Chapter 5

1. Chapter 5 The Inverter April 10, 2003

2. Objective of This Chapter • Use Inverter to know basic CMOS Circuits Operations • Watch for performance Index such as • Speed (Delay) • Optimal Transistor Sizing • Power Consumption

3. V DD V V in out C L The CMOS Inverter: A First Glance

4. V DD CMOS Inverter N Well PMOS 2l Contacts Out In Metal 1 Polysilicon NMOS GND

5. Two Inverters Share power and ground Abut cells Connect in Metal Vin Vout Vout Vin

6. V V DD DD R p V out V out R n V V V 0 = = in DD in CMOS InverterFirst-Order DC Analysis VOL = 0 VOH = VDD VM = f(Rn, Rp) Rn, Rp: Channel Resistance in Saturation Mode

7. t = f(R .C ) pHL on L = 0.69 R C on L CMOS Inverter: Transient Response V V DD DD R p V out V out C L C L R n V 0 V V = = in DD in (a) Low-to-high (b) High-to-low

8. Voltage TransferCharacteristic

9. I Dn V = V +V in DD GS,p I = - I D,n D,p V = V +V out DD DS,p V out I I I Dp Dn Dn V =0 V =0 in in V =1.5 V =1.5 in in V V V DS,p DS,p out V =-1 GSp V =-2.5 GSp V = V +V V = V +V in DD GSp out DD DSp I = - I Dn Dp PMOS Load Lines (Vdd = 2.5V)

10. CMOS Inverter Load Characteristics

11. CMOS Inverter VTC VM: Vin = Vout

12. Switching Threshold as a Function of Transistor Ratio NMOS and PMOS are in Saturation Modes For r = 1, and mobility NMOS = 2 PMOS, Wp = 2Wn

13. (V) V Switching Threshold as a Function of Transistor Ratio 1.8 1.7 1.6 1.5 1.4 1.3 M 1.2 1.1 1 0.9 0.8 0 1 10 10 /W W p n

14. Simulated VTC

15. 2.5 2 Good PMOS Bad NMOS 1.5 Nominal (V) out Good NMOS Bad PMOS V 1 0.5 0 0 0.5 1 1.5 2 2.5 V (V) in Impact of Process Variations

16. Propagation Delay

17. CMOS Inverter Propagation DelayApproach 1

18. CMOS Inverter Propagation DelayApproach 2

19. V DD PMOS Metal1 Polysilicon NMOS CMOS Inverters 1.2 m m =2l Out In GND

20. Transient Response ? tp = 0.69 CL (Reqn+Reqp)/2 tpHL tpLH

21. Design for Performance • Keep loading capacitances (CL) small • Increase transistor sizes (add CMOS gain) • Watch out for self-loading (for the previous stage)! • Increase VDD (????)

22. Delay as a function of VDD

23. Device Sizing (for fixed load) Self-loading effect: Intrinsic capacitances dominate

24. NMOS/PMOS ratio tpHL tpLH tp b = Wp/Wn

25. Impact of Rise Time on Delay

26. Inverter Sizing

27. Inverter Chain In Out CL • If CL is given: • How many stages are needed to minimize the delay? • How to size the inverters? • May need some additional constraints.

28. Inverter Delay • Minimum length devices, L=0.25mm • Assume that for WP = 2WN =2W • same pull-up and pull-down currents • approx. equal resistances RN = RP • approx. equal rise tpLH and fall tpHL delays • Analyze as an RC network 2W W tpHL = (ln 2) RNCL Delay (D): tpLH = (ln 2) RPCL Load for the next stage:

29. Inverter with Load Delay RW CL RW Load (CL) tp = kRWCL k is a constant, equal to 0.69 Assumptions: no load -> zero delay Wunit = 1

30. Inverter with Load CP = 2Cunit Delay 2W Cint CL W Load CN = Cunit Delay = kRW(Cint + CL) = kRWCint + kRWCL = kRW Cint(1+ CL /Cint) = Delay (Internal) + Delay (Load)

31. Delay Formula Cint = gCgin withg 1 f = CL/Cgin- effective fanout R = Runit/W ; Cint =WCunit tp0 = 0.69RunitCunit

32. Apply to Inverter Chain In Out CL 1 2 N tp = tp1 + tp2 + …+ tpN

33. Optimal Tapering for Given N • Delay equation has (N-1) unknowns, Cgin,2 – Cgin,N • Minimize the delay, find N - 1 partial derivatives • Result: Cgin,j+1/Cgin,j = Cgin,j/Cgin,j-1 • Size of each stage is the geometric mean of two neighbors • Each stage has the same effective fanout (Cout/Cin) • Each stage has the same delay

34. Optimum Delay and Number of Stages When each stage is sized by f and has same effective fanout f: Effective fanout of each stage: Minimum path delay

35. Example In Out CL= 8 C1 1 f f2 C1 CL/C1 has to be evenly distributed across N = 3 stages:

36. Optimum Number of Stages For a given load, CL and given input capacitance Cin Find optimal sizing f For g = 0, f = e, N = lnF

37. Optimum Effective Fanout f Optimum f for given process defined by g fopt = 3.6 forg=1

38. Impact of Self-Loading on tp No Self-Loading, g=0 With Self-Loading g=1

39. Normalized delay function of F

40. Buffer Design N f tp 1 64 65 2 8 18 3 4 15 4 2.8 15.3 1 64 1 8 64 1 4 64 16 1 64 22.6 8 2.8

41. Power Dissipation

42. Where Does Power Go in CMOS?

43. Vdd Vin Vout C L Dynamic Power Dissipation 2 Energy/transition = C * V L dd 2 Power = Energy/transition * f = C * V * f L dd Not a function of transistor sizes! Need to reduce C , V , and f to reduce power. L dd

44. Modification for Circuits with Reduced Swing

45. Node Transition Activity and Power

46. Transistor Sizing for Minimum Energy • Goal: Minimize Energy of whole circuit • Design parameters: f and VDD • tp tpref of circuit with f=1 and VDD =Vref

47. Transistor Sizing (2) • Performance Constraint (g=1) • Energy for single Transition

48. Transistor Sizing (3) VDD=f(f) E/Eref=f(f) F=1 2 5 10 20

49. Short Circuit Currents

50. How to keep Short-Circuit Currents Low? Short circuit current goes to zero if tfall >> trise, but can’t do this for cascade logic, so ...