Patent Grant
8599972
The present invention relates generally to signal processing in a wireless network and more particularly to estimating a signal-to-interference ratio (SIR) in a wireless receiver.
Receivers in wireless networks typically calculate performance parameters to evaluate the receiver and/or to assess certain network level parameters, such as transmit power, data rate, etc. One performance parameter of particular interest to wireless receivers in a spread spectrum network is the signal-to-interference ratio (SIR) associated with the received signals. Conventional receivers typically calculate the SIR associated with the received signals and use the calculated SIR to adapt the network level parameters to current channel conditions. For example, the calculated SIR may be used to control mobile station transmit power, data transmission rate, mobile station scheduling, etc.
The accuracy of network adaptation to current channel conditions depends on the accuracy of the SIR estimates as well as the amount of time expended to generate the SIR estimates. Currently, there are many ways to estimate the SIR in a spread spectrum network. For example, the receiver may use a combination of chip samples and despread symbols to estimate the SIR. While this approach may provide accurate SIR estimates in a timely manner, this approach requires a complex receiver architecture with access to both chip samples and despread values.
Another receiver may use symbol estimates provided by a RAKE receiver output to estimate the SIR. However, because current RAKE output symbols correspond to symbols received well in the past, the resulting SIR does not correspond to current receiver performance and channel conditions. Therefore, while this approach requires a significantly less complex receiver architecture, the resulting SIR estimates are insufficient for real-time operations, such as power control, rate adaptation, etc.
Still other receivers may use despread symbols (pilot or data) to generate a finger SIR for each finger of a RAKE receiver. Summing the finger SIRs provides an SIR estimate that may be used for real-time operations. However, because the despread symbols typically contain a considerable amount of noise, the resulting SIR estimate is often biased. Conventional networks may remove this bias by subtracting an estimate of the bias from the current SIR estimate. However, the bias estimation process can overestimate the bias. As a result, using subtraction to remove the bias can result in negative, and therefore inaccurate, SIR estimates.
The present invention describes a method and apparatus that removes bias from an initial estimate of signal-to-interference ratio (SIR). In an exemplary embodiment, an SIR processor in an SIR estimator of a wireless receiver comprises an initial SIR calculator, an average SIR calculator, and a bias remover. The initial SIR calculator calculates the initial SIR based on the signal received by the wireless receiver, while the average SIR calculator generates an average SIR. Using the average SIR, the bias remover removes the bias from the initial SIR.
In an exemplary embodiment, the SIR estimator derives despread values from the baseband signal r(t). The SIR estimator uses the despread values to generate channel estimates and noise statistics, which are in turn used by the SIR processor to calculate the initial and average SIR estimates.
Further, according to an exemplary embodiment of the present invention, the bias remover generates a scaling factor based on the average SIR and an offset parameter, where the offset parameter is derived from a count of the despread values processed by the wireless receiver. In this embodiment, the bias remover comprises a converter that generates the scaling factor and a multiplier that multiplies the initial SIR by the scaling factor to remove the bias from the initial SIR.
Base station 12 includes one or more antennas 14 for transmitting/receiving spread spectrum signals with one or more symbols to/from mobile station 20. The transmitted signals typically include traffic and pilot signals. Objects, such as interfering object 18, cause multiple “echoes” or delayed versions of the transmitted symbols to arrive at mobile station 20 at different times. Receiver 16 processes the multiple symbol images at mobile station 20. Similarly, mobile station 20 may transmit symbols via one or more antennas 22 along multiple paths to base station 12, where receiver 16 processes the multiple received symbol images.
As shown in
One way to reduce the bias associated with the SIR estimate is to reduce the noise present in the channel estimates c used to generate the SIR estimate. At low Doppler spreads, this may be accomplished by smoothing the channel estimates c over time. However, time sensitive network operations that rely on accurate SIR estimates often cannot wait the amount of time required to smooth the channel estimates c. As such, this method is not useful for time sensitive operations.
Another way to reduce bias is to generate an initial SIR estimate and to remove bias from the initial SIR estimate. WO 01/65717 entitled “Correction of Received Signal and Interference Estimates,” incorporated herein by reference, describes an SIR estimator 32 that may be used to remove bias from an initial SIR estimate.
where K represents the number of pilot symbols processed by the receiver 16, b(i) represents a known pilot symbol for the ith symbol period, b*(i) represents the complex conjugate of b(i), and y(i) represents the vector of despread symbols or values from different path delays for the ith symbol period.
The despread values y, along with the channel estimates c, are also provided to the noise statistics estimator 56. Noise statistics estimator 56 estimates the noise statistics between the despread symbols y from different path delays. The noise statistics may be any statistics that represent the noise elements of the despread symbols y, such as 2nd order statistics or correlations between the noise on the despread symbols. Because those skilled in the art will appreciate that “covariance” is a special case of “cross-correlation” with zero mean, the terms “correlation” and “covariance,” as used herein, should be understood as interchangeable unless the context of a particular passage makes an explicit distinction between the two terms.
In an exemplary embodiment, noise statistics estimator 56 estimates the correlation matrix M between the impairment on the despread symbols y according to either of Equations 2A or 2B:
where superscript “H” denotes the conjugate transpose. A noise statistics matrix, referred to herein as noise correlation matrix RN, may be obtained, for example, by setting RN equal to M. Alternatively, noise correlation matrix RN may be obtained by smoothing past M values, using an exponential filter, and then setting RN equal to the smoothed M. It will be appreciated that because M and RN are Hermitian symmetric, only the upper or lower triangles of these matrices have to be computed, which greatly simplifies the calculation complexity.
Those skilled in the art will appreciate that the present invention is not limited to the above described noise statistics calculation methods. Indeed, noise correlation matrix RN may be calculated according to any means known in the art. Exemplary methods are described in U.S. patent application Ser. No. 10/811,699 entitled “Impairment Correlation Estimation in a Spread Spectrum System” and filed 29 Mar. 2004, and U.S. patent application Ser. No. 10/800,167 entitled “Method and Apparatus for Parameter Estimation in a Generalized RAKE Receiver” and filed 12 Mar. 2004, both of which are incorporated herein by reference.
SIR processor 100 derives SIRfinal from the channel estimates c and the noise correlation matrix RN as described further below. It will be appreciated that due to the time sensitive nature of SIR estimation for some network operations, channel estimates c refer to values that may be formed using short-term data for the purposes of SIR estimation. Therefore, the SIR estimation channel estimates c may differ from the channel estimates calculated for a demodulator, where time delays are not as critical. As a result, a demodulator (not shown) in baseband processor 30 may use a different channel estimator that generates different channel estimates based on, for example, long-term data. While the present invention describes an SIR processor 100 that uses different channel estimates than those used in the demodulator, it will be appreciated by those skilled in the art that the SIR processor 100 and the demodulator could share channel estimates provided by a single channel estimator to simplify the receiver architecture.
To that end, weight calculator 108 calculates a vector of weighting factors w based on the channel estimates c according to any known means. For example, when receiver 16 includes a traditional RAKE receiver, weighting factors w may be approximated according to Equation 3:
w=c. (Eq. 3)
However, when receiver 16 includes a generalized RAKE (G-RAKE) receiver, weight calculator 108 may use both the channel estimates c and the noise correlation matrix RN to calculate the weighting factors w according to:
w=RN−1c. (Eq. 4).
(The interested reader may refer to “A Generalized RAKE Receiver for Interference Suppression” by G. Bottomley, T. Ottosson, and Y.-P. E. Wang, published in IEEE Journal Selected Areas Communications, 18:1536-1545, August 2000 to learn more about G-RAKE receivers). Alternatively, the weighting factors w may be calculated according to other methods, such as those described in U.S. patent application Ser. No. 10/672,127 entitled “Method and Apparatus for RAKE Receiver Combining Weight Generation” filed 26 Sep. 2003, and incorporated herein by reference. According to this method, weighting factors w may be calculated according to:
w=Fc, (Eq. 5)
where F depends on channel and noise statistics. In any event, it will be appreciated that, as with the channel estimates, weighting factors w refer to values that may be formed using short-term data for the purposes of SIR estimation. Therefore, the SIR estimation weighting factors w may differ from the weighting factors calculated for a demodulator, where time delays are not as critical. As a result, the SIR processor 100 of the present invention includes a weight calculator 108 that may derive weighting factors w different from those used by the demodulator. However, it will be appreciated by those skilled in the art that the SIR estimator 32b and the demodulator could share weighting factors provided by a single weight calculator to simplify the receiver architecture.
Based on the calculated weighting factors w, initial SIR calculator 102 calculates the signal and noise power estimates used to compute SIRinit. More particularly, signal power estimator 110 generates an estimate of the overall signal power Ŝ based on the channel estimates c and the weighting factors w according to any means known in the art.
Ŝ=|wHc|2. (Eq. 6)
Noise power estimator 116 generates an overall noise power estimate {circumflex over (N)} based on the noise correlation matrix RN and the weighting factors w according to any means known in the art. An exemplary noise power estimator 116 comprising a quadratic computer 118, as illustrated in
{circumflex over (N)}=wHRNw. (Eq. 7)
Divider 120 divides the signal power estimate Ŝ by the noise power estimate {circumflex over (N)} to generate the initial SIR estimate SIRinit. Bias remover 106 further refines SIRinit by removing bias from SIRinit using an average SIR estimate (
Signal statistics estimator 122 calculates a signal correlation matrix Q based on the channel estimates c and the noise correlation matrix RN. An exemplary signal statistics estimator 122 is shown in
P=E{ccH}, (Eq. 8)
where E{ } denotes the expected value. It will be appreciated that because P is Hermitian symmetric, only the upper or the lower triangles of the channel estimate correlation matrix have to be computed, which can greatly simplify the calculation complexity of the present invention.
Because the channel estimates c include noise due to estimation error, channel estimate correlation matrix P represents a biased estimate of the signal correlation matrix Q. Therefore, to remove the bias, signal statistics estimator 122 subtracts a scaled version of the noise correlation matrix, provided by multiplier 136, in combiner 138 to generate the signal correlation matrix Q, as shown in Equation 9:
where β depends on the number (K) of despread symbols used to estimate the vector of channel estimates c. K may also include relative power or energy levels between pilot and traffic data. When K is large, or when there is interest in simplifying operations, Q may be set equal to P.
Signal statistics estimator 122 provides signal correlation matrix Q to signal quadratic computer 124, which calculates an average signal power
Similarly, noise quadratic computer 126 uses noise correlation matrix RN to calculate an average noise power
Divider 128 generates the average SIR (
where α represents an offset parameter derived from the number (K) of despread symbols used to generate the channel estimates c. K may also include relative power or energy levels between pilot and traffic data. In a preferred embodiment, the offset parameter α may be calculated according to α=1/K. Multiplier 131 removes bias from the initial SIR estimate SIRinit and generates the final SIR estimate SIRfinal by scaling the initial SIR estimate SIRinit using the scaling factor f provide by converter 130.
Turning now to
SIRinit=cHRN−1c. (Eq. 13)
Note: those skilled in the art will appreciate that there are many ways to simplify the above calculation. For example, Gauss-Seidel may be used to obtain RN−1c first.
As with the first embodiment, bias remover 154 uses an average SIR estimate
where Tr{ } denotes the Trace of the product of RN−1 and Q. The Trace of a matrix may be computed in any of a number of ways. For example, one way to compute the Trace of the product of RN−1 and Q is to solve for the columns of the product by solving:
RNy=q, (Eq. 15)
where q is a column of Q. Equation 15 may be solved using the Gauss-Seidel or Gauss-Jordan iterative approach, for example.
Another way to solve Equation 15, and therefore to approximate the Trace of the product of RN−1 and Q, is to assume that the noise correlation matrix RN and the signal correlation matrix Q are diagonal. This may be established by ignoring the off-diagonal elements of RN and Q and/or setting the off-diagonal elements to zero. In either case, the average SIR estimate
wherein J represents the number of delay paths processed by the receiver. Because the off-diagonal elements are ignored (or set to zero), the off-diagonal elements of Q do not need to be calculated, which saves processing time. This approach for estimating
Still another way to approximate the Trace of the product of RN−1 and Q is to assume that the noise correlation matrix RN is diagonal and that the noise associated with each delay path processed by the receiver is stationary noise, and therefore, has the same noise power N. As a result, the diagonal elements of the noise correlation matrix RN are equivalent. Therefore,
where J represents the number of fingers or delay paths processed by the receiver. It will be appreciated that the assumption that the noise correlation matrix RN is diagonal also simplifies the SIRinit calculation. As a result, Equation 13 simplifies to the sum of the finger signal power values divided by the noise power N.
Once
where α is an offset parameter that may be calculated according to α=J/K, where J represents the number of delay paths processed by the receiver and K represents the number of symbols used to calculate the channel estimates c.
To that end, initial SIR calculator 170 comprises a channel estimation processor 174 and an inverse quadratic computer 172. Channel estimation processor 174, shown in
where K represents the number of despread symbols used to calculate the channel estimates c and may also include the effects of power level differences between pilot and traffic data. Because channel estimation matrix A depends on the signal statistics Q and the noise statistics RN, as shown in Equation 19, channel estimation matrix A provides a form of MMSE (Minimum Mean Square Error) channel estimation.
Channel estimation processor 174 refines the original channel estimates c by applying the channel estimation matrix A to the channel estimates c in matrix multiplier 178 to generate the modified channel estimates {tilde over (c)}. Initial SIR calculator 170 then calculates the initial SIR estimate SIRinit in inverse quadratic computer 172 using the modified channel estimates {tilde over (c)}, as shown in Equation 20:
SIRinit={tilde over (c)}HRN−1{tilde over (c)}. (Eq. 20).
As shown by Equation 20, the embodiment of
Further, channel estimation matrix A also modifies the average SIR estimate
The second average SIR estimate
As shown in Equation 22,
where α may be calculated as α=(1/K)Tr{AH A}. In some embodiments it may be desirable to simplify the computations associated with
The above describes a method and an apparatus for removing bias from an initial SIR estimate SIRinit to calculate a final SIR estimate SIRfinal.
While the SIR processor 100 of the present invention is shown having various separate components, those skilled in the art will appreciate that two or more of these components may be combined into the same functional circuit. Further, those skilled in the art will appreciate that one or more of these circuits may be embodied in hardware and/or software (including firmware, software, micro-code, etc.), including an application specific integrated circuit (ASIC), field programmable gate array (FPGA), etc. Software or code to implement the present invention may be stored in any known computer readable medium.
As shown in
Because the above described method and apparatus may compute SIRfinal relatively instantaneously, the resulting final SIR estimate SIRfinal may be used in real-time operations, such as power control, rate adaptation, etc. Further, unlike past solutions, the present invention may avoid the problem of a negative final SIR estimate SIRfinal by multiplying the initial SIR estimate SIRinit by a scaling factor f to remove bias. Preliminary tests have shown that the multiplicative approach of the present invention, as compared to the conventional subtractive approach, may improve the accuracy of a final SIR estimate by 20% for a standard RAKE receiver. The accuracy improvements are even greater (40%-70%) in receivers that use a grid approach to finger placement, as described in U.S. patent application Ser. No. 10/653,679 and entitled “Method and Apparatus for Finger Placement in a DS-CDMA RAKE Receiver,” filed 2 Sep. 2003. As a result, the present invention describes an improved method and apparatus for providing accurate final SIR estimates for time sensitive operations.
While the above describes calculating a final SIR estimate SIRfinal for real-time operations, it will be appreciated by those skilled in the art that the final SIR estimate may also be used to determine a long term SIR. For example, final SIR estimates computed over one or more frames may be averaged to generate a long-term SIR estimate. This long-term SIR estimate may be provided to a base station or other network entity as a long-term quality measure. Further, once this long-term SIR estimate is computed, SIR processor 100 may use the long-term SIR estimate as the average SIR estimate used to calculate the scaling factor f.
The above also describes the invention in terms of despread symbols y derived from the baseband signal r(t). It will be appreciated by those skilled in the art that these despread symbols may be based on pilot symbols, data symbols, and/or a pilot channel that is treated as a continuous series of pilot symbols. Further still, the number of symbols and/or the type of symbols may be selectively changed based on the current channel conditions. For example, a Doppler spread estimator may be used to determine how quickly a channel is changing. If the channel is changing rapidly, only the symbols from a single time slot, for example, may be used. If the channel is changing slowly, then symbols from multiple past slots may be used. For the slowly changing channels, channel estimator 36 and/or noise statistics estimator 56 may exponentially weight the contributions from older slots and/or compensate each slot for changes in the transmit power due to power control.
While the above wireless network was described in terms of a single transmit and/or receive antenna, the present invention is not so limiting and may be applied to networks with multiple transmit and/or receive antennas. In this case, fingers of the spread spectrum receiver are assigned to certain paths from certain antennas. Therefore, vector quantities, such as the despread symbols, channel estimates, etc., may still be collected into vectors. However, for the multiple transmit/receive antenna system, the elements in the vectors have both a path and an antenna index. For example, when there are two receive antennas, where each antenna receives signals from two different paths, the vector quantities are of length four and the matrices are of size 4×4. Further, for the multiple transmit antenna system in which different scrambled spreading codes are used on the different transmit antennas, it is typically reasonable to assume that noise and fading terms are uncorrelated. As a result, SIR processor 100 may separately generate an initial SIR estimate for each transmitted signal and then sum the individual initial SIR estimates to obtain an overall initial SIR estimate SIRinit. In this scenario, bias removal may occur either before or after the summation. It will also be appreciated that the present invention may be used with transmit diversity systems.
The present invention may, of course, be carried out in other ways than those specifically set forth herein without departing from essential characteristics of the invention. The present embodiments are to be considered in all respects as illustrative and not restrictive, and all changes coming within the meaning and equivalency range of the appended claims are intended to be embraced therein.
| Number | Name | Date | Kind |
|---|---|---|---|
| 5875215 | Dobrica | Feb 1999 | A |
| 6002715 | Brailean et al. | Dec 1999 | A |
| 6028894 | Oishi et al. | Feb 2000 | A |
| 6034952 | Dohi et al. | Mar 2000 | A |
| 6108374 | Balachandran et al. | Aug 2000 | A |
| 6137788 | Sawahashi et al. | Oct 2000 | A |
| 6144861 | Sundelin et al. | Nov 2000 | A |
| 6157820 | Sourour et al. | Dec 2000 | A |
| 6259752 | Domino et al. | Jul 2001 | B1 |
| 6292519 | Popovic | Sep 2001 | B1 |
| 6385183 | Takeo | May 2002 | B1 |
| 6426971 | Wu et al. | Jul 2002 | B1 |
| 6618433 | Yellin | Sep 2003 | B1 |
| 20020034216 | Yanagi | Mar 2002 | A1 |
| 20020115468 | Haim | Aug 2002 | A1 |
| 20020141486 | Bottomley et al. | Oct 2002 | A1 |
| 20020159514 | Miyoshi et al. | Oct 2002 | A1 |
| 20020186761 | Corbaton et al. | Dec 2002 | A1 |
| 20020196879 | Iochi | Dec 2002 | A1 |
| 20030016740 | Jeske et al. | Jan 2003 | A1 |
| 20030031135 | Itoh | Feb 2003 | A1 |
| 20030031279 | Blount et al. | Feb 2003 | A1 |
| 20030058821 | Lee et al. | Mar 2003 | A1 |
| 20030096618 | Palenius | May 2003 | A1 |
| 20030114179 | Smolyar et al. | Jun 2003 | A1 |
| 20030189979 | Li et al. | Oct 2003 | A1 |
| Number | Date | Country |
|---|---|---|
| 1 111 815 | Jun 2001 | EP |
| 1239615 | Sep 2002 | EP |
| 1 341 335 | Sep 2003 | EP |
| 2382748 | Jun 2003 | GB |
| WO 0101601 | Jan 2001 | WO |
| WO 0156183 | Aug 2001 | WO |
| WO 0165717 | Sep 2001 | WO |
| WO 03049337 | Jun 2003 | WO |
| WO 03061184 | Jul 2003 | WO |
| WO 03063376 | Jul 2003 | WO |
| Entry |
|---|
| A. Sampath and D.R. Jeske, “Analysis of signal-to-interference ratio estimation methods for wireless communications systems,” in Proc. IEEE Intl. Conf. Commun. (ICC), Jun. 2001, pp. 2499-2503. |
| L. M. A. Jalloul, M. Kohlmann and J. Medlock, “SIR estimation and closed-loop power control for 3G,” in Proc. IEEE Veh. Technol. Conf. (VTC), Orlando, FL, Oct. 6-9, 2003. |
| C. Cozzo, G.E. Bottomley, and A.S. Khayrallah, “RAKE receiver finger placement for realistic channels,” in Proc. IEEE Wireless Commun. and Networking Conf. (WCNC), Atlanta, GA, Mar. 21-25, 2004. |
| 3rd Generation Partnership Project (3GPP), TR 25.943, v5.1.0, Jun. 2002. |
| C. Cozzo and G.E. Bottomely, “DS-CDMA SIR Estimation with Bias Removal,” at IEEE WCNC Conference, Mar. 2005. |
| U.S. Appl. No. 10/869,527, filed Jun. 16, 2004, Wang, et al.; Benign Interference Suppression for Received Signal Quality Estimation; 45 pgs. |
| U.S. Appl. No. 60/580,202, filed Jun. 16, 2004, Wallén; Reduction of SIR Estimation Bias Under Frequency Error; 14 pgs. |
| Bottomley, G.E., Ottosson, T., and Wang, Y.-P. E, “A generalized RAKE receiver for interference suppression,” IEEE J. Sel. Areas in Commun., vol. 18, Aug. 2000, pp. 1536-1545. |
| Lee, C.-C. and Steele, R., “Closed-loop power control in CDMA systems,” IEEE Proc.-Commun., vol. 143. Aug. 1996, pp. 231-239. |
| Usuda, M., Ishakawa, Y., and Onoe, S., “Optimizing the number of dedicated pilot symbols for forward link in W-CDMA systems,” in Proc. IEEE Veh. Technol. Conf., Tokyo, Japan, May 15-18, 2000, pp. 2118-2122. |
| Dohi, T., Okumura, Y., and Adachi, F., “Further results on field experiments of coherent wideband DS-CDMA mobile radio,” IEICE Trans. Commun., vol. E81-B, No. 6, Jun. 1998, pp. 1239-1247. |
| Higuchi, K., Andoh, H., Sawahashi, M., and Adachi, F., “Experimental evaluation of combined effect of coherent Rake combining and SIR-based fast transmit power control for reverse link of DS-CDMA mobile radio,” IEEE J. Sel. Areas Commun., vol. 18, Aug. 2000, pp. 1526-1535. |
| Wiesel, A., Goldberg, J., and Messer, H., “Data-aided signal-to-noise-ratio estimation in time selective fading channels,” in Proc. IEEE Intl. Conf. on Acoustics, Speech, and Sig. Proc. (ICASSP), Orlando, May 13-17, 2002, pp. III-2197-III-2200. |
| Falahati, S., Svensson, A., Ekman, T., and Sternad, M., “Effect of channel prediction errors on adaptive modulation systems for wireless channels,” in Proc. RadioVetenskap och Kommunikation 02 (RVK-02), Stockholm, Sweden, Jun. 10-13, 2002. |
| Boudreau, D., et al., “Wide-band CDMA for the UMTS/IMT-2000 satellite component,” IEEE Trans. Veh. Technol., vol. 51, Mar. 2002, pp. 306-331. |
| Gunaratne, S., Taaghol, P., and Tafazolli, R., “Signal quality estimation algorithm,” IEEE Electronics Letters. vol. 36, Oct. 26, 2000, pp. 1882-1884. |
| Wiesel, A., Goldberg, J., and Messer, H., “Non-data-aided signal-to-noise-ratio estimation,” in Proc. IEEE Intl. Conf. Commun. (ICC), New York, NY, Apr. 28-May 2, 2002. pp. 197-201. |
| Wiesel, A., Goldberg, J., and Messer, H., “Signal-to-noise-ratio estimation in time selective fading channels,” Thesis Presentation, Tel Aviv University, Mar. 2002. |
| Fahmer, A., Dieterich, H., and Frey, T., “SIR estimation for fast power control for FDD-UMTS,” in Proc. IEEE Veh. Technol. Conf. (VTC), Vancouver, Canada, Sep. 24-28, 2002, pp. 1274-1278. |
| Yoon, Y.-S., and Lee, Y.-H, “Adaptive SIR estimation in WCDMA systems,” in Proc. IEEE Veh. Technol. Conf. (VTC), Birmingham, Alabama, May 6-9, 2002, pp. 275-279. |
| Ekman, T., Sternad, M., and Ahlén, A., “Unbiased power prediction of Rayleigh fading channels,” in Proc. IEEE Veh. Technol. Conf. (VTC), Vancouver, Canada, Sep. 24-28, 2002, pp. 280-284. |
| Hua, Z., “Traffic channel SIR estimation based on reverse pilot channel,” in Proc. IEEE ICCT, Bejing, China, Apr. 9-11, 2003. |
| Pauluzzi, D., and Beaulieu, N., “A comparison of SNR estimation techniques for the AWGN channel,” IEEE Trans. on Commun., vol. 48, No. 10, Oct. 2002, pp. 1681-1691. |
| Won, S.H., Kim, W.W., Ahn, J., and Lyn, D.-S., “An unbiased signal-to-interference ratio estimator for high speed downlink packet access system,” ETRI Journal, vol. 25, No. 5. Oct. 2003. |
| Gunaratne, S., Jeans, T.G., Tafazolli, R., and Evans, B.G., “Comparison of SIR estimation techniques for closed-loop power control in the WCDMA system,” in Proc. European Wireless 2002 Conf., Florence, Italy, Feb. 25-28, 2002. |
| Cheng, J.-F., Wang, Y.-P.E., and Parkvall, S., “Adaptive incremental redundancy,” in Proc. IEEE VTC Conf., Fall 2003. |
| Seo, S., Dohi, T., and Adachi, F., “SIR-based transmit power control of reverse link for coherent DS-CDMA mobile radio,” IEICE Trans. on Commun., vol. E-81, No. 7. Jul. 1998. |
| 3GPP TS 25.101 V5.7.0. (Jun. 2003); 3rd Generation Partnership Project; Technical Specification Group Radio Access Network; User Equipment (UE) radio transmission and reception (FDD) (Release 5); 96 pgs. |
| 3GPP TS 25.214 V5.3.0 (Dec. 2002); 3rd Generation Partnership Project; Technical Specification Group Radio Access Network; Physical layer procedures (FDD) Release 5; 63 pgs. |
| Number | Date | Country | |
|---|---|---|---|
| 20050281358 A1 | Dec 2005 | US |
