Team:Sweden/Mathematical Modelling

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Contents

The Linguistic Cell


Model Structure.

How the model works described in words

Several problems needed to be taken care of when implementing a biological model.

  • Repeated input (e.g. det det adj)
  • Wrong input (e.g. det adj det)

For the repeatedly inputting the same PoS we used a counter (with courtesy of ETH iGEM 2005) which counts how many times an input occurs in a row. It uses an interval state and an intermediate input to move the automaton from one state to the other. For the wrong input we set inhibitions in the model in a specific way. so, the interval states (I1-I5 in the figure) only get activated by the interval input X0 and they inhibit all the other interval states. Interval states are also inhibiting some of the S-states, depending on what can be the next correct input.

For example, if I2 is activate it inhibits S1, S4 and S5 from the S-states. This is because we can get a correct input from X2 (which corresponds to a adj) and X3 (which corresponds to a N).

As for the errors, they are inhibited like the S-states from the I-states just reversed. For example, we are again in I2. Then only the error signals from input X2 and X3 are inhibited, meaning these inputs will NOT send an error signal.

Next example, we finish a sentence with an stop siganl (input X5). Right now I5 is active and the only X5 activates S5 to send the "right" signal.

Let's take another example. This time let's assume we are in an active S2 state. Since after every input we make there is an interval input, X0 is inputted. What happens now? X0 activates all I-states. But S2 inhibits all EXCEPT I3. So the system has to move there. Here we can check real quick if the sensing repeated input mechanism works. Let's input another X2 (which would correspond to and adj and would in a correct sentence activate S2) But we are not in I2, so the system in I3 cannot activate S2 beacuse it is inhibited by I3. Instead the error 2, which is not inhibited by I3 but activated by X2. So here we get an error response and our repeated input mechanism works.

The boring theory

Several assumptions have been made to make the model work the way we want it to.

  • I1 is always active at t=0, meaning that every sentence begins with an intermediate input to activate I1.
  • The strength of every inhibition is the same.
  • We introduce a stop signal, so we know when a sentence is finished

We used ODEs to model the system. ODEs are used for describing how a system changes over time. In general, our ODEs look like this:

      State i = synthesis * (every incoming activation and repression) – degradation of i

For activation and repression we used a hill function:

          act = ((conc*k)^m)/(1+(conc*k)^m),

where k is the responsible for when the activation occurs and m for how fast it is. so the hill function tells you how long it takes for a protein to be synthesized and if it is synthesized how fast it is done. The repression is simply

             rep = 1 – act

This way we set up a model as in the figure. This model does not represent the full automaton, but only the first four states.

Dydt-1.gif

The full model

here are links to the ODE model in Matlab.

act.m

This is the activation function.

                                        Activation 

rep.m

This is the repression function.

                                               Repression

FSA_ODE_full.m

This is the ODE function.

    link to FSA_ODE_full.m

main.m

This is the main program. If run, you can choose which PoS to input. The program aborts immediately if you have a wrong input otherwise it will only stop with a stop-input. Correct sentences are according to the following rules.

  • S --> NP VP
  • NP --> (det)(adj) N
  • VP --> V (NP)


     link to main.m