Team:USP-UNESP-Brazil/Associative Memory/Modeling

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{{:Team:USP-UNESP-Brazil/Templates/RImage | image=Phisiguais1.jpg | caption=Fig. 3. Each curve represents the solution of one equation, their intersections being the equilibrium points. One is close to $(0,0)$, the other to $(1,1)$. | size=350px}}
{{:Team:USP-UNESP-Brazil/Templates/RImage | image=Phisiguais1.jpg | caption=Fig. 3. Each curve represents the solution of one equation, their intersections being the equilibrium points. One is close to $(0,0)$, the other to $(1,1)$. | size=350px}}
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Thus, the equilibrium points $(x,y)$ are placed in the intersection between the solutions for the relations above. Depending on the set of parameters, one can find two to four equilibria - the first one close to $(0,0)$, representing the repression of both populations, and the second one close to $(1,1)$, representing the activation of both populations, as presented below:
Thus, the equilibrium points $(x,y)$ are placed in the intersection between the solutions for the relations above. Depending on the set of parameters, one can find two to four equilibria - the first one close to $(0,0)$, representing the repression of both populations, and the second one close to $(1,1)$, representing the activation of both populations, as presented below:
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{{:Team:USP-UNESP-Brazil/Templates/RImage | image=Phis100.jpg | caption=Fig. 4. When $\frac{\phi_A}{\phi_B} \gg 1$, besides the equilibria close to $(0,0)$ and $(1,1)$, there is also a point close to to $(1,0)$. | size=350px}}
{{:Team:USP-UNESP-Brazil/Templates/RImage | image=Phis100.jpg | caption=Fig. 4. When $\frac{\phi_A}{\phi_B} \gg 1$, besides the equilibria close to $(0,0)$ and $(1,1)$, there is also a point close to to $(1,0)$. | size=350px}}
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A third equilibrium point emerges when $\frac{\phi_A}{\phi_B} \gg 1$ - which means the repression of population A over population B is much greater than its counterpart. In this case, the system reaches an equilibrium close to $(1,0)$: population A activated, population B repressed. The behavior is analogous if $\frac{\phi_A}{\phi_B} \ll 1$.
A third equilibrium point emerges when $\frac{\phi_A}{\phi_B} \gg 1$ - which means the repression of population A over population B is much greater than its counterpart. In this case, the system reaches an equilibrium close to $(1,0)$: population A activated, population B repressed. The behavior is analogous if $\frac{\phi_A}{\phi_B} \ll 1$.
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repress each other, depending on the initial conditions: there are equilibria both close to $(1,0)$ and to $(0,1)$ - with repression  
repress each other, depending on the initial conditions: there are equilibria both close to $(1,0)$ and to $(0,1)$ - with repression  
of one population and activation of the other.
of one population and activation of the other.
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<h1 id="discussion">Discussion</h1>
<h1 id="discussion">Discussion</h1>
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<h1 id="references">References</h1>
<h1 id="references">References</h1>

Revision as of 21:34, 26 September 2012