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A Primer in Bifurcation Theory for Computational Cell Biologists Lecture 2 John J. Tyson Virginia Polytechnic Institute & Virginia Bioinformatics Institute.

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Presentation on theme: "A Primer in Bifurcation Theory for Computational Cell Biologists Lecture 2 John J. Tyson Virginia Polytechnic Institute & Virginia Bioinformatics Institute."— Presentation transcript:

1 A Primer in Bifurcation Theory for Computational Cell Biologists Lecture 2 John J. Tyson Virginia Polytechnic Institute & Virginia Bioinformatics Institute http://www.biology.vt.edu/faculty/tyson/lectures.php Click on icon to start audio

2 Computational Cell Biology Molec Genetics Biochemistry Cell Biology Kinetic Equations Molecular Mechanism The Curse of Parameter Space

3 The Dynamical Perspective Molec Genetics Biochemistry Cell Biology Kinetic Equations State Space, Vector Field Attractors, Transients, Repellors Bifurcation Diagrams Molecular Mechanism Signal-Response Curves

4 Wee1 Cdc25 MPF response (MPF) signal (cyclin) interphase metaphase SN

5 Saddle-Node (bistability, hysteresis) Hopf Bifurcation (oscillations) Subcritical Hopf Cyclic Fold Saddle-Loop Saddle-Node Invariant Circle Signal-Response Curve = One-parameter Bifurcation Diagram Rene Thom

6 Stability Analysis of Steady States …at a steady state (x o, y o ). Expand using Taylor’s Theorem: = 0 =   =  

7 Jacobian Matrix The solution is… where… are called the eigenvalues and eigenvectors of the Jacobian matrix.

8 The eigenvalues are solutions of the “characteristic” equation: tr(J)det(J)

9 tr(J) det(J) Saddle-Node bifurcation at det(J) = 0   2    2    2  Re(  Re(  saddle point unstable nodestable nodeunstable focusstable focus Hopf bifurcation at Tr(J) = 0

10 f(x,y;p)=0 g(x,y;p)=0 x y p > p SN p = p SN p < p SN Parameter, p Variable, x node saddle p SN Saddle-Node Bifurcation

11 Numerical Bifurcation Theory Two equations in three unknowns. Fix p = p o ; solve for (x o, y o ). Expand using Taylor’s Theorem: = 0

12 This is perfectly generalizable to any number of variables. As long as With this equation, we can follow a steady state as p changes.

13 A problem arises when which is exactly the case at a saddle-node bifurcation point. Fix: swap x and p. Parameter, p Variable, x SN

14 Two-parameter Bifurcation Diagram Three equations in four unknowns. Fix p = p o ; solve for (x o, y o, q o ). Follow the solution using… Parameter, p Parameter, q three ss one ss D = det(J)

15 Actually, AUTO does not try to solve det(J) = 0. That’s too hard. Instead, AUTO solves the following equations:

16 References Strogatz, Nonlinear Dynamics and Chaos (Addison Wesley) Kuznetsov, Elements of Applied Bifurcation Theory (Springer) XPP-AUT www.math.pitt.edu/~bard/xppwww.math.pitt.edu/~bard/xpp Oscill8 http://oscill8.sourceforge.nethttp://oscill8.sourceforge.net

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