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ISL62883_14 Datasheet, PDF (21/37 Pages) Intersil Corporation – Multiphase PWM Regulator for IMVP-6.5™ Mobile CPUs
ISL62883, ISL62883B
ISUM+
Resistor Current-Sensing Network
Phase1 Phase2 Phase3
Rntcs
Cn.1
Rp
Rntc
Rn
OPTIONAL
Cn.2 Vcn
Ri ISUM-
Rip Cip
OPTIONAL
FIGURE 19. OPTIONAL CIRCUITS FOR RING BACK REDUCTION
L
L
L
DCR DCR
DCR
Rsen Rsen Rsen
Rsum
Rsum
Rsum
Ro
Ro
Ro
ISUM+
Vcn
Cn
Ri ISUM-
Figure 18 shows the output voltage ring back problem during
load transient response. The load current io has a fast step
change, but the inductor current iL cannot accurately follow.
Instead, iL responds in first order system fashion due to the
nature of current loop. The ESR and ESL effect of the output
capacitors makes the output voltage Vo dip quickly upon load
current change. However, the controller regulates Vo according to
the droop current idroop, which is a real-time representation of iL;
therefore it pulls Vo back to the level dictated by iL, causing the
ring back problem. This phenomenon is not observed when the
output capacitor have very low ESR and ESL, such as all ceramic
capacitors.
Figure 19 shows two optional circuits for reduction of the ring
back. Rip and Cip form an R-C branch in parallel with Ri, providing
a lower impedance path than Ri at the beginning of io change.
Rip and Cip do not have any effect at steady state. Through
proper selection of Rip and Cip values, idroop can resemble io
rather than iL, and Vo will not ring back. The recommended value
for Rip is100Ω. Cip should be determined through tuning the load
transient response waveforms on an actual board. The
recommended range for Cip is 100pF~2000pF.
Cn is the capacitor used to match the inductor time constant. It
usually takes the parallel of two (or more) capacitors to get the
desired value. Figure 19 shows that two capacitors Cn.1 and Cn.2
are in parallel. Resistor Rn is an optional component to reduce
the Vo ring back. At steady state, Cn.1+Cn.2 provides the desired
Cn capacitance. At the beginning of io change, the effective
capacitance is less because Rn increases the impedance of the
Cn.1 branch. As explained in Figure 16, Vo tends to dip when Cn is
too small, and this effect will reduce the Vo ring back. This effect
is more pronounced when Cn.1 is much larger than Cn.2. It is also
more pronounced when Rn is bigger. However, the presence of
Rn increases the ripple of the Vn signal if Cn.2 is too small. It is
recommended to keep Cn.2 greater than 2200pF. Rn value
usually is a few ohms. Cn.1, Cn.2 and Rn values should be
determined through tuning the load transient response
waveforms on an actual board.
Io
FIGURE 20. RESISTOR CURRENT-SENSING NETWORK
Figure 20 shows the resistor current-sensing network for a
3-phase solution. Each inductor has a series current-sensing
resistor Rsen. Rsum and Ro are connected to the Rsen pads to
accurately capture the inductor current information. The Rsum
and Ro resistors are connected to capacitor Cn. Rsum and Cn
form a a filter for noise attenuation. Equations 25 thru 27 give
VCn(s) expression:
VCn(s)
=
-R----s--e---n--
N
×
Io
(s)
×
ARs
e
n
(
s
)
(EQ. 25)
ARsen(s)
=
----------1------------
1
+
------s------
ωsns
ωRsen
=
-------------1--------------
-R----s--u----m---
N
×
Cn
(EQ. 26)
(EQ. 27)
Transfer function ARsen(s) always has unity gain at DC.
Current-sensing resistor Rsen value will not have significant
variation over temperature, so there is no need for the NTC
network.
The recommended values are Rsum = 1kΩ and Cn = 5600pF.
Overcurrent Protection
Refer to Equation 1 and Figures 9, 14 and 20; resistor Ri sets the
droop current Idroop. Table 3 shows the internal OCP threshold. It
is recommended to design Idroop without using the Rcomp
resistor.
For example, the OCP threshold is 60µA for 3-phase solution. We
will design Idroop to be 38.8µA at full load, so the OCP trip level is
1.55 times of the full load current.
For inductor DCR sensing, Equation 28 gives the DC relationship
of Vcn(s) and Io(s).
⎛
⎞
VCn
=
⎜
⎜
⎜
⎝
-----------R----n---t---c--n----e---t-----------
Rn
t
c
n
e
t
+
-R----s--u----m---
N
×
D-----NC----R--⎟⎟⎟
⎠
× Io
(EQ. 28)
21
FN6891.4
June 21, 2011