1. Technical Field
The present invention relates to the technical field of conversion of analog signals into digital signals and in particular relates to an analog/digital converter and a method for calibrating said converter.
2. Description of the Related Art
In many electronic apparatuses, the need is felt to convert analog signals into digital signals. A significant example of this type of apparatus is given by the digital terminals of mobile communication. In these applications, the requirements for low consumption, low voltage and high performance create particularly severe conditions for the design of the integrated circuits which make up the electronic system of the terminal.
The possibility of producing said integrated circuits with an ever-increasing level of integration (e.g. pure CMOS technology) leaves a greater area available on the chip which can be used for implementing digital signal processing (DSP) techniques often directed at improving the performance of analog components/circuits, for example used to compensate for imprecision inherently introduced by analog components/circuits.
This trend is also present in the sector of analog/digital converters, in particular in the sector of multistage converters, for which correction methods have been developed, more commonly known as calibration methods, intended to correct errors present in the conversion result due to the non-ideality of analog components, such as capacitors or operational amplifiers, present in the converter. Said non-ideality is, for example, attributable to the capacitor mismatch of the sampling circuits present at the converter input and to the limited gain-bandwidth product of the real operational amplifiers.
Among the calibration methods which belong to the prior art, there is a first type of method which makes it possible to perform a foreground calibration, in other words calibration performed when the analog signal to be converted is not applied to the converter input. These methods have the advantage that they have only a limited circuit complexity and the advantage that they guarantee an accurate conversion result. However, the foreground calibration methods have the intrinsic drawback that they cannot be used when the analog signal to be converted is applied to the converter input. In some applications however continuous calibration during signal conversion is necessary.
To overcome this drawback, a second type of calibration method has been developed. In particular, these methods use correlation methods and they are able to operate during conversion of the analog signal without interfering with the normal operation of the analog/digital converter.
These methods normally work by adding, to the analog samples of the signal to be converted, respective samples of a pseudorandom noise sequence, so that the error to be corrected is modulated by said sequence. The digital output of the converter is processed by means of correlation operations so as to extract the modulated information with the aim to improve the performance of the converter. It has been empirically proved that between the convergence time tconv (time to reach half LSB precision) of said correction methods and the resolution N in number of bits of the converter, there exists a relation of the type:
tconv=22·NTs
where Ts is the sampling period.
From the above relation it can be seen that, for example, by using one of the above-described background correction methods of the prior art in a cyclic converter with a resolution of 13 bits and operating at a frequency of 5 MS/s (mega-symbols per second), a convergence time of approximately 30 seconds is obtained. This extended convergence time makes the background calibration methods of the known art unsuitable for use in numerous applications.
One embodiment is an analog/digital converter having a correction (i.e. calibration) system which is such as to provide shorter convergence times than the convergence times of the systems or methods of the prior art and which, at the same time, has a limited circuit complexity.
One embodiment is an analog/digital converter as defined in the attached claim 1. Preferred embodiments are defined in the dependent claims.
One embodiment is a method for calibrating a multistage analog/digital converter, as defined in the attached claim 11.
Further features and advantages of an analog/digital converter will become more apparent from the following detailed description of an exemplary but non-limiting embodiment thereof, as illustrated in the accompanying drawings, in which:
In the Figures, equal or similar elements are indicated with the same reference numbers.
For exemplary and non-limiting purposes, this description will refer in particular to a cyclic multistage analog/digital converter 1, usually called algorithmic analog/digital converter. However, it should be noted that the teachings herein can easily be extended by the skilled in the art also to different types of multistage analog/digital converters, for example to the so-called pipeline multistage analog/digital converters.
As used herein, a multistage analog/digital converter means a converter which operates so as to carry out each conversion cycle in plural steps. In one embodiment, one or more different bits are resolved at each step (i.e. at least one bit) of a respective output digital code Dout, which in practice represents a sample of an output digital signal Dout and is equivalent to the representation in the digital domain, obtained by means of the converter 1, of a sample of the input analog signal Vin. In particular, conversion at a particular step is commonly based on a residue resulting from partial conversion at the preceding step. Conversion cycle means all the operations, or steps, carried out to resolve all the N bits of the output digital code Dout. In particular, only for exemplary but non-limiting purposes, this description will refer to the case in which the multistage analog/digital converter 1 resolves a single bit of the code Dout at each step, so that each conversion cycle is formed by N steps, where N is the converter resolution.
With reference to
A change-over switch 8, connected to the input 2i of the sampling circuit 2 makes it possible to selectively apply the analog signal Vin to the input 2i of the sampling circuit 2. In practice, in a cyclic converter like the analog/digit converter 1 illustrated in
The analog/digital converter 1 further includes a summing node 4, with a first input 4i connected to the output 2u of the sampling circuit 2, and with a second input 4ii suitable to receive a pseudorandom sequence of analog samples γ·ts in output from a generation block 3 of signals included in the converter 1. The symbol γ represents a gain factor, or scaling factor, which makes it possible to scale the amplitude of the samples in the pseudorandom sequence ts and can, for example, be controlled by means of the generation block 3. Since γ represents only one scaling factor, both the sequence ts and the sequence γ·ts will be referred to hereunder with the expression pseudorandom.
In reply to the samples received at the two inputs 4i and 4ii, the summing node 4 provides, at an output 4u, a new sequence of analog samples Vin+ which in practice is a given sum, sample by sample, of the two sequences of samples Vin* and γ·ts in input to the summing node 4. Advantageously, the sum sequence Vin+=γ·ts+Vin* includes a plurality of samples where the contribution of the pseudorandom sequence γ·ts is absent. In practice, said samples coincide with the corresponding samples of the sequence Vin*. The advantage of said alternative will be explained in detail hereunder.
In a particularly advantageous embodiment, the above is obtained, for example, by setting the period of the sequence γ·ts in such a way that it is equal to an integer multiple (according to a factor Nskip) of the period of the sequence of samples Vin*. In this way, a sum sequence Vin+ will be present in output from the summing node 4, so that in each group of Nskip samples (which is a whole number greater than 1, for example between 10 and 200) of the sum sequence Vin+, a sample including the contribution of the pseudorandom sequence γ·ts will be present. This particular way of producing the pseudorandom sequence γ·ts is advantageous because in this case the generation block 3 is easier to produce since it “works” at a lower frequency than the sampling frequency of the converter 1. In an alternative embodiment, it is possible to generate a pseudorandom sequence at a full frequency and then decimate the samples of said frequency to be summed to the sampled analog signal Vin*.
With reference to
As shown in the diagram in
The analog/digital converter 1 further includes an digital/analog converter 11 having an input 11i connected to the output 5u of the sub-ADC 5 and having an output 11u connected to the input 6i of a further summing node 6 comprised in the analog/digital converter 1. The further summing node 6 further includes a second input 6ii connected to the output 2u of the sampling means 2 and is such as to provide, at an output 6u, a signal given by the difference between the signal in output from the sampling circuit 2 and the signal in output from the analog/digital converter 11. As is known to the skilled in the art, said difference signal is an analog signal (in the form of a sequence of samples) which represents, at every step, the residue of the partial conversion carried out in said step by the sub-ADC 5.
As shown in
As is known to the skilled in the art, if a cyclic converter 1 is such as to resolve at each step a single bit of the output digital code, the gain G of the amplification means 7 is ideally exactly equal to 2, but in practice it is often a number approximately equal to 2. If, however, two bits of the output digital code are resolved at each step of a conversion cycle, the gain G of the amplification means 7 is ideally exactly equal to 4, but in practice it is a number approximately equal to 4.
The output 6u of the amplification means 7 can be connected to the input 2i of the sampling means by means of the change-over switch 8, for performing the steps of each conversion cycle after the first step. It should be noted that, in practice, the analog/digital converter 1 in
It should be observed that in this second configuration, the analog/digital converter 1 includes a feedback loop including the sampling circuit 2 and the amplification means 7.
It is known that, due to the inherent non-ideality of the analog components and devices, the effective loop gain GLoop, which in the embodiment described should theoretically be equal to the ideal gain of the amplification means 7, in this case equal to 2, does not have exactly said value. The inherent non-ideality is substantially due both to the mismatch of the sampling circuit 2 capacitors and to the fact that the gain-bandwidth of the amplification means 7 is limited.
For this reason, the calibration block 9 modifies the digital gain ĝ in order to reduce or cancel any conversion errors due to the above-described non-ideality. More in particular, the objective of the calibration block 9 is to modify the digital gain ĝ so that it is as near as possible to the loop gain GLoop.
Before describing more in detail the calibration block 9 and its behavior, it is useful to illustrate how said non-ideality influences the operation of the analog/digital converter 1, using a simplified model shown schematically in
The simplified model in
On the basis of the model in
Dout=ĝVin+eq1(ĝ−GLoop)+eqrs. (1)
As can be seen from the above formula (1), when there is mismatch between the digital gain ĝ and the loop gain GLoop, a fraction of the quantization noise eq1 introduced by the sub-ADC 5 at the first step, filters into the output so lowering the performance of the cyclic converter. This phenomenon is called “quantization noise leakage”. In particular, this noise leakage influences performance in terms of signal/noise ratio at the output of the cyclic converter; moreover, this is noise which, far from being white noise, is strongly correlated to the input Vin.
Advantageously, by means of the calibration block 9 in
In
In particular, calibration of the gain ĝ involves injection of a pseudorandom sequence γ·ts at the same point where the quantization noise eq1 is introduced, similarly to what happens in the converter illustrated in
It should be observed that in this case the output signal can be expressed as:
Dout=ĝVin+eq1(ĝ−GLoop)+γts(ĝ−GLoop)+eqrs. (2)
On the basis of the formula (2) it is possible to see how a further noise contribution, proportional to the pseudorandom sequence γ·ts and to the difference between the digital gain and loop gain, is present at output.
From this it ensues that, by carrying out a correlation product by means of a multiplier 26 between the output Dout and the pseudorandom sequence ts, it is possible to extract the gain mismatch θ, where:
θ=γ(ĝ−GLoop)+ts└ĝVin+eq1(ĝ−GLoop)+eqrs┘. (3)
In the above equation (3) the symbol represents the correlation product. In this description, the expression residual correlation noise θerr will indicate the second term which appears in the above equation (3) where the gain mismatch θ is expressed in analytical form. In practice, the residual correlation noise is given by:
θerr=ts└ĝVin+eq1(ĝ−GLoop)+eqrs┘. (4)
From the formula (4) it can be seen that if Vin, eq1 and eqrs are uncorrelated from the sequence ts, the residual correlation noise θerr is practically nil. In this case, by minimizing the gain mismatch error θ, for example by means of a least mean square (LMS) algorithm, implemented in
However, in practice this does not take place since the residual correlation term θerr is not totally negligible and this limits the efficiency of the calibration method. In a real situation, in order to bring to zero the residual correlation θerr, one could increase the length of the pseudorandom sequence γ·ts and/or increase the integration step of the LMS loop minimization block 29. However, both these expedients have a negative and significant influence on the performance in terms of the calibration method convergence.
It has been observed, however, that the dominant contribution in the expression (4) of residual correlation θerr is the one proportional to the input signal Vin, since said signal is a full scale signal and is much greater than the remaining term eq1(ĝ−GLoop)+eqrs.
For this reason, advantageously, the calibration block 9 of the analog/digital converter 1 (
Since advantageously, as explained more in detail before, both input signal samples containing the contribution of the pseudorandom sequence γ·ts and samples not containing said contribution are present in the sample sequence Vin+ in output from the summing node 4, it is possible to carry out, in the calibration block 9, a prediction (i.e. an estimation) of the input signal Vin, starting from the digital codes Dout, corresponding to (i.e. resulting from the conversion of) samples of the sequence Vin+ in output from the summing node 4 which do not contain the contribution of the pseudorandom sequence γ·ts. It should be observed that, in practice, cancellation of the input signal Vin in the calibration block 9 can be carried out starting from the bits output from the same sub-ADC 4, i.e. without requiring the onerous addition, in the analog/digital converter 1, of a further analog/digital converter on an additional path which is such as to avoid the summing node 4 where the pseudorandom sequence γ·ts is injected in the input signal Vin.
In a particularly advantageous embodiment, the prediction of the input signal Vin is performed by means of an interpolation block 10, provided in the analog/digital converter 1. Said block 10 operates in such a way as to perform interpolation of the output digital codes Dout resulting from the conversion of the samples of the sequence Vin+ output from the summing node 4 where the component of the pseudorandom sequence γ·ts is absent. Preferably, but not limited to, said interpolation is a polynomial interpolation, more preferably a non-linear Lagrange interpolation. In alternative embodiments, equivalent interpolation methods and known to the skilled in the art may be implemented in the block 10 instead of the non-linear Lagrange interpolation.
In a particularly advantageous embodiment, the interpolation block 10 includes a FIR filter suitable to implement interpolation useful for prediction of the input signal Vin.
Preferably, the interpolation performed by the block 10 operates so as to obtain a digital estimation {circumflex over (D)}out of a sample of the input signal Vin (corresponding to a sample of the sequence Vin+ output from the summing node 4 where the component of the pseudorandom sequence γ·ts is present), by using the results of the conversion of the Nskip−1 samples which precede said sample and of the Nskip−1 samples which follow said sample. On the basis of the above, in these 2(Nskip−1) samples (and, therefore, in the corresponding digital codes) the contribution of the pseudorandom sequence γ·ts is not included.
Once said estimation has been obtained, the cancellation and correlation block 14, included in the calibration block 9, is such as to cancel the input signal (or rather its contribution) from the correlation error estimation for the subsequent minimization of said error (minimization block 29), in order to match the digital gain ĝ to the loop gain GLoop.
Hereunder a particularly preferred embodiment will be described of the cancellation method performed by the calibration block 9 and in particular by the cancellation and calibration block 14.
From formula 2, it can be seen that the result of the conversion Dout of a sample of the sum sequence Vin+ output from the summing node 4 where the pseudorandom sequence γ·ts is present, can be expressed as:
Dout=ĝVin+eq1(ĝ−GLoop)+γts(ĝ−GLoop)+eqrs. (5)
The prediction block 10 produces, starting from the result of conversion of the 2(Nskip−1) samples which precede and follow said sample and which do not include the contribution of the pseudorandom sequence γ·ts, an estimation {circumflex over (D)}out of the code given in formula (5), which can be expressed as:
{circumflex over (D)}out=ĝVin+eq1(ĝ−GLoop)+eqrs+Pr ederr (6)
where Pr ederr represents the error present in the estimation.
The cancellation and correlation block 14 (as shown symbolically by the presence of connections 14i and 14ii in the drawing in
Dout−{circumflex over (D)}out=γts(ĝ−GLoop)+Pr ederr (7)
to then calculate a correlation product (as shown symbolically by the connection 14iii) between said difference (7) and the pseudorandom sequence ts so as to obtain an estimated error of gain mismatch θnew given by:
θnew=ts(Dout−{circumflex over (D)}out)=γ(ĝ−GLoop)+tsPr ederr. (8)
As can be seen from the formula (8), the error θnew, unlike the mismatch error θ given in formula (3), includes a residual correlation noise term θerr
The error θnew can then be minimized in a way known to the skilled in the art, by means of the minimization block 10 which, preferably but not limited to, implements a LMS loop minimization.
It should be observed that advantageously the prediction block 10 is inserted into the calibration block 9 so that it has no influence whatsoever on the digital output (block 13) of the analog/digital converter 1. In this way, even an approximate estimation of the input signal will be sufficient to have the error θerr
It is important to underline that, even if the process to estimate the gain error is effected in a down-sampled way (since the pseudorandom sequence ts is injected once every Nskip clock cycles), the increase in the convergence rate obtained by means of cancellation of the input signal Vin fully compensates said down-sampling, so much so that experimental results have shown that the calibration method of the converter 1 has a convergence rate even 100 times faster than the methods of the prior art.
It should also be considered that the prediction block 10 also operates in a sub-sampled fashion. In the particular embodiment where said block 10 is implemented by means of a digital FIR filter, it has been seen that said filter is very simple to produce since it was observed that, in the case where polynomial interpolation is used, the coefficients of the FIR filter tend rapidly to zero. In practice, to produce a cyclic analog/digital converter (including a 1.5 bit sub-ADC) having a speed of 15 MS/s (mega-symbols per second), a FIR filter with 19 taps is sufficient which, having to operate in down-sampled mode, can be produced by means of a lookup table to store the filter coefficients, a multiplier and an accumulator.
The various embodiments described above can be combined to provide further embodiments. These and other changes can be made to the embodiments in light of the above-detailed description. In general, in the following claims, the terms used should not be construed to limit the claims to the specific embodiments disclosed in the specification and the claims, but should be construed to include all possible embodiments along with the full scope of equivalents to which such claims are entitled. Accordingly, the claims are not limited by the disclosure.
This application is a continuation-in-part of PCT Patent Application No. PCT/IT2006/000117, filed Feb. 27, 2006, now pending, which application is incorporated herein by reference in its entirety.
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Number | Date | Country | |
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20090102688 A1 | Apr 2009 | US |
Number | Date | Country | |
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Parent | PCT/IT2006/000117 | Feb 2006 | US |
Child | 12198709 | US |