Difference between revisions of "Figure 2.14: Responses of the systems with integral feedback"

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Figure 2.14: Responses of the systems with integral feedback (${\displaystyle k_{\text{i}}=1000}$). The left figure shows the input/output relationships for the closed loop systems, and the center figure shows responses to the input signal (2.38) (compare to the corresponding responses in Figure 2.12. The right figure shows the individual errors (solid lines) and the approximate error given by equation (2.42) (dashed line).

# figure-2.12,14-static_nlsys.py - static nonlinear feedback system # RMM, 21 Jun 2021 # # Figure 2.12: Responses of a static nonlinear system. The left figure shows # the in- put/output relations of the open loop systems and the right figure # shows responses to the input signal (2.38). The ideal response is shown # with solid bold lines. The nominal response of the nonlinear system is # shown using dashed bold lines and the responses for different parameter # values are shown using thin lines. Notice the large variability in the # responses. # # Figure 2.14: Responses of the systems with integral feedback (ki = # 1000). The left figure shows the input/output relationships for the closed # loop systems, and the center figure shows responses to the input signal # (2.38) (compare to the corresponding responses in Figure 2.12. The right # figure shows the individual errors (solid lines) and the approximate error # given by equation (2.42) (dashed line). # # Intial code contributed by Adam Matic, 26 May 2021. # import numpy as np import matplotlib.pyplot as plt import control as ct # Static nonlinearity def F(u, alpha, beta): return alpha * (u + beta * (u ** 3)) # Reference signal t = np.linspace(0, 6, 300) r = np.sin(t) + np.sin(np.pi * t) + np.sin((np.pi**2) * t) # # Closed loop response # # Create an I/O system representing the static nonlinearity P = ct.NonlinearIOSystem( updfcn=None, outfcn=lambda t, x, u, params: F(u, params['a'], params['b']), inputs=['u'], outputs=['y'], name='P') # Integral controller ki = 1000 C = ct.tf2ss(ct.tf([ki], [1, 0])) # Closed loop system sys = ct.feedback(P * C, 1) # Set up the plots for Figure 2.12 fig, [ax1, ax2, ax3] = plt.subplots(1, 3, figsize=(6, 3)) # Generate the input/output curves and system responses for a in [0.1, 0.2, 0.5]: for b in [0, 0.5, 1, 2]: # Simulate the system dynamics t, y = ct.input_output_response(sys, t, r, params={'a':a, 'b':b}) ax1.plot(r, y, 'r', linewidth=0.5); ax2.plot(t, y, 'r', linewidth=0.5) ax3.plot(t, r-y, 'r', linewidth=0.5) # Left plot labels ax1.set_title("I/O relationships") ax1.set_xlabel("Input $u$") ax1.set_ylabel("Output $y$") # Draw reference line, set axis limits ax1.plot(y, y, 'k-', linewidth=1.5) ax1.set_ylim(-3, 3) ax1.set_xlim(-2.5, 2.5) # Center plot labels ax2.set_title("Output signals") ax2.set_xlabel("Time $t$") ax2.set_ylabel("Output $y$") # Draw reference line, set axis limits ax2.plot(t, r, 'k-', linewidth=1) ax2.set_ylim(-1, 5) ax2.set_xlim(0, 2) # Right plot labels ax3.set_title("Error") ax3.set_xlabel("Time $t$") ax3.set_ylabel("Error $e$") # Draw bounding line, set axis limits rdot = np.diff(r)/(t[1] - t[0]) # Approximation of derivative bmin = 0.1 # See FBS2e, below equation (2.40) ax3.plot(t[:-1], rdot/(bmin * ki), 'b--', linewidth=1.5) ax3.set_xlim(0, 2) plt.tight_layout()