MCP3901EV-MCU16 Microchip Technology, MCP3901EV-MCU16 Datasheet - Page 22
MCP3901EV-MCU16
Manufacturer Part Number
MCP3901EV-MCU16
Description
BOARD EVAL FOR 2CH ADC MCP3901
Manufacturer
Microchip Technology
Datasheets
1.MCP3901A0-ISS.pdf
(60 pages)
2.MCP3901A0-ISS.pdf
(30 pages)
3.MCP3901EV-MCU16.pdf
(38 pages)
4.MCP3901EV-MCU16.pdf
(38 pages)
Specifications of MCP3901EV-MCU16
Number Of Adc's
2
Number Of Bits
24
Data Interface
SPI™
Inputs Per Adc
1 Differential
Input Range
±1 V
Voltage Supply Source
Analog and Digital
Operating Temperature
-40°C ~ 85°C
Utilized Ic / Part
MCP3901
Silicon Manufacturer
Microchip
Application Sub Type
ADC
Kit Application Type
Data Converter
Silicon Core Number
MCP3901, PIC24F, PIC24H, DsPIC33, PIC18F86J55
Kit Contents
Board
Lead Free Status / RoHS Status
Lead free / RoHS Compliant
MCP3901
4.13
The MCP3901 incorporates two Delta-Sigma ADCs
with a multi-bit architecture. A Delta-Sigma ADC is an
oversampling converter that incorporates a built-in
modulator, which is digitizing the quantity of charge
integrated by the modulator loop (see
quantizer is the block that is performing the
Analog-to-Digital conversion. The quantizer is typically
1 bit, or a simple comparator which helps to maintain
the linearity performance of the ADC (the DAC
structure, is in this case, inherently linear).
Multi-bit quantizers help to lower the quantization error
(the error fed back in the loop can be very large with
1-bit quantizers) without changing the order of the
modulator or the OSR, which leads to better SNR
figures. Typically, however, the linearity of such
architectures is more difficult to achieve since the DAC
is no more simple to realize and its linearity limits the
THD of such ADCs.
The MCP3901’s 5-level quantizer is a Flash ADC,
composed of 4 comparators arranged with equally
spaced thresholds and a thermometer coding. The
MCP3901 also includes proprietary 5-level DAC
architecture that is inherently linear for improved THD
figures.
4.14
A Delta-Sigma Converter is an integrating converter. It
also has a finite quantization step (LSB) which can be
detected by its quantizer. A DC input voltage that is
below the quantization step should only provide an all
zeros result, since the input is not large enough to be
detected. As an integrating device, any Delta-Sigma
will show, in this case, Idle tones. This means that the
output will have spurs in the frequency content that are
depending on the ratio between quantization step
voltage and the input voltage. These spurs are the
result of the integrated sub-quantization step inputs
that will eventually cross the quantization steps after a
long enough integration. This will induce an AC
frequency at the output of the ADC and can be shown
in the ADC output spectrum.
DS22192C-page 22
MCP3901 Delta-Sigma
Architecture
Idle Tones
Figure
5-1). The
difficult to filter from the actual input signal.
These Idle tones are residues that are inherent to the
quantization process and the fact that the converter is
integrating at all times without being reset. They are res-
idues of the finite resolution of the conversion process.
They are very difficult to attenuate and they are heavily
signal dependent. They can degrade both the SFDR and
THD of the converter, even for DC inputs. They can be
localized in the baseband of the converter, and thus,
For power metering applications, Idle tones can be very
disturbing because energy can be detected even at the
50 or 60 Hz frequency, depending on the DC offset of
the ADCs, while no power is really present at the
inputs. The only practical way to suppress or attenuate
the Idle tones phenomenon is to apply dithering to the
ADC. The Idle tone amplitudes are a function of the
order of the modulator, the OSR and the number of
levels in the quantizer of the modulator. A higher order,
a higher OSR or a higher number of levels for the
quantizer will attenuate the Idle tones amplitude.
4.15
In order to suppress or attenuate the Idle tones present
in any Delta-Sigma ADCs, dithering can be applied to
the ADC. Dithering is the process of adding an error to
the ADC feedback loop in order to “decorrelate” the
outputs and “break” the Idle tones behavior. Usually, a
random or pseudo-random generator adds an analog
or digital error to the feedback loop of the Delta-Sigma
ADC in order to ensure that no tonal behavior can
happen at its outputs. This error is filtered by the feed-
back loop, and typically, has a zero average value so
that the converter static transfer function is not dis-
turbed by the dithering process. However, the dithering
process slightly increases the noise floor (it adds noise
to the part) while reducing its tonal behavior, and thus,
improving SFDR and THD (see
Figure
tones into baseband white noise and ensures that
dynamic specs (SNR, SINAD, THD, SFDR) are less
signal dependent. The MCP3901 incorporates a
proprietary dithering algorithm on both ADCs in order to
remove Idle tones and improve THD, which is crucial
for power metering applications.
2-14). The dithering process scrambles the Idle
Dithering
© 2010 Microchip Technology Inc.
Figure 2-10
and
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