What Are the Fixed Points and Stability of the Tent-Map?

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SUMMARY

The discussion focuses on the tent-map defined by the function g(x) = 2x for 0 ≤ x ≤ 1/2 and g(x) = 2 - 2x for 1/2 < x ≤ 1. The fixed points identified are x = 0 and x = 2/3, both of which are unstable, as confirmed by a cobweb plot. Additionally, the period-2 orbits include x = 0, x = 2/3, x = 2/5, and x = 4/5, with stability calculations aligning with the definitions used in part a). The discussion concludes that all periodic orbits of the tent-map are unstable.

PREREQUISITES
  • Understanding of dynamical systems and fixed points
  • Familiarity with cobweb plots for visualizing stability
  • Knowledge of periodic orbits in mathematical functions
  • Basic calculus for stability analysis
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  • Study the concept of stability in dynamical systems
  • Learn how to construct and interpret cobweb plots
  • Explore the implications of periodic orbits in nonlinear maps
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Homework Statement


The "tent-map" is given by: xn+1 = g(xn) where g(x) = 2x if 0 <= x<= 1/2 and g(x) = 2-2x if 1/2 < x <= 1
a) Find the fixed points and their stability. Draw a cobweb plot of the tent map to demonstrate that your stability calculations are correct.
b) Find a period-2 orbit, and compute its stability.
c) It can be shown that the tent-map has period-n orbits for all n \in N. Without doing any calculations explain why all of these periodic orbits must be unstable.


Homework Equations





The Attempt at a Solution


Done a). Got x = 0 and x = 2/3, both unstable and this is shown in the cobweb plot.
For b) I do xn+2 = xn and got 4 period-2 points, x = 0, x = 2/3, x = 4/7, x = 2/7, but I don't think these are right and how do you compute stability for these.
For c) Not too sure what they are asking here, it's not som obvious to me.
Any help on b) and c) would be great.
 
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Your period 2 points are correct.
Now, how did you define stability for such a points?
 
Is it just the same in as in part a)?
 
I now get x = 0, 2/3, 2/5 and 4/5 as my period-2 orbits.
 

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