etc.)
Mass Action Representation
dA
dB
dC
 C  A,
 A  B,
 BC
dt
dt
dt
Matlab simulation
Mass Action represents a
limiting case of Stochastics
• Mass action and stochastic simulations
should agree when certain “limits” are
obtained
• Mass action typically represents the
expected concentrations of chemical
species (more later)
Myth 2:
Stochastic and Mass Action
Approaches agree only if
there are enough molecules
What matters is the number of
reactions
• This is particularly important for
reversible reactions
• By the central limit theorem, fluctuations
dissapear like n-1/2
• There are almost always a very limited
number of genes,
– Ok if fast binding and unbinding
There are several
representations in between
Mass Action and Gillespie
•
•
•
•
Chemical Langevin Equations
Master Equations
Fokker-Planck
Moment descriptions
We will illustrate this with an example
Kepler and Elston Biophysical Journal 81:3116
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Master Equations describe
how the probability of being in
each state
dpm0
0
 Kk0  m   0  pm0  Kk1 p1m   (m  1) pm0 1   0 pm1
dt
dp1m
 Kk1  m  1  p1m  Kk0 pm0   (m  1) p1m 1  1 p1m1
dt

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Sometimes we can solve for
the mean and variance
moments  m j
s
  m j pms
m
at steady state
mean 
 0 k1  1k 0

 0  1  
var iance  mean  k 0 k1

     K
2
Distribution of molecules
often looks Gaussian
Moment Descriptions
• Gaussian Random Variables are fully
characterized by their mean and
standard deviation
• We can write down odes for the mean
and standard deviation of each variable
• However, for bimolecular reactions, we
need to know the correlations between
variables (potentially N2)
Towards Fokker Planck
• Let’s divide the master equation by the
mean m*.
• Although this equation described many
states, we can smooth the states to
make a probability distribution function
pms (t) 
(m 1/ 2)/ m *
 dxp (x,t)
s
(m1/ 2)/ m
*
Note
1
x

 1 j
1 
1
j
m*
psx  *    x  ps (x) *   e
ps (x)
 m  j j!
m 
If 1/m* is small, we can then derive a simplifed
Version of the Master equations


 1 2 s



t ps (x)   x  s*  x ps (x)



x
p
(x)


 K[ksˆ psˆ (x)  k s ps (x)]
* x 


 *
 s
 m

 2m
 m

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Chemical Langevin Equations
• If we don’t want the whole probability
distribution, we can sometimes derive a
stochastic differential equation to
generate a sample
dX
 A(X)  B(X) (t)
dt
Adalsteinsson et al. BMC Bioinformatics 5:24
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Examples
•
•
•
•
Transcription Control
Lac Operon
Oscillations
Accounting for diffusion
Rossi et al.
Molecular Cell
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Ozbudak et al. Nature 427:737
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Guantes and Poyatos PLoS Computational Biology 2:e30
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SNIC Bifurcation
Invariant Circle
Saddle-Node on an
Invariant Circle
SNIC
saddle
max
Limit Cycle
x2
node
min
p1
Hopf Bifurcation
stable
limit cycle
max
slc
x2
uss
sss
min
p1
Noise Induced oscillations
Liu et al. Cell 129:605
3-D Gillespie
http://www.math.utah.edu/~isaacson/3dmodel.html