LTC3858 Datasheet, PDF(25/38 Page) Linear Technology – Low IQ, Dual 2-Phase Synchronous Step-Down Controller

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LTC3858 Datasheet, PDF (25/38 Pages) Linear Technology – Low IQ, Dual 2-Phase Synchronous Step-Down Controller

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LTC3858

Applications Information

combined effects of increasingly lower output voltages

and higher currents required by high performance digital

systems is not doubling but quadrupling the importance

of loss terms in the switching regulator system!

4. Transition losses apply only to the topside MOSFET(s),

and become significant only when operating at high

input voltages (typically 15V or greater). Transition

losses can be estimated from:

Transition Loss = (1.7) â¢ VIN â¢ 2 â¢ IO(MAX) â¢ CRSS â¢ f

Other âhiddenâ losses such as copper trace and internal

battery resistances can account for an additional 5% to

10% efficiency degradation in portable systems. It is

very important to include these âsystemâ level losses

during the design phase. The internal battery and fuse

resistance losses can be minimized by making sure that

CIN has adequate charge storage and very low ESR at

the switching frequency. A 25W supply will typically

require a minimum of 20ÂµF to 40ÂµF of capacitance

having a maximum of 20mÎ© to 50mÎ© of ESR. The

LTC3858 2-phase architecture typically halves this input

capacitance requirement over competing solutions.

Other losses including Schottky conduction losses

during dead-time and inductor core losses generally

account for less than 2% total additional loss.

Checking Transient Response

The regulator loop response can be checked by looking at

the load current transient response. Switching regulators

take several cycles to respond to a step in DC (resistive)

load current. When a load step occurs, VOUT shifts by

an amount equal to âILOAD (ESR), where ESR is the ef-

fective series resistance of COUTâ. âILOAD also begins to

charge or discharge COUT generating the feedback error

signal that forces the regulator to adapt to the current

change and return VOUT to its steady-state value. During

this recovery time VOUT can be monitored for excessive

overshoot or ringing, which would indicate a stability

problem. OPTI-LOOP compensation allows the transient

response to be optimized over a wide range of output

capacitance and ESR values. The availability of the ITH pin

not only allows optimization of control loop behavior, but

it also provides a DC coupled and AC filtered closed-loop

response test point. The DC step, rise time and settling

at this test point truly reflects the closed-loop response.

Assuming a predominantly second order system, phase

margin and/or damping factor can be estimated using the

percentage of overshoot seen at this pin. The bandwidth

can also be estimated by examining the rise time at the

pin. The ITH external components shown in Figure 12

circuit will provide an adequate starting point for most

applications.

The ITH series RC-CC filter sets the dominant pole-zero

loop compensation. The values can be modified slightly

(from 0.5 to 2 times their suggested values) to optimize

transient response once the final PC layout is done and

the particular output capacitor type and value have been

determined. The output capacitors need to be selected

because the various types and values determine the loop

gain and phase. An output current pulse of 20% to 80%

of full-load current having a rise time of 1Âµs to 10Âµs will

produce output voltage and ITH pin waveforms that will

give a sense of the overall loop stability without breaking

the feedback loop.

Placing a resistive load and a power MOSFET directly

across the output capacitor and driving the gate with an

appropriate signal generator is a practical way to produce

a realistic load step condition. The initial output voltage

step resulting from the step change in output current may

not be within the bandwidth of the feedback loop, so this

signal cannot be used to determine phase margin. This

is why it is better to look at the ITH pin signal which is in

the feedback loop and is the filtered and compensated

control loop response.

The gain of the loop will be increased by increasing RC

and the bandwidth of the loop will be increased by de-

creasing CC. If RC is increased by the same factor that CC

is decreased, the zero frequency will be kept the same,

thereby keeping the phase shift the same in the most

critical frequency range of the feedback loop. The output

voltage settling behavior is related to the stability of the

closed-loop system and will demonstrate the actual overall

supply performance.

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