As reiterated in the previous article, a MIMO system is used to increase the capacity dramatically and also to improve the quality of a communication link. Increased capacity is obtained by spatial multiplexing and increased quality is obtained by diversity techniques (Space time coding). Capacity of MIMO system over a variety of channels (AWGN, fading channels) is of primary importance. It is desirable to know the capacity improvements offered by a MIMO system over the conventional SISO system. The capacity equations for a conventional SISO system over AWGN and fading channels were discussed in the earlier articles. As a per-requisite, readers are encouraged to go through the detailed discussion on channel capacity and Shannon’s Theorem too.
For those who are directly jumping here (without reading the article on SISO channel capacity), a few definitions are given below.
Entropy
The average amount of information per symbol (measured in bits/symbol) is called Entropy. Given a set of N discrete information symbols – represented as random variable
Entropy is a measure of uncertainty of a random variable
Entropy hits the lower bound of zero (no uncertainty, therefore no information) for a completely deterministic system (probability of correct transmission
Capacity and mutual information
Following figure represents a discrete memory less (noise term corrupts the input symbols independently) channel, where the input and output are represented as random variables
For such a channel, the mutual information
The information capacity C is obtained by maximizing this mutual information taken over all possible input distributions p(x) [1].
MIMO flat fading Channel model
A
where,
![\mathbf{K}_x \triangleq E[\mathbf{x}\mathbf{x}^H]](https://s0.wp.com/latex.php?latex=%5Cmathbf%7BK%7D_x+%5Ctriangleq+E%5B%5Cmathbf%7Bx%7D%5Cmathbf%7Bx%7D%5EH%5D&bg=ffffff&fg=000&s=0&c=20201002)
Note: The trace of the covariance matrix of the transmit vector gives the average transmit power,
![Tr(\mathbf{K}_x) = E[\left \| \mathbf{x} \right \| ^2] \leq P_t](https://s0.wp.com/latex.php?latex=Tr%28%5Cmathbf%7BK%7D_x%29+%3D+E%5B%5Cleft+%5C%7C+%5Cmathbf%7Bx%7D+%5Cright+%5C%7C+%5E2%5D+%5Cleq+P_t&bg=ffffff&fg=000&s=0&c=20201002)
Signal Covariance Matrices
It was assumed that the input signal vector
In the above equation, the
![\mathbf{K}_x = E[ \mathbf{X} \mathbf{X}^H]](https://s0.wp.com/latex.php?latex=%5Cmathbf%7BK%7D_x+%3D+E%5B+%5Cmathbf%7BX%7D+%5Cmathbf%7BX%7D%5EH%5D&bg=ffffff&fg=000&s=0&c=20201002)
![\mathbf{K}_y = E[ \mathbf{Y} \mathbf{Y}^H]](https://s0.wp.com/latex.php?latex=%5Cmathbf%7BK%7D_y+%3D+E%5B+%5Cmathbf%7BY%7D+%5Cmathbf%7BY%7D%5EH%5D&bg=ffffff&fg=000&s=0&c=20201002)
![\mathbf{K}_n = E[ \mathbf{N} \mathbf{N}^H]](https://s0.wp.com/latex.php?latex=%5Cmathbf%7BK%7D_n+%3D+E%5B+%5Cmathbf%7BN%7D+%5Cmathbf%7BN%7D%5EH%5D&bg=ffffff&fg=000&s=0&c=20201002)
Channel State Information
The knowledge of the channel matrix
MIMO capacity discussion for CSIT known and unknown cases at the transmitter will be discussed later.
Capacity with transmit power constraint
Now, we would like to evaluate capacity for the most practical scenario, where the average power, given by
![P = Tr(\mathbf{K}_x) = E[\left \| \mathbf{x} \right \| ^2]](https://s0.wp.com/latex.php?latex=P+%3D+Tr%28%5Cmathbf%7BK%7D_x%29+%3D+E%5B%5Cleft+%5C%7C+%5Cmathbf%7Bx%7D+%5Cright+%5C%7C+%5E2%5D+&bg=ffffff&fg=000&s=0&c=20201002)
For the further derivations, we assume that the receiver possesses perfect knowledge about the channel. Furthermore, we assume that the input random variable X is independent of the noise N and the noise vector is zero mean Gaussian distributed with covariance matrix
Note that both the input symbols in the vector
Since it is assumed that the channel is perfectly known at the receiver, the uncertainty of the channel h conditioned on X is zero, i.e,
Following the procedure laid out here, the differential entropy
![h_d(\mathbf{N})= log_2(det[ \pi e \mathbf{K}_n ]) \quad\quad\quad (10)](https://s0.wp.com/latex.php?latex=h_d%28%5Cmathbf%7BN%7D%29%3D+log_2%28det%5B+%5Cpi+e+%5Cmathbf%7BK%7D_n+%5D%29+%5Cquad%5Cquad%5Cquad+%2810%29+&bg=ffffff&fg=000&s=2&c=20201002)
Using \((6)\) and the similar procedure for calculating
![h_d (\mathbf{Y}) = log_2(det[ \pi e (\mathbf{H} \mathbf{K}_x \mathbf{H}^H + \mathbf{K}_n +\mathbf{K}_n) ]) \quad\quad\quad (11)](https://s0.wp.com/latex.php?latex=h_d+%28%5Cmathbf%7BY%7D%29+%3D+log_2%28det%5B+%5Cpi+e+%28%5Cmathbf%7BH%7D+%5Cmathbf%7BK%7D_x+%5Cmathbf%7BH%7D%5EH+%2B+%5Cmathbf%7BK%7D_n+%2B%5Cmathbf%7BK%7D_n%29+%5D%29+%5Cquad%5Cquad%5Cquad+%2811%29+&bg=ffffff&fg=000&s=2&c=20201002)
Substituting equations (10) and (11) in (9), the capacity is given by
For the case, where the noise is uncorrelated (spatially white) between the antenna branches,
Thus the capacity for MIMO flat fading channel can be written as
![\boxed{C= log_2 \left[ det \left( \mathbf{I}_{N_{r}} + \frac{1}{ \sigma_n^2 } \mathbf{H} \mathbf{K}_x \mathbf{H}^H \right) \right]} \quad\quad\quad (13)](https://s0.wp.com/latex.php?latex=%5Cboxed%7BC%3D+log_2+%5Cleft%5B+det+%5Cleft%28+%5Cmathbf%7BI%7D_%7BN_%7Br%7D%7D+%2B+%5Cfrac%7B1%7D%7B+%5Csigma_n%5E2+%7D+%5Cmathbf%7BH%7D+%5Cmathbf%7BK%7D_x+%5Cmathbf%7BH%7D%5EH+%5Cright%29+%5Cright%5D%7D+%5Cquad%5Cquad%5Cquad+%2813%29+&bg=ffffff&fg=000&s=2&c=20201002)
The capacity equation (13) contains random variables, and therefore the capacity will also be random. For obtaining meaningful result, for fading channels two different capacities can be defined.
If the CSIT is **UNKNOWN** at the transmitter, it is optimal to evenly distribute the available transmit power at the transmit antennas. That is,
Ergodic Capacity
Ergodic capacity is defined as the statistical average of the mutual information, where the expectation is taken over
![\boxed{C = \mathbb{E} \left[ log_2 \left[ det \left( \mathbf{I}_{N_{r}} + \frac{1}{ \sigma_n^2 } \mathbf{H} \mathbf{K}_x \mathbf{H}^H \right) \right] \right] } \quad\quad\quad (14)](https://s0.wp.com/latex.php?latex=%5Cboxed%7BC+%3D+%5Cmathbb%7BE%7D+%5Cleft%5B+log_2+%5Cleft%5B+det+%5Cleft%28+%5Cmathbf%7BI%7D_%7BN_%7Br%7D%7D+%2B+%5Cfrac%7B1%7D%7B+%5Csigma_n%5E2+%7D+%5Cmathbf%7BH%7D+%5Cmathbf%7BK%7D_x+%5Cmathbf%7BH%7D%5EH+%5Cright%29+%5Cright%5D+%5Cright%5D+%7D+%5Cquad%5Cquad%5Cquad+%2814%29+&bg=ffffff&fg=000&s=2&c=20201002)
Outage Capacity
Defined as the information rate below which the instantaneous mutual information falls below a prescribed value of probability expressed as percentage – q.
![\boxed{P \left( \mathbb{E} \left( \left[ log_2 \left[ det \left( \mathbf{I}_{N_{r}} + \frac{1}{ \sigma_n^2 } \mathbf{H} \mathbf{K}_x \mathbf{H}^H \right) \right] \right] \right) \right) < C_{out,q \%} = q \% } \quad\quad\quad (15)](https://s0.wp.com/latex.php?latex=%5Cboxed%7BP+%5Cleft%28+%5Cmathbb%7BE%7D+%5Cleft%28+%5Cleft%5B+log_2+%5Cleft%5B+det+%5Cleft%28+%5Cmathbf%7BI%7D_%7BN_%7Br%7D%7D+%2B+%5Cfrac%7B1%7D%7B+%5Csigma_n%5E2+%7D+%5Cmathbf%7BH%7D+%5Cmathbf%7BK%7D_x+%5Cmathbf%7BH%7D%5EH+%5Cright%29+%5Cright%5D+%5Cright%5D+%5Cright%29+%5Cright%29+%3C+C_%7Bout%2Cq+%5C%25%7D+%3D+q+%5C%25+%7D+%5Cquad%5Cquad%5Cquad+%2815%29+&bg=ffffff&fg=000&s=2&c=20201002)
A word on capacity of a MIMO system over AWGN Channels
The capacity of MIMO system over AWGN channel can be derived in a very similar manner. The only difference will be the channel matrix. For the AWGN channel, the channel matrix will be a constant. The final equation for capacity will be very similar and will follow the lines of capacity of SISO over AWGN channel.
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