Lesson 2 - Stability in Feedback Circuits [Modo de
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(Analog) Electronics II Lesson II Stability of Feedback Amplifiers Guillermo Carpintero – Universidad Carlos III de Madrid Ideal Configuration of a Feedback Amplifier With negative feedback si + + input sε = si - sfb error so A sfb = β· so β feedback A= a 1+ a f Guillermo Carpintero – Universidad Carlos III de Madrid What happens with the frequency response? a( s) A( s ) = 1 + a( s) f ( s) How can we explore the effect of feedback on the frequency response of the amplifier? Does feedback affect it anyway? Guillermo Carpintero – Universidad Carlos III de Madrid Why did we use feedback anyway? At the cost of GAIN REDUCTION, we obtain An amplifier closer to ideal characteristics: • Insensitivity against active component parameter dispersion. • Linear Gain • Input/Output Inpedances However, the circuit has tendency toward . . . . . OSCILLATION. Guillermo Carpintero – Universidad Carlos III de Madrid Oscillation ?????????? What frequency? What amplitude? Why? jω s plane Impulse input 1 s2 +as+b s = σ ± jω σ t υ (t ) = e [e output v(t) jω n t +e σ − jω n t σ t = 2 e cos(ω n t ) ] Guillermo Carpintero – Universidad Carlos III de Madrid Feedback, Poles and Stability 1. One pole system 2. Two pole system 3. More than two poles Guillermo Carpintero – Universidad Carlos III de Madrid Feedback, Poles and Stability Open Loop Gain si a so ● ● ● Open loop amplifiers are always STABLE systems Guillermo Carpintero – Universidad Carlos III de Madrid Feedback, Poles and Stability Case 1. A(s) has one pole Frequency Domain Gray-Meyer K a( s) = 1 − ps1 Sedra-Smith A0 a(s) = 1 + ωsP Time Domain vout + ω P 1 dvout = A0 vin dt Guillermo Carpintero – Universidad Carlos III de Madrid Frequency Domain Time Domain Guillermo Carpintero – Universidad Carlos III de Madrid Feedback, Poles and Stability K A( s ) = 1 + Kf 1 − (1+Aβ)p1 □ 1 s p1 (1 + Kf ) p1 ● unconditionally STABLE Guillermo Carpintero – Universidad Carlos III de Madrid Feedback, Poles and Stability Gain x Bandwidth Product Basic A( s ) = K 1+ K f 1− 1 1 p1 (1 + K f ) Feedback GAIN K K 1+ K f BW p1 p1 (1 + K f ) Guillermo Carpintero – Universidad Carlos III de Madrid Feedback, Poles and Stability Guillermo Carpintero – Universidad Carlos III de Madrid Feedback, Poles and Stability Hints on what happens with higher order systems Case 2. a(s) has two poles K jω □ p2 p1 ● ● □ unconditionally STABLE Guillermo Carpintero – Universidad Carlos III de Madrid σ Feedback, Poles and Stability jω Case 3. a(s) more than two poles σ System can become unstable, depending on f strength. Guillermo Carpintero – Universidad Carlos III de Madrid Origin of the instability Guillermo Carpintero – Universidad Carlos III de Madrid Origin of the instability IF feedback can turn our system unstable . . . . . . . means that poles of a(s) are not the poles of A(s) a( s) A( s ) = 1 + a( s) f ( s) 1 + a(s)f = 0 characteristic equation L(s) a ( jω ) A( jω ) = 1 + a ( jω ) f 1 + a(jω)f = 0 1 + | a(jω)f |ejφ(ω) = 0 Guillermo Carpintero – Universidad Carlos III de Madrid Origin of the instability ¿What happens when φ = π? | a(ωπ f | e j π = - | a(ωπ) f | a ( jω ) A( jω ) = 1 − a ( jω ) f What is significant here? ωπ Guillermo Carpintero – Universidad Carlos III de Madrid Be careful with it !!!! Origin of the instability Phase change in the loop gain Aβ has influence in the type of feedback of the amplifier : •β<1 • Aβ is always positive + A + - 180º sε and sfb are in phase β . . . . . thus the comparator SUBSTRACTS Guillermo Carpintero – Universidad Carlos III de Madrid Origin of the instability At ωπ : • It is no longer true that Aβ es positive + -A + - 360º β POSITIVE feedback Guillermo Carpintero – Universidad Carlos III de Madrid Origin of the instability • We have clear out the OSCILATION FREQUENCY. • How about the conditions for oscillation, . . . Why does it depend on f ? Guillermo Carpintero – Universidad Carlos III de Madrid Origin of the instability a(ωπ) f < 1 -a β -a β a(ωπ) f > 1 Guillermo Carpintero – Universidad Carlos III de Madrid Tools to analyze the stability of feedback amplifiers Guillermo Carpintero – Universidad Carlos III de Madrid Tools to analyze the stability . . . The secret is within the LOOP GAIN, a(s) f a(jω) f | a(jω) f | ejφ(ω) ωπ a(ωπ) f > 1 Guillermo Carpintero – Universidad Carlos III de Madrid Tools to analyze the stability . . . Starting point . . . . The frequency response of the BASIC AMPLIFIER Guillermo Carpintero – Universidad Carlos III de Madrid Tools to analyze the stability . . . Nyquist diagram Polar representation of a(jω)f Stable? . . .or not? Guillermo Carpintero – Universidad Carlos III de Madrid Tools to analyze the stability . . . Criteria for stability in the Nyquist diagram |Aβ|=1 PM 180 – Φ0 GM Guillermo Carpintero – Universidad Carlos III de Madrid Tools to analyze the stability . . . a(jω)f in the Bode plot 20 log10(a(jω)f ) = 20 log10 [a(jω)] + 20 log10 [ f ] = = 20 log10 [a(jω)] - 20 log10 [ 1/ f ] = = 20 log10 [a(jω)] - 20 log10( A ) (feedback network is resistive and presents a flat frequency response) Guillermo Carpintero – Universidad Carlos III de Madrid Tools to analyze the stability . . . Two basic reference frequencies, a(f) Φ(f) f0 a0 fπ aπ Φ0 Φπ donde, a0 Φπ PM = 180º + Φ0 GM = G - aπ Guillermo Carpintero – Universidad Carlos III de Madrid = A ( =1/f ) = -180 Tools to analyze the stability . . . Guillermo Carpintero – Universidad Carlos III de Madrid Tools to analyze the stability . . . The importance of the Phase Margin, For ω0 Af (jω0) = a(jω0) 1+a(jω0) f (1/ f ) e− jθ0 = 1 + e− jθ0 en las que θ0 = 180 - PM A f ( jω 0 ) = (1 / f ) 1 + e − jθ 0 Guillermo Carpintero – Universidad Carlos III de Madrid Compensation Guillermo Carpintero – Universidad Carlos III de Madrid Compensation Tools to control the gain/phase margins Modify the BASIC AMPLIFIER freq. response a(s), by: • DOMINANT POLE: Place a new pole at LF • POLE-ZERO: Place a new pole at LF and cancel lowest frequency pole of basic amplifier with a new zero. AIM: Keep the phase change in the loop below -180º at all frequencies where the loop gain is greater that unity (UNITY GAIN COMPENSATION) Guillermo Carpintero – Universidad Carlos III de Madrid Compensation Modify the frequency response of the Basic Amplifier Guillermo Carpintero – Universidad Carlos III de Madrid Compensation OP AMP 741 before . . . . ADC = 120 dB Guillermo Carpintero – Universidad Carlos III de Madrid Compensation . . . . and after compensation Guillermo Carpintero – Universidad Carlos III de Madrid Compensation Guillermo Carpintero – Universidad Carlos III de Madrid Compensation Guillermo Carpintero – Universidad Carlos III de Madrid
