Team:LCG-UNAM-Mexico/Modeling

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LCG-UNAM-Mexico:Modeling

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Modeling the system

The objective of our modeling is to accurately describe and predict the behavior of the system and its response given an inducing signal. Also, we aim to better know and understand the  system through the identification of critical parameters and species, and thus be able to obtain the desired dynamics.
Our system is composed of 13 species and 11 coupled biochemical reactions that completely describe it. This can be represented through a set of ordinary differential equations (ODEs). The simulations were done using Simbiology, a package from Matlab.

Iwig 2006

FIG 1: Our system is conformed by two regulation mechanisms. The first mechanism is the one controlled by us through AHL. LuxR and AiiA compete to bind AHL when it enters the cell. AiiA efficiently degrades AHL, while LuxR and AHL form a dimer. This dimer serves as an activator of CI*, which represses RcnA. The second of these mechanisms is the natural regulation of RcnA in response to the intracellular nickel concentration. When there is no nickel inside the cell, RcnR represses RcnA. However, when nickel enters the cell, it forms a dimer with RcnR and changes its conformation so it no longer represses RcnA. RcnA is then free to start pumping Ni out of the cell. We are keeping this because it is damaging to the bacteria to have the pump always on, and otherwise it would need a constant supply of AHL.

Metabolites and enzymes relevant to the model

  1. AiiA
  2. AHL
  3. LuxR
  4. AHL:LuxR
  5. (AHL:LuxR):(AHL:LUXR)
  6. ρcI
  7. CI
  8. CI:CI
  9. ρ
  10. RcnA
  11. Niint
  12. Niext
  13. Unk

Acyl-Homoserine Lactone Lactonase
Acyl-Homoserine Lactone
Transcriptional Activator
Complex formed by AHL and LuxR
Dimer of AHL:LuxR complexes
cI* promoter, inducible by the dimer of AHL:LuxR complexes
λ phage repressor (CI) modified with a LVA tail for quick degradation
Repressor, dimer of CI molecules
rcnA promoter, modified to be repressible by CI:CI
Escherichia coli nickel efflux pump
Intracellular nickel
Extracellular nickel
Unknown nickel import channel



Reactions

You can click on the next image to see a table of our reactions with their kinetics.

Table of biochemical reactions
* The equations are numbered like this because those we had initially defined evolved into this final list throughout the summer. We didn't want to change all references made to these equations so we just adjusted the numbering.

Ordinary Differential Equations

We are taking into account the following set of ODEs, based on the biochemical reactions above. This set accurately and completely describes our model. Please click on the image to see a higher resolution.


Set of ODEs


Assumptions of the model


  1. Once there is nickel in the medium, RcnR no longer participates in the pump’s regulation. If there’s nickel in the medium, we can assume that RcnR is always coupled with a Ni molecule, so it will not be capable of repressing RcnA (The few RcnR molecules in the cell will cause noise, but this will be indistinguishable from the pump’s normal behavior).1
  2. Cell membrane permeability to AHL is not considered inside the model. The model assumes all AHL enters the cell, however the concentration needed in the model to obtain the desired results is changed by us accordingly. 2
  3. All decrease in AHL concentration is due to AiiA. We consider the natural degradation of AHL to be unimportant given the time taken to make the analysis (AHL half-life is long, from 3 to 24 hours). 3
  4. The change in the transcription of cI* is only dependent on AHL concentration. There’s a basal production of cI*, however the change will always be due to the AHL concentration given that production of LuxR is constitutive.
  5. It is a homogeneous system. This means that the coefficients of the equations are constant (so we don’t have compartmentalization).
  6. The quantity of nickel used by the cell is negligible compared to the concentrations in and out of the cell. This means we don’t need to include an equation describing the change in the Ni concentration due to cell consumption in the time used by the experiment.1
  7. The production of RcnR, LuxR and AiiA is constitutive and their concentrations have reached the steady state at the beginning of the experiment.
  8. NikABCDE will not play a role in our model. NikABCDE serves to import nickel to the cell, however it only works in anaerobic conditions and our experiment will be made in aerobic conditions. This therefore implies that the nickel import will only take place by the unknown mechanism, which nonetheless is constant and constitutive.1
References

1.     Iwig JS, Rowe JL and Chivers PT (2006) Nickel homeostasis in Escherichia coli – the rcnR-rcnA efflux pathway and its linkage to NikR function Mol Microbiol 62(1), 252–262.
2.     Tian T and Burrage K (2006) Stochastic models for regulatory networks of the genetic toggle switch Proc Natl Acad Sci 103(22):8372-8377.
3.     Imperial College Team, iGEM 2006 WIKI. The I. CoLi Reporter (http://openwetware.org/wiki/IGEM:IMPERIAL/2006/project/parts/BBa_I13207)

Back to topParameters&KineticsSimulation & Analysis

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Parameters & kinetics


The complete model uses 18 kinetic parameters and 11 biochemical reactions. We got 13 of these parameters researching the literature, and of the other 5 we estimated 2. The remaining 3 we adjusted to the observed results. Reaction kinetics were gotten from the literature, and if no evidence was found then we assumed it to be Law of Mass Action.

1. Degradation of AHL by AiiA

 
AiiA + AHL → AiiA
Kinetics: Michaelis-Menten1,2
Parameters: k1cat = 27.97 s-1      
K1m = 3.723 mM = 224.20427E5 molecules
Flux: Equation 1


2. Complex formation and dissociation between AHL and LuxR

 
AHL + LuxR ↔ AHL:LuxR
Kinetics: Mass Action3
Parameters:

k2 = 10 -5 molecules-1 s-1    
k-2 = 3.33 x 10 -3 s-1  

Flux: Equation 2
Notes:

The complex formation is slow and its dissociation is fast, so with few AHL and LuxR the complex concentration is negligible.


2.1. Dimer formation and dissociation between AHL:LuxR complexes

 
2 AHL:LuxR ↔ (AHL:LuxR):(AHL:LuxR)
Kinetics: Mass Action3
Parameters:

k2.1 = 10 -5 molecules-1 s-1    
k-2.1 = 10 -2 s-1  

Flux: Equation 2.1


3.1. CI synthesis induced by AHL and LuxR complexes dimer

 
ρcI + (AHL:LuxR):(AHL:LuxR) → ρcI + (AHL:LuxR):(AHL:LuxR) + CI
Kinetics: Mass Action3
Parameters:

k3on = 10 -2 molecules-1 s-1      

Flux: Equation 3.1


3.2. Constitutive CI synthesis

 
ρcI → ρcI + CI
Kinetics: Mass Action3
Parameters:

k3off = 4 x 10 -2 s-1      

Flux: Equation 3.2
Notes:
To give more stability to the off state in the model, the rate constant in the presence of the inducer is lower than the constitutive rate constant, regardless the implication of a greater threshold to achieve the on state3.


4. Natural degradation of CI

 
CI → Ø
Kinetics: Mass Action3
Parameters:

k4 = 0.002888 s-1      

Flux: Equation 4
Notes:
The half life of CI with LAA tail is 4 minutes8. Andersen JB et al.9 conclude that LAA tail and LVA tail modified the half life of GFP in a similar extent. Given this value, the rate constant was calculated.


4.1. Dimer formation and dissociation between CI molecules

 
2 CI ↔ CI:CI
Kinetics: Mass Action3
Parameters:

k4.1 = 0.00001 molecules-1 s-1
k-4.1 = 0.01 s-1

Flux: Equation 4.1
Notes:
Kenneth et al. estimated the change in free Gibbs energy in this reaction (with wildtype CI) as -11.1 kcal/mol,10 which leads to an equilibrium constant of 8.32186E16 molecules-1. This implies that the forward rate constant should be at least sixteen orders of magnitude greater than the reverse rate constant, which means a constant repression of RcnA even with the constitutive CI synthesis. A parameter scan was run to determine the range of values that gives the desired behavior and the rate constants were chosen arbitrarily within this range. These values are comparable to others typical biochemical parameters. It has been shown that kinetic parameters can be modified by changing amino acid sequences (for example, CI half life is reduced by adding a LVA tail in the C-terminal), it’s proposed that it’s possible to engineer the protein to reach an acceptable dissociation constant.


6. RcnA production

 
ρ → ρ + RcnA
Kinetics: Cooperative inhibition (Hill kinetics)4,5,6,7
Parameters:

n5 =1.9





Flux: Equation 6
Notes:
ΔGCI:CI-OR1=-11.6 kcal/mol
ΔGCI:CI-OR2=-10.1 kcal/mol
ΔGCI:CI-OR1-OR2=-23.8 kcal/mol
ν6(Pl)=20mM/h=3346.111 molecules/s with 20 promoter copies (ρ0)7.
The promoter in our construction is Pr, which is similar to Pl, the one used to estimated the parameter7.


7. Nickel efflux by RcnA

 
RcnA + Niint → RcnA + Niext
Kinetics: Mass Action3
Parameters:

k7 = ?

Flux:
Notes:
Experimentally measured.


8. Natural degradation of RcnA

 
RcnA → Ø
Kinetics: Mass Action3
Parameters:

k8 = 1.666E-4 s-1

Flux:
Notes:
This kinetic parameter wasn’t found in our bibliographic search and personal communication with Peter T. Chivers (Washington University School of Medicine) confirmed that this parameter is unknown. The value used is the degradation rate of LacY, the lactose permease of E. coli, which is also a transmembran protein.11


9. Nickel import by unknown channel

 
Unk + Niext → Unk + Niint
Kinetics: Mass Action3
Parameters:

k9 = ?

Flux:
Notes:
Experimentally measured

NOTE: The average volume of an E. coli cell is 10-15 liters.

 

Defining the initial state of the system

The initial concentrations of the constitutive proteins (AiiA, LuxR, CI -constitutive synthesis- and CI:CI -due to constitutive synthesis-) were estimated based on the efficiency rate of their promoters, number of promoters per cell, degradation rate of their mRNAs, translation efficiency and degradation rate of the proteins. Initial concentrations of AHL:LuxR complex, the dimer of complexes, CI and CI:CI due to complex activation were set to 0, given these are all due to the action of AHL. Number of copies of both cI and rcnA promoters are 10 based on plasmid copy number. RcnA and Unk were estimated experimentally and set consistent to the observed rate. Concentration of AHL and nickel is determined by us to obtain the desired results.

AHL: It’s an arbitrary and adjustable value. Different outcomes can be observed manipulating this initial value.

Nickel (total):
It’s an arbitrary and adjustable value. Different outcomes can be observed manipulating this initial value.

Unk:
Both the Unk concentration and its rate constant are unknown. They are arbitrarily defined in such a way that the flux of the reaction 9 is consistent with experimental measurements.
     [Unk]= (SLOPE) molecules

Niint:
The initial concentration of Nickel inside the cell is estimated based on experimental measurements in absence of AHL.
     [Niint]= (SLOPE) molecules

ρ and ρCI:
Their concentration is defined by the copy number of the plasmids that contain them.
    [ρ]= 10 molecules
    [ρcI]= 10 molecules

CI and CI:CI:
Given the constitutive synthesis and degradation rate of CI, as well as its dimerization constant, CI and CI:CI concentrations are estimated in absence of AHL.
    [CI]= 138 molecules
    [CI:CI]= 19 molecules

RcnA:
Given the synthesis and degradation rate of RcnA, as well as the constitutive concentration of CI:CI, RcnA concentration is estimated in absence of AHL.
    [RcnA]= 33150 molecules

AiiA:
The constant concentration of AiiA is calculated taking into account the following parameters retrieved from literature:
         - pLac average transcription rate1,2: 0.003 s-1
         - mRNA average degradation rate1,3: 0.00766 s-1
         - Average translation rate1,3: 0.31333 s-1
         - AiiA degration rate: 0.00012 s-1
The half life of RcnA with LVA tail is approximately 2 minutes14; Andersen JB et al. found that this tail reduces the half life of GFP forty-eight times.9 Therefore the half life of wildtype AiiA can be estimated to 96 minutes.
    [AiiA]= 10000 molecules

LuxR:
The constant concentration of LuxR is calculated taking into account the following parameters retrieved from literature:
        - pTet average transcription rate12,15: 0.003 s-1
        - mRNA average degradation rate13: 0.00766 s-1
        - LuxR translation rate16: 0.556 s-1
        - LuxR degration rate16: 9.627E-5 s-1
    [LuxR]= 22000 molecules

References
1.     Wang LH et al. (2004) Specificity and Enzyme Kinetics of the Quorum-quenching N-Acyl Homoserine Lactone Lactonase (AHL-Lactonase). J Biol Chem 279:4, 13645-13651.
2.     Hee Kim et al. (2005) The molecular structure and catalytic mechanism of a quorum-quenching N-acyl-L-homoserine lactone hydrolase. Proc Natl Acad Sci USA 102:49, 17606-17611.
3.     Goryachev AB, Toh DJ, Lee T (2006). Systems analysis of a quorum sensing network: Design constraints imposed by the functional requirements, network topology and kinetic constants. Biosystems 83, 178-187. 4.     Babic AC, Little JW (2007) Cooperative binding by CI repressor is dispensable in a phage λ variant. Proc Natl Acad Sci USA 104: 17741-17746.
5.     Ackers GK, Johnson AD, Shea MA (1982). Quantitative model for gene regulation by λ phage repressor.Proc Natl Acad Sci USA 79: 1129-1133.
6.     Reinitz J, Vaisnys JR (1990) Theoretical and Experimental Analysis of the Phage Lambda Genetic Switch Implies Missing Levels of Co-operativity. J Theor Biol 145: 295-318.
7.     Iadevaia S, Mantzaris NV (2006) Genetic Network Driven Control of PHBV Copolymer Composition. J Biotechnol 122: 99-121.
8.     Elowitz MB & Leibler S (2000). A synthetic oscillatory network of transcriptional regulators. Nature 403 335-338.
9.     Andersen JB et al (1998). New Unstable of Green Fluorescent Protein for Studies of Transient Gene Expression in Bacteria. Appl Environ Microbiol 64,6: 2240-2246.
10.   Kenneth S. Koblan and Gary K. Ackers (1991) Energetics of Subunit Dimerization in Bacteriophage λ cI Repressor: Linkage to Protons, Temperature, and KCl. Biochemistry 1991, 30, 7817-7821.
11.   M. Santillán and M. C. Mackey (2004). Influence of catabolite repression and inducer exclusion on the bistable behavior of the lac operon. Biophys J. 86: 1282-1292
12.   Malan, T. P., A. Kolb, H. Buc, and W. R. McClure (1984). Mechanism of CRP-cAMP activation of lac operon transcription initiation activation of the P1 promoter. J. Mol. Biol. 180:881–909.
13.   Kennell, D., and H. Riezman (1977). Transcription and translation initiation frequencies of the Escherichia coli lac operon. J. Mol. Biol. 114:1–21.
14.   Christopher Batten. Modeling the Lux/AiiA Relaxation Oscillator. Unpublished (http://www.mit.edu/~cbatten/work/ssbc04/modeling-ssbc04.pdf).
15.   Bologna Cesena Campus, iGEM 2007 WIKI. (http://parts.mit.edu/igem07/index.php/Bologna)
16.   KULeuven team, iGEM 2008 WIKI. Dr. Coli, the bacterial drug delivery system. (https://2008.igem.org/Team:KULeuven/Model/CellDeath)

Back to topModeling the systemSimulation&Analysis
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Simulation & Analysis
 


With the aim of predicting the behavior of the system, the biochemical reactions were implemented in the SimBiology package of MATLAB, using the previously defined parameters (link a parameters and kinetics). Simulations were run for different values of the initial concentration of AHL and Nitotal (Niint + Niext) which are the metabolites that we can directly manipulate in our experiments. A parameter scan was also run for some parameters to understand their influence on the system.
In order to gain insights into the system dynamics to elucidate the conditions needed to get the desired behavior, we performed a series of analysis on it: sensitivity analysis allowed us to identify critical parameters that needed to be defined on the most stringent way. Basis for the (right) null and left null space were calculated to obtain information about the general network behavior. Steady-states were calculated by numerical integration of the non-linear ODEs system. Finally the Jacobian of the system was calculated around the steady-states. All simulations and analysis were implemented and performed on MATLAB.

Simulation and parameter scan

Describir el comportamiento que queremos ver y por qué.
Incluir las gráficas de parameter scan, la gráfica de la vida, y el escaneo con el que definimos algunas constantes

Sensitivity analysis

Definir brevemente de que se trata, mostrar análisis a diferentes tiempos. Señalar los resultados que esperábamos y los que no

Stoichiometric matrix

Definir la información que contiene la matriz estequimétrica.
Definir los espacios nulos (link a wikipedia o matworld?)
Presentar las bases calculadas y una interpretación concisa

Steady-states

Definir estado estacionario, decir algo de la complejidad del problema y justificar la estrategia elegida (aproximación numérica)

Presentar la solución ontenida.

Jacobian

Definición general del jacobiano (link a wikipedia o mathworld?). Definición en redes bioquímicas.
Presentar el método para calcularlo y las matrices modales, junto con su interpretación y las escalas de tiempo.
Si da tiempo poner algo de análiss de estabilidad del estado estacionario (lo más probable s que no sea estable).

Back to top Modeling the systemParameters & kinetics

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