*edited 6/17/10

I'm trying to understand how to improve my code (make it more pythonic). Also, I'm interested in writing more intuitive 'conditionals' that would describe scenarios that are commonplace in biochemistry. The conditional criteria in the below program I've explained in Answer #2, but I am not satisfied with the code- it works fine, but isn't obvious and isn't easy to implement for more complicated conditional scenarios. Ideas welcome. Comments/criticisms welcome. First posting experience @ stackoverflow- please comment on etiquette if needed.

The code generates a list of values that are the solution to the following exercise:

"In a programming language of your choice, implement Gillespie’s First Reaction Algorithm to study the temporal behaviour of the reaction A--->B in which the transition from A to B can only take place if another compound, C, is present, and where C dynamically interconverts with D, as modelled in the Petri-net below. Assume that there are 100 molecules of A, 1 of C, and no B or D present at the start of the reaction. Set kAB to 0.1 s-1 and both kCD and kDC to 1.0 s-1. Simulate the behaviour of the system over 100 s."

```
def sim():
# Set the rate constants for all transitions
kAB = 0.1
kCD = 1.0
kDC = 1.0
# Set up the initial state
A = 100
B = 0
C = 1
D = 0
# Set the start and end times
t = 0.0
tEnd = 100.0
print "Time\t", "Transition\t", "A\t", "B\t", "C\t", "D"
# Compute the first interval
transition, interval = transitionData(A, B, C, D, kAB, kCD, kDC)
# Loop until the end time is exceded or no transition can fire any more
while t <= tEnd and transition >= 0:
print t, '\t', transition, '\t', A, '\t', B, '\t', C, '\t', D
t += interval
if transition == 0:
A -= 1
B += 1
if transition == 1:
C -= 1
D += 1
if transition == 2:
C += 1
D -= 1
transition, interval = transitionData(A, B, C, D, kAB, kCD, kDC)
def transitionData(A, B, C, D, kAB, kCD, kDC):
""" Returns nTransition, the number of the firing transition (0: A->B,
1: C->D, 2: D->C), and interval, the interval between the time of
the previous transition and that of the current one. """
RAB = kAB * A * C
RCD = kCD * C
RDC = kDC * D
dt = [-1.0, -1.0, -1.0]
if RAB > 0.0:
dt[0] = -math.log(1.0 - random.random())/RAB
if RCD > 0.0:
dt[1] = -math.log(1.0 - random.random())/RCD
if RDC > 0.0:
dt[2] = -math.log(1.0 - random.random())/RDC
interval = 1e36
transition = -1
for n in range(len(dt)):
if dt[n] > 0.0 and dt[n] < interval:
interval = dt[n]
transition = n
return transition, interval
if __name__ == '__main__':
sim()
```

`dt[2]`

is less than 1e36, then the transition will always be equal to 2. I admit that I don't I don't fully understand this sort of simulation, but that parts seems fishy to me. It seems like the`dt`

s should be used in some way as weights to determine randomly which process will go. There is randomness, but it seems like it goes about it the wrong way. – Justin Peel Jun 16 '10 at 14:37sigh. But yeah- the gist of my post was- WTF? I think I'm on the right track though. I'll repost later today. – DocDubya Jun 16 '10 at 18:46