Problem 9. Consider the discrete time dynamical system (a) Determine stability of the origin. (b)...
Problem 4. (Discrete time dynamical system ). Consider the following discrete time dynamical system: Assume xo is given and 0.5 0.5 0.2 0.8 (a) Find eigenvalues of matrix A (b) For each eigenvalue find one eigenvector. (c) Let P be the matrix that has the eigenvectors as its columns. Find P-1 (d) Find P- AP (e) Use the answer from part (d) to find A" and xn-A"xo. (Your answers wl be in terms of n (f) Find xn and limn→ooXn...
Consider the discrete dynamical system given by the expression √1 + √1 + √1 + √1 + ⋯ where the " ⋯ " means the pattern continues forever. (A) Find a recurrence equation that models this pattern. (B) Instead of solving the recurrence equation, build a table of values from the recurrence equation through 10 iterations. (C) Find the nonnegative fixed point of this system and apply the Stability and Oscillation theorem to determine the system’s behavior around the fixed...
27.(a) State and prove Liapunov's theorem for a continuous-time dynamical system. (b) By finding a suitable Liapunov function show that the origin is a stable fixed point for the dynamical system What is the domain of stability? 27.(a) State and prove Liapunov's theorem for a continuous-time dynamical system. (b) By finding a suitable Liapunov function show that the origin is a stable fixed point for the dynamical system What is the domain of stability?
Problem 3. For the following system, (a) compute the eigenvalues, (b) compute the associated eigenvectors, (c) if the eigenvalues are complex, determine if the origin is a spiral sink, a spiral source, or a center; determine the natural period and natural frequency of the oscillations, and determine the direction of the oscillations in the phase plane, (d) sketch the phase portrait for the system; and (e) compute the general solution. ar dY (1 -3 dt Y, Problem 3. For the...
number 12. 2.0. When will the value be between 8. +1 0.0 and 0.2? ider the linear discrete-time dynamical system y 1.0). For each of the following values of m, 1.0+m(),- a. Find the equilibrium. b. Graph and cobweb c. Compare your results with the stability condition. 10. m 1.5. 11, m=-0.5 13-16 IG . The following discrete-time dynamical systems have slope ekactly 1 at the equilibrium. Check this, and then iterate the librum to see 2.0. When will the...
Problem 2: Consider the two-dimensional dynamical system given by F(x, y) = (x2 - y - 1, x + 2y). (a) (8 pts) Find its fixed points and determine their stability. (b) (8 pts) Find any period-2 orbits and determine their stability. If no such orbits exist, prove it.
Intion of ants, do the following, being sure 2. Given the discrete time dynamical system (DTDS) describing a population to show all work A1 = 8A (2 - A), A0 = 1 (a) Find all equilibria. (b) Classify cach equilibrium for its stability using the Stability Criterion
1. (This is problem 5 from the second assignment sheet, reprinted here.) Consider the nonlinear system a. Sketch the ulllines and indicate in your sketch the direction of the vector field in each of the regions b. Linearize the system around the equilibrium point, and use your result to classify the type of the c. Use the information from parts a and b to sketch the phase portrait of the system. 2. Sketch the phase portraits for the following systems...
Closed loop Controller - Dynamical System Consider the following continuous non-linear dynamical system: x1 = (11-2x1)ex1 2(2x1-4x2)e*z The system is driven by the following closed-loop controller: 1. For all values of K, find the equilibrium points of the closed loop system, i.e. find the equilibrium point as K varies between-co and +co 2. Consider the origin of the system. Determine the character of the origin for all values of the parameter K. Determine specifically for what values of K the...
7. Consider the system 1 2 y (a) Show that the origin is a fixed point, and determine its stability (b) Show that the origin is the only fixed point. Hint: Argue using a theorem or result based on properties of the matrix. 7. Consider the system 1 2 y (a) Show that the origin is a fixed point, and determine its stability (b) Show that the origin is the only fixed point. Hint: Argue using a theorem or result...