I. INTRODUCTION
Recently, visible light communication (VLC) has been receiving increasing attention in the field of indoor communication. It allows light to illuminate a room and transmit data simultaneously. The light-emitting diode (LED) has become the most widely used light source commercially available currently because of its long life, high luminous efficiency, and property of being radiationally harmless. Besides, it can provide a safe environment in a room without light penetration. Because its wavelength is in the range of 375–780 nm, a significant spectrum relief is provided for the crowded radio frequency (RF) spectrum of the traditional wireless communications systems. VLC is strongly applicable in places where electromagnetic radiation is restricted such as airports and hospitals because the signal carried by the light will not cause any interference. The IEEE 802.15.7 Visible Light Communication Task Group has defined a PHY and MAC standard for VLC [1].
Nowadays, faced with the possibility of data explosion, we care more about high-speed, accurate data transmission. In general, the data transmission speed of a single LED can reach 500 Mbps. A number of modulation schemes are introduced in [2] for VLC, such as pulse position modulation (PPM), dual header pulse interval modulation (DH-PIM), and orthogonal frequency division multiplexing (OFDM). Multiple input and multiple output (MIMO) techniques are one of the most effective ways of increasing data transmission speed. Further, indoor communication should be equipped with multiple lights for ensuring sufficient illumination. The concept of optical spatial modulation (OSM) was proposed in [3]. Different from SM in RF, the transmitted signals must be real rather than complex. Mondal et al. [4] analyzed the spatial multiplexing of VLC and enhanced the multiplexing performance. Fath and Haas [5] compared different MIMO techniques for optical wireless communication in indoor environments under the condition of direct line of sight (LOS). Among the three algorithms, namely repetition coding (RC), spatial multiplexing (SMP), and spatial modulation (SM), SM outperforms SMP in terms of robustness in a highly correlated channel and RC in terms of the spatial efficiency. The channels of indoor VLC are highly correlated between each other [3]. Mesleh et al. [6] suggested that transmitter-receiver alignments can reduce this correlation. Fath et al. [7] proposed coded spatial modulation in which convolutional code was used. It was proved that this channel coding algorithm could overcome the effect of the highly correlated channel but with poor efficiency.
For VLC, Fath and Haas [5] used a combination of SM and pulse amplitude modulation (PAM) to transmit multiple bits of information. SM activates only one LED at one time and the location of the LED carries a certain amount of information. However, when only one LED is activated, the multiple brightness levels of PAM cause a high bit error rate (BER). To improve the BER performance, in this paper, we propose an enhanced SM algorithm in which two LEDs are activated at one time, and half the brightness levels are used to maintain a constant transmission rate. For each LED, the transmission power is reduced by the square root of two in order to provide the same signal-to-noise ratio (SNR).
The remainder of this paper is organized as follows: in Section II, the basic channel model is presented. Section III describes the algorithm of the conventional SM and the enhanced SM as well as the demodulation method. The simulation results are presented in Section IV. Finally, Section V presents the conclusion of this paper.
II. SYSTEM MODEL
Our system model is shown in Fig. 1. In our model, each receiver with multiple detectors works under a certain zone of a group of LEDs. It is assumed that different zones would not have any interference with each other. Each group of LEDs has multiple input sources. Our model assumes that the receiver is fixed, and the distance between the lights is relatively close.
Fig. 1.A model of indoor visible light communication.
Considering that the system is under the LOS condition, we can express the received signal as
where s denotes the signal vector to be transmitted and n represents the additive white Gaussian noise (AWGN) with zero mean, double-sided power spectral density En and variance σ2. H stands for the channel matrix with the dimensions of Nr × Nt :
The element hij (i = 1,...,Nr and j = 1,....,Nt) represents the transfer factor between the i-th LED and the j-th detector. Four LEDs and four detectors are considered in an example. Further, every h is generated by the following equations according to [8]:
where and Փ1/2 denotes the transmitter semiangle (at half power), which is assumed to be 15°. Furthermore, ψ1/2 denotes the field-of-view (FOV) semiangle of the receiver. A stands for the area of each detector, assumed to be 1 cm2 in our simulation, and d denotes the distance between the transmitter and the receiver. Փ represents the angle of emergence with respect to the transmitter axis, and ϕ denotes the angle of incidence with respect to the receiver axis. Clearly, the channel coefficient hij depends on the specific positions of the i-th transmitter and the j-th detector. If the detector and the transmitter are not in each other’s FOV, hij = 0.
The experiment is set in a room with a ceiling height of 3m and a table height of 0.75 m. Four lights are located on the ceiling, and a receiver with four detectors is located on the table. The distance between the adjacent light sources is adjustable in our simulation (here, it is set to 0.3 m for example), and the distance between detectors is 0.1 m. The channel matrix is generated as follows when the FOV of a detector is set to 30°:
If FOV decreases to 10°, the channel matrix becomes
Obviously, in (5), the channel coefficient between LED 3 and detector 1 becomes zero and vice versa, making the channel less correlated. If FOV decreases further to 5°, the channel matrix becomes
which produces a completely independent channel.
III. MODULATION ALGORITHM
Multiple signal bits are transmitted at one time by using a combination of different brightness levels and spatial locations of LEDs. Thus, the signal bits are mapped to the spatial information and different intensities.
A. Spatial Modulation
Traditional SM allows one LED to be activated at one time, and our enhanced SM activates two LEDs at one time, with the mapping methods as specified in Tables 1 and 2, respectively.
Table 1.Traditional spatial modulation mapping
Table 2.Enhanced spatial modulation mapping
It can be seen from Table 2 that two types of signals, which differ in two bits, are transmitted by totally different LEDs in order to reduce the BER. For example, ‘00’ activates LEDs 1 and 2, and ‘11’ activates LEDs 3 and 4.
B. Pulse Amplitude Modulation
PAM is used to modulate the intensities of SM. For general modulation, the intensities are given as follows:
where I stands for the average intensity of each light and M denotes the number of levels. Since SM requires a certain number of LEDs to be activated, the intensity equation should eliminate the intensity of ISM=0. Therefore, the equation is modified as follows:
Notice that the mean power does not change after the modification. If M=4 in SM, four intensities are used to represent two-bit information. However, in the enhanced SM, only two intensities that reduce M by half are needed. For example, if the signal to be transmitted is [0100 1010 1111], then the transmitting vector would be
Each row stands for the corresponding number of light and each column stands for a time slot. Every four bits are regarded as a group; further, the former two bits are mapped to the related LEDs, and the latter two bits to the two level intensities.
The comparison of the transmission rate of the enhanced SM and the traditional SM is analyzed as follows: The transmission rate of traditional SM measured in bits is with M intensity levels, while in enhanced SM, the levels are reduced to M/2, which leads to the transmission rate of . In general, more than four LEDs are used in MIMO, which results in an increase in the first part in the case of enhanced SM. In the case that M is not smaller than four, the second part is equal to or more than the traditional SM, which means that in most cases, there is an increase in the transmission rate brought about by the use of the proposed algorithm.
C. Demodulation
The demodulation is based on the maximum likelihood (ML) principle with perfect channel knowledge and ideal time synchronization at the receiver side. In [9], the researchers demonstrated that this is the optimal detection of SM. The detector decides the vector with the minimum Euclidean distance by using the following equation:
where py denotes the probability density function of y conditioned on s, which can be expressed as
where denotes the Frobenius norm. Thus, the detection becomes
D. Power Imbalance
In the cases of both the traditional SM and the enhanced SM, every LED has the same average intensity. However, Fath and Haas [5] have shown that an appropriate power imbalance among the LEDs may influence their performance in terms of the BER. δ is defined as the power imbalance factor in decibels and is the factor on a linear scale.
The induced power imbalance can be calculated by
The factor can neither be too large nor too small, which will cause a large energy loss or little difference between each light, respectively. It has been proved that a value of around 1 dB is a good choice for δ. Note that the mean power emitted by all LEDs remains unchanged.
When the channel is highly correlated, this scheme can be used in our algorithm to improve performance, which is not influenced by the transmission rate or the SNR.
IV. RESULTS AND ANALYSIS
In the case of the traditional SM, in which only one LED is activated at one time, the energy transmitted by the light is proportional to the square of the intensity, that is, I2. In the case of enhanced SM, two of the LEDs are activated at one time, and thus, the intensity of each of the two activated lights would be , making the square of which I2/2. Thus, the whole energy (I2) equals to that in the case of the traditional SM.
BER analysis is an effective way to compare the system performance. The simulation is based on a Monte Carlo simulation in MATLAB, and the BER is calculated using a considerably large number of transmitted signal bits, which are set to 105. Considering that channel H has the attenuation level of 10-5 , and the noise is set at this level, we set the magnitude of Eb to 10-10 for an appropriate SNR. Notice that for a real-world scenario, the actual transmission power is considerably higher than that obtained here, just as demonstrated in [5].
Fig. 2 shows the performance before and after the power imbalance when the distance of each LED=0.3 m and the FOV=30°. It can be concluded that the power imbalance with δ equal to 1dB improves the performance to some degree. It is clear that the enhanced SM exhibits better performance improvement than SM. On the other hand, the performance of enhanced SM is worse in the case of a low SNR, because larger noise has more influence on two LEDs. However, the enhanced SM is superior to SM after the BER reaches 10-2 after the use of the power imbalance.
Fig. 2.The comparison between spatial modulation (SM) and enhanced SM before and after using power imbalance (distance of each light = 0.3 m).
Fig. 3 shows the simulation results obtained when the distance of each light=0.3 m and the FOV=10° and 5° in the case of lowly correlated channels. The results show that under the condition of traditional SM, the BER does not reach 10-3 until the SNR reaches 23 dB. In the case of enhanced SM, in contrast, the BER meets the bound when the SNR is 21 dB. Therefore, we can conclude that the proposed algorithm outperforms the former one in this case.
Fig. 3.Comparison between spatial modulation (SM) and enhanced SM under the condition of lowly correlated channels when the receiving angle is 10°and 5°.
In the case of the independent channel (5°), since there is too much attenuation, both algorithms are worse than in the case of 10°. However, this demonstrates that if any decorrelation schemes are used in the channel, the enhanced SM will still exhibit a better performance.
V. CONCLUSION
In this paper, we propose an enhanced SM algorithm for indoor VLC. The simulation results show that the proposed algorithm outperforms the traditional SM in terms of the BER when the SNR is the same at the transmitter side. The proposed algorithm provides the transmitter with diversity and maintains the same transmission power. Furthermore, it increases the transmission rate as compared to the traditional SM. If the channel is highly correlated, the power imbalance can be used to improve the algorithm performance. If the channel is lowly correlated, the proposed algorithm can exhibit a better performance. Therefore, reducing the channel correlation will be considered in future works.
References
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