cmos mosfet problems
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ComplementaryMOS inverter“CMOS” inverter
SGPV
SDPV
SGNV
SDNV
S
S
ComplementaryMOS inverter“CMOS” inverter
• n channel enhancement mode (VTN > 0) in series with a p channel enhancement mode (VTP < 0)
• 0 < Vin < VTN --NMOS drain current is zero PMOS drain current will also be zero.
• VSGP = VDD – Vin VDD > |VTP|
• Therefore, in order to have no current, VSDP = 0 or Vout = VDD
SGPV
SDPV
SGNV
SDNV
S
S
ComplementaryMOS inverter“CMOS” inverter
• n channel enhancement mode (VTN > 0) in series with a p channel enhancement mode (VTP < 0)
• VDD - |VTp| < VI < VDD – PMOS drain current is zero & NMOS drain current will also be zero.
• VSGN = Vin VDD > VTN
• Therefore, in order to have no current, VSDN = 0 or Vout = 0
SGPV
SDPV
SGNV
SDNV
S
S
CMOS p type substrate inverter
p type substrate
n welln p
oxidepolysilicon gate
NMOS PMOS
CMOS n type substrate inverter
n type substrate
p welln p
oxide
polysilicon gate
NMOS PMOS
CMOS inverter
p or n type substrate
p well n welln p
oxidepolysilicon gate
NMOS PMOS
CMOS voltage transfer characteristics
DDV
DDV
DD TPV V
outV
inVTNV
Important changes in the MOSFETdecrease dimensions by a factor of !k 1
Moore’s Law (Intel Corp. cofounder) The number of active elements on a chip doubles every 18 months.
source draingate
W
L
body
source draingate
W
L
body
Important changes in the MOSFETphysical dimensions -- oxidekL, kW , kt
voltages -- s g dkV , kV , kV
area -- 2kL kW k
electric fields -- g d s
oxide
kV kV kV, 1
kt kL
Important changes in the MOSFET
electric fields -- g d s
oxide
kV kV kV, 1
kt kL
oxidecapacitance -- oxide
( kL )( kW ) kkt
sdepletion width -- G
a
2 ( kV ) kNe k
a dN Ndoping concentrations -- ,k k
Important changes in the MOSFET
constant drain current per channel --
= 2n oxide gD
g Toxide
VkIkV kV 1
kW 2 kt kL
electric power density -- kV kI
1kW kL
Important changes in the MOSFET
threshold voltage
a Fp
T flatland Fpoxide
2 eN 2V V 2
C
Problem in changing the MOSFET
voltages -- s g dkV , kV , kV
We will not change our old power supplies. Do not, I repeat, do not
change the voltage supplies so often.
Consequences 1)electric fields increase in value. 2) reduced reliability. 3) heating
source draingate
W
L
body
Problems in the MOSFETbreak down in the oxide that is 500 Å thick
break down strength is 6V6 10 cm
Depletion layer expansion in the MOSFET
GV
G
S D+n+ndepletion layer
expansion from
the drain
no inversion layercurrent increases!
Energy level diagrams before and after “punch through”
Fermi sourceE
source channel drain
vE
cE Fermi drainE
DSeV Fermi sourceE
source channel drain
vE
cE Fermi drainE
DS1eV
Fermi drainEDS2eV
GS TV V
“hot electrons” MOSFET
GV
G
S - D ++n+n
The drain-source voltage increases causing impact ionization at the drain electrode.The depletion layer increases
Electrons go into the oxide region and the holes going to the substrate.
Hot electron energy > Thermal equilibrium value
Electrons may “tunnel” into the oxide
Lightly doped MOSFET
p type substrate
W
oxide
L
metal
+n +n
+n is a heavily doped n type semiconductor
-n -n
sourcegate
drain
-n is a lightly doped n type semiconductor
body
connections
Lightly doped MOSFETreduces the electric field in the channel region
beneath avalanche breakdown value
- harder to manufacture
- increased drain resistance
Transmission Lines Demonstration
High Frequency Electronics Course EE527
Andrew Rusek Oakland University
Winter 2007
Demonstration is based on the materials collectedfrom measurement set up to show sinusoidal and step responses of a transmission line with various terminations. Results of selected simulations are included.
Fig.1a Test circuits
Fig. 1b Low frequency sine-wave (1MHz), TL matched (50 ohms), observe small delays and almost identical amplitudes
Fig. 1c Low frequency sine-wave (1MHz), TL matched (50 ohms) Channel 4 (output) shows the voltage for grounded center conductor and a probe input connected to the outer conductor (shield), observe the phase inversion of the last wave (180 degrees)
Fig. 2a Sine-wave of 17 MHz, matched load
The waves have the same amplitudes, the phases are different.
Fig. 2b Sine-wave of 17 MHz, matched load Channel 4 (output) shows the voltage for grounded center conductor and a probe input connected to the outer conductor (shield).
Fig. 3 Open ended TL, sine-wave of 1 MHz applied, observe 2X larger amplitude in comparison with previous tests, amplitudes are almost the same for all waves.
Fig. 4a Open ended TL, 3.5 MHz, observe minimum (input)
One quarter wave pattern is shown
Fig. 4b Open ended TL, 3.5 MHz, observe minimum (input)
One quarter wave pattern is shown
Fig. 4c Open ended TL, 3.5 MHz, observe minimum (input)
One quarter wave pattern is shown
Fig. 5 Open ended TL, 5.5 MHz, observe shift of the minimum
The minimum is located quarter wave from the end.
Fig. 6 Open ended TL, 11 MHz, observe two minima
Fig. 7 Shorted TL, low frequency,1MHz applied, observe zero output voltage
Fig. 8 Shorted TL, 5 MHz applied
Fig. 9 Shorted TL, 7 MHz, observe two minima (half wave). If the length of the line is known, the dielectric constant can be calculated (Lambda_cable/2 = 12m, open space Lambda = 42.8m).
Fig. 10 Shorted TL, 7 MHz, increased vertical sensitivity; observe two minima as before and effects of stray inductance of the source and probe leads (half wave),
Fig.11 Shorted TL, 11 MHz, two minima, first shifted towards the load, ¼ wavelength + ½ wavelength
Fig. 12 Pulse response of open ended TL, slow pulse (0.3us rise time), no reflections observed, Channel 2 – Input, Channel 4 – Output, observe the delay.
Fig. 13a Open ended TL, Input Pulse rise time = 240 ns, Output = 120 ns, Long pulse applied, measurement circuit
Fig. 13b Open ended TL, Input Pulse rise time = 240 ns, Output = 120 ns,Why Output is faster than Input ? End of TL reflection adds to incident (Real rise time of the input wave is120 ns), and this effect doubles Input signal rise time. Long pulse applied, simulations.
Fig. 13c Open ended TL, Input Pulse rise time = 240 ns, Output = 120 ns,Why Output is faster than Input ? End of TL reflection adds to incident (Real rise time of the input wave is120 ns), and this effect doubles Input signal rise time. Long pulse applied, measurements.
Fig. 14a Open ended TL, long pulse applied, source matched, measurement circuit.
Fig. 14b Open ended TL, long pulse applied, source matched, simulations.
Fig. 14c Open ended TL, Input – Channel 2 shows incident step and reflected step (doubled TL delay), source matched, Output – Channel 4 shows doubled incident wave level, delayed (about 60 ns), long pulse applied. Distance between steps of Channel 2 – 2X TL delay time, measurements.
Fig. 15c Open ended TL, short pulses applied to show “radar effect”, circuit.
Fig. 15c Open ended TL, short pulses applied to show “radar effect”. Echo is observed (Upper Channel – Input), doubled amplitude – Lower Channel, simulations.
Fig. 15c Open ended TL, short pulses applied to show “radar effect”. Echo is observed (Channel 2 – Input), doubled amplitude – Channel 4 – Output, observe effects of the losses of TL – echo is slower and smaller. Distance between pulses of Channel 2 – 2X TL delay time. Measured unit delay yields 20cm/ns.
Fig 16a Shorted TL, narrow pulses, circuit.
Fig 16b Shorted TL, narrow pulses, observe change of polarity of a reflected pulse (Upper Channel – Input).
Fig 16c Shorted TL, narrow pulses, “short” is not really short at HF (Channel 4), observe change of polarity of reflected pulse (Channel 2 – Input).
Fig. 17a Transmission line and the inductive load, the source resistance is matched (50 ohms), circuit.
Fig. 17b Transmission line and the inductive load, the source resistance is matched (50 ohms), simulated waves.
Fig. 17c Transmission line and the inductive load, the source resistance is matched (50 ohms), measurements.
Fig. 17d Transmission line and the inductive load, the source resistance is matched (50 ohms), larger time scale
Fig. 17e Transmission line and the inductive load, the source resistance is matched (50 ohms), display adjusted to calculate the time constant and inductance (L = 100 uH).
Fig. 17f Transmission line and the capacitive load, the source resistance is matched (50 ohms), circuit.
Fig. 17g Transmission line and the capacitive load, the source resistance is matched (50 ohms), display adjusted to calculate the time constant and capacitance (C = 10nF), simulated waves.
Fig. 17h Transmission line and the capacitive load, the source resistance is matched (50 ohms), display adjusted to calculate the time constant and capacitance (C = 10nF), measured waves.
Fig. 18 a. Matched TL, reversed connections of Output Probe (center conductor is grounded} – the waves show that outer conductor of TL also participates in signal delay, circuit.
Fig. 18 b. Matched TL, reversed connections of Output Probe (center conductor is grounded} – the waves show that outer conductor of TL also participates in signal delay, simulated waves .
Fig. 18 c. Matched TL, Input – Channel 2, reversed connections of Output Probe (center conductor is grounded} – Channel 4, shows that outer conductor of TL also participates in signal delay
Fig. 19a Reflection from the unmatched load of the TL (Rload =27 ohms), source is matched, circuit.
Fig. 19b Reflection from the unmatched load of the TL (Rload =27 ohms), source is matched, simulated waves.
Fig. 19c Reflection from the unmatched load of the TL (Rload =27 ohms), source is matched, measured waves.
Fig. 20a Reflection from the unmatched load of the TL (Rload =100 ohms), source is matched
Fig. 20c Reflection from the unmatched load of the TL (Rload =100 ohms), source is matched
Fig. 21a Reflection from the unmatched load and the source of the TL (Rsource = 25 ohms Rload =open circuit), circuit.
Fig. 21b Reflection from the unmatched load and the source of the TL (Rsource = 25 ohms Rload =open circuit), simulated waves.
Fig. 21c Reflection from the unmatched load and the source of the TL (Rsource = 25 ohms Rload =open circuit)
Fig. 22a Reflection from the unmatched load and the source of the TL (Rsource = 100 ohms Rload =open circuit), circuit.
Fig. 22b Reflection from the unmatched load and the source of the TL (Rsource = 100 ohms Rload =open circuit), simulated waves.
Fig. 22c Reflection from the unmatched load and the source of the TL (Rsource = 100 ohms Rload =open circuit), measured waves.
Fig. 23a Reflection from the shorted load of the TL, source is matched, circuit.
Fig. 23b Reflection from the shorted load of the TL, source is matched, simulation results
Fig. 23c Reflection from the shorted load of the TL, source is matched (one inch length wire = Rload), measurements.
Fig. 24a Reflection from the shorted load of the TL, source is matched (one inch length wire = Rload), observe effects of TL losses (elevated “tail” that follows the pulse, and the step of the output signal)
Fig. 24b Reflection from the shorted load of the TL, source is matched (less than 0.5 inch length wire = Rload)
Fig. 25a Reflection from the shorted load of the TL, source resistance is not matched (25 ohms), circuit.
Fig. 25b Reflection from the shorted load of the TL, source is not matched (source resistance is 25 ohms, simulated waves.
Fig. 25c Reflection from the shorted load of the TL, source is not matched (25 ohms), measurements.
Fig. 26a Reflection from the shorted load of the TL, source is matched (100 ohms), circuit.
Fig. 26b Reflection from the shorted load of the TL, source is not matched (100 ohms), simulations.
Fig. 26c Reflection from the shorted load of the TL, source is not matched (100 ohms), measurements.
Rsource = 100 ohms, Rload = 6 ohms
Rsource = 25 ohms, Rload = 6 ohms
Rsource = 25 ohms, Rload = 820 ohms
Rsource = 100 ohms, Rload = 820 ohms
1991
Iowa City, Iowa
Simple three-dimensional unit cell
a
b
c
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