PAPR Distribution Analysis at the Output of Nonlinear PAPR Reducers ()
1. Introduction
Orthogonal Frequency Division Multiplexing (OFDM) is an attractive modulation technique for the next generation of high bit rate wireless transmission due to its high robustness to multipath fading and its great simplification of channel equalization [1]. However, one of the main problems of the OFDM modulation technique is the large peak-to-average power ratio (PAPR) of the transmitting signals. This high PAPR causes in-band and out-band interferences when the OFDM signals are passed through a high power amplifier (HPA) which does not have enough linear range. Several PAPR reduction techniques have been proposed [2] to reduce the PAPR of OFDM signals. To well understand this PAPR problem and to predict possible gain thanks to reduction techniques, many papers were interested in the PAPR distribution analysis. The pionneer work was the work of R. van Nee and A. de Wild in [3]. But this expression was obtained at the Nyquist frequency and therefore did not represent a realistic value of the continuous signal PAPR distribution. Then, using a probabilistic approach, Ochiai et Imai proposed a more realistic expression in [4]. Later, Zhou et Caffery in [5] proposed an upper bound of the Complementary Cumulative Distribution Function (CCDF) of the PAPR. Louet and Hussain in [6] proposed a new expression for continuous baseband OFDM signals. This latter expression was very close to the continuous signal PAPR simulation.
But, only few papers are dealing with PAPR distribution analysis at the output of PAPR reducers. Some researchers proposed a PAPR distribution analysis when there is unequal power allocation between carriers [7]. In [8], YOO et al. studied the PAPR distribution at the ouput of probabilistic PAPR reducer. In this paper we are interrested in the PAPR distribution analysis at the output of PAPR reducers. We will, first of all, focus on the class of PAPR reduction techniques known as nonlinear PAPR reducers, i.e. the schemes for PAPR reduction that use spectrum distortion or spectral regrowth. This class of nonlinear PAPR reducers includes mainly clipping techniques [9] and companding techniques [10]. We derive a general expression of the CCDF at the ouput of non-linear reducers. Then, we apply this expression to the Soft Envelop Clipping (SEC) reducer.
The remainder of this paper is organized as follows: Section 2 briefly introduces nonlinear PAPR reducers. In Section 3, the PAPR distribution is analyzed through its Complementary Cumulative Distribution Function (CCDF). Then in Section 4 results of previous analysis is applied to Soft Enveloppe Clipping reducer. In this section, we provided some results which show good agreement between simulation and theoretical expressions. Finally in Section 5, a conclusion is drawn.
2. Characterization of Nonlinear PAPR Reducers
Let, be the baseband equivalent time-domain OFDM signal. can be written as
(1)
where is the OFDM magnitude, is the OFDM phase and is the OFDM symbol period.
The PAPR of may be defined as
(2)
where is the signal average power.
In nonlinear PAPR reducers (clipping, companding techniques), the data signal PAPR is reduced by a nonlinear function as shown in Figure 1.
Now, let us suppose the nonlinear function that characterizes the nonlinear PAPR reducer shown in Figure 1, the PAPR reduced signal at the output of PAPR reduction scheme is expressed as
(3)
where is nonlinear positive function also called function for PAPR reduction.
3. PAPR Distribution Analysis
In the literature, it is customary to use the Complementary Cumulative Distribution Function (CCDF) of the PAPR as a performance criterion. Let us consider and the discrete-time signals at the Nyquist rate of the OFDM signal and its PAPR reduced version respectively. For a large number of subcarriers, the OFDM envelope converges to a Rayleigh envelope distribution. Therefore, the probability density function (PDF) of the OFDM envelope can be expressed as
(4)
where is the mean power OFDM signal.
Using (4), it was shown in [4] that, the OFDM PAPR CCDF could be approximated by the following expression:
Figure 1. Nonlinear PAPR reducer scheme.
(5)
where, is the number of samples per OFDM symbol period. This PAPR CCDF expression has been proved for the first time by R. van Nee and A. de Wild in [3].
In the same way as (5), we show that the PAPR distribution of the ouput signal could be approximated by Equation (6):
(6)
Using (2), it can be shown that, and Equation (6) becomes
(7)
Equation (7) shows that, the expression of depends on the function for PAPR reduction. In the following section of this paper, an exact expression of is given in the soft envelop clipping’s case [9].
4. PAPR Distribution in the Soft Envelope Clipping Technique’s Case
In this section, in order to illustrate the theoretical results obtained for nonlinear PAPR reducers, we consider one nonlinear PAPR reducer which is commonly studied in the literature: The Soft Envelop Clipping (SEC) [9].
The nonlinear function of SEC is expressed as
(8)
where is the magnitude threshold and commonly known as clipping threshold.
It is shown in [11] that the PDF of the clipped signal envelope can be written as
(9)
where is the Dirac impulse. From (9), we show that,
(10)
where is the clipping ratio (CR) and is the output-to-input average power ratio defined as
(11)
where is the function for PAPR reduction defined in (8) and is the PDF of the OFDM signal expressed in (4).
Substituting (10) into (7), we show that, the expression of for SEC is expressed as
(12)
when becomes great and tends to infinity, then tends to and expression 12 is equal to classical expression 5 of the CCDF at the input of the clipping.
Figure 2 compares the theoretical CCDF of the signal’s PAPR at the output of the PAPR reduction scheme expressed by (7), and this for simulation results obtained with three different values of. The OFDM signal comprises subcarriers and is simulated with an oversampling factor of. It should be noted that, the theoretical shows good agreement with the simulation results. Nevertheless, where dB and 5 dB, the theoretical is less accurate with the simulation results where dB. The reason for this is that, for low values of, the theoretical tends to be a Dirac and becomes very sensitive to approximation errors.
5. Conclusions
In this paper, assuming that the baseband OFDM signal is characterized as a band-limited complex Gaussian process, we have investigated the PAPR distribution of an OFDM signal at the output of a nonlinear PAPR reducer. The obtained PAPR distribution has been applied in the clipping case, which is a well-known example of nonlinear PAPR reducer used for OFDM PAPR reduction.
The comparisons made between the proposed PAPR
Figure 2. Comparison of the proposed distributions for the PAPR related to the clipping technique (12) with simulation results for ρ = 3 dB, 5 dB and 7 dB.
distribution at the output of clipping and with that obtained thanks to computer simulations show good agreement.