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TPS54232_15 Datasheet, PDF (18/31 Pages) Texas Instruments – TPS54232 2-A, 28-V, 1-MHz, Step-Down DC-DC Converter With Eco-Mode™
TPS54232
SLVS876D – NOVEMBER 2008 – REVISED NOVEMBER 2014
www.ti.com
FZ1 = 1/ (2 ´ p ´ RZ ´ CZ )
(18)
And, the mid-frequency pole is given by Equation 19.
FP1 = 1/ (2 ´ p ´ RZ ´ CP )
(19)
The first step is to choose the closed loop crossover frequency. In general, the closed-loop crossover frequency
should be less than 1/8 of the minimum operating frequency, but for the TPS54232 it is recommended that the
maximum closed loop crossover frequency be not greater than 75 kHz. Next, the required gain and phase boost
of the crossover network needs to be calculated. By definition, the gain of the compensation network must be the
inverse of the gain of the modulator and output filter. For this design example, where the ESR zero is much
higher than the closed loop crossover frequency, the gain of the modulator and output filter can be approximated
by Equation 20.
Gain = - 20 log(2 ´ p ´ RSENSE ´FCO ´ CO )- 2dB
(20)
Where:
RSENSE = 1Ω/10
FCO = Closed-loop crossover frequency
CO = Output capacitance
The phase loss is given by Equation 21.
PL = a tan(2 ´ p ´ FCO ´RESR ´ CO ) - a tan(2 ´ p ´ FCO ´RO ´ CO )-10deg
(21)
Where:
RESR = Equivalent series resistance of the output capacitor
RO = VO/IO
The measured overall loop response for the circuit is given in Figure 20. Note that the actual closed-loop
crossover frequency is higher than intended at about 25 kHz. This is primarily due to variation in the actual
values of the output filter components and tolerance variation of the internal feed-forward gain circuitry. Overall
the design has greater than 60 degrees of phase margin and will be completely stable over all combinations of
line and load variability.
Now that the phase loss is known the required amount of phase boost to meet the phase margin requirement
can be determined. The required phase boost is given by Equation 22.
PB = (PM - 90 deg) - PL
(22)
Where PM = the desired phase margin.
A zero / pole pair of the compensation network will be placed symmetrically around the intended closed loop
frequency to provide maximum phase boost at the crossover point. The amount of separation can be determined
by Equation 23 and the resultant zero and pole frequencies are given by Equation 24 and Equation 25.
k = tançæ PB + 45deg ÷ö
è2
ø
(23)
F
F
Z1
=
CO
k
(24)
F
P1
=
F
CO
´k
(25)
The low-frequency pole is set so that the gain at the crossover frequency is equal to the inverse of the gain of the
modulator and output filter. Due to the relationships established by the pole and zero relationships, the value of
RZ can be derived directly by Equation 26.
RZ
=
2×p
× FCO × VO × CO × ROA × 0.754
GMICOMP × Vggm × VREF
(26)
Where:
18
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