The presented MOS transistor model is not sufficiently accurate at
higher frequencies: Capacitances influence the circuit response.
A detailed analysis of all relevant capacitances of the
MOS transistor is extremely complicated
. The results will be examined for use
in small-signal analysis of analog CMOS circuits.
Figure 3.3: A MOS transistor cross section along the channel.
Figure 3.3 shows a cross section of a N-channel MOS
transistor with relevant capacitances. A general problem in relation
to this analysis is that many of these capacitances are
distributed. The conductive channel forms one of the
``plates'' in relation to two different capacitances: the
gate-channel capacitance and the substrate-channel capacitance.
In order to use the MOS transistor model for circuit analysis, these
distributed capacitances must be split into two discrete parts connected
to each end of the conducting channel, i.e. source and drain.
In this connection we will use the parameter 
:
The gate capacitance of the MOS transistor is distributed between source and
drain as follows:
The capacitance of the depletion area under the channel is distributed into
source, drain and gate according to the following expressions:
The capacitances of the source and drain diffusions are calculated according
to these expressions:
where Cj0 is the capacitance per unit area of an unbiased diffusion,
Cjp0 is the capacitance per unit perimeter of an unbiased diffusion,
is the ``built-in potential'' (in the order of 0.5-1.0V), and m
and mp are process characteristic parameters. (Typical values of
m and mp are 1/3-1/2). AS and AD are the areas of the source
drain diffusions, respectively, while PS and PD are the respective
perimeters of the source and drain diffusions. As source and drain
diffusions extend under the gate, as illustrated in Figure 3.3,
small overlap capacitances will appear between gate and source/drain.
These capacitances are given by
where LD is the overlap appearing between the gate polysilicon and the
source/drain diffusions.
Figure 3.4: Complete small signal equivalent diagram.
Figure 3.4 shows a small signal equivalent diagram with all capacitances.