Propagation Channel Models

LTE Toolbox™ provides a set of channel models that enable you to test and verify UE and eNodeB radio transmission and reception as defined in TS 36.101 [1] and TS 36.104 [2]. The following channel models are available in LTE Toolbox.

Multipath fading propagation conditions
High speed train conditions
Moving propagation conditions

Multipath Fading Propagation Conditions

The multipath fading channel model specifies the following three delay profiles.

Extended Pedestrian A model (EPA)
Extended Vehicular A model (EVA)
Extended Typical Urban model (ETU)

These three delay profiles represent a low, medium, and high delay spread environment, respectively. The multipath delay profiles for these channels are shown in these tables.

EPA Delay Profile

Excess tap delay (ns)	Relative power (dB)
0	0.0
30	–1.0
70	–2.0
90	–3.0
110	–8.0
190	–17.2
410	–20.8

EVA Delay Profile

Excess tap delay (ns)	Relative power (dB)
0	0.0
30	–1.5
150	–1.4
310	–3.6
370	–0.6
710	–9.1
1090	–7.0
1730	–12.0
2510	–16.9

ETU Delay Profile

Excess tap delay (ns)	Relative power (dB)
0	–1.0
50	–1.0
120	–1.0
200	0.0
230	0.0
500	0.0
1600	–3.0
2300	–5.0
5000	–7.0

All the taps in the preceding tables have a classical Doppler spectrum. In addition to a multipath delay profile, each multipath fading propagation condition has a maximum Doppler frequency as shown in this table.

Channel model	Maximum Doppler frequency
EPA 5Hz	5 Hz
EVA 5Hz	5 Hz
EVA 70Hz	70 Hz
ETU 70Hz	70 Hz
ETU 300Hz	300 Hz

In the case of MIMO environments, a set of correlation matrices model the correlation between UE and eNodeB antennas. These correlation matrices are described in MIMO Channel Correlation Matrices.

High Speed Train Condition

The high speed train condition defines a non-fading propagation channel with single multipath component, the position of which is fixed in time. This single multipath represents the Doppler shift, which is caused by a high speed train moving past a base station, as shown in the following figure.

Doppler shift as a train moves past a base station

The expression $D_{s} / 2$ is the initial distance of the train from eNodeB, and $D_{\min}$ is the minimum distance between eNodeB and the railway track. Both variables are measured in meters. The variable ν is the velocity of the train in meters per second. The Doppler shift due to a moving train is given in the following equation.

$f_{s} (t) = f_{d} \cos θ (t)$

The variable $f_{s} (t)$ is the Doppler shift and $f_{d}$ is the maximum Doppler frequency. The cosine of angle $θ (t)$ is given by the following equation.

$\cos θ (t) = \frac{D_{s} / 2 - v t}{\sqrt{D_{\min}^{2} + {(D_{s} / 2 - v t)}^{2}}}, 0 \leq t \leq D_{s} / v$

$\cos θ (t) = \frac{- 1.5 D_{s} + v t}{\sqrt{D_{\min}^{2} + {(- 1.5 D_{s} + v t)}^{2}}}, D_{s} / v < t \leq 2 D_{s} / v$

$\cos θ (t) = \cos θ (t \mod (2 D_{s} / v)), t > 2 D_{s} / v$

For eNodeB testing, two high speed train scenarios use the parameters listed in the following table. You can calculate the Doppler shift $f_{s} (t)$ using the preceding equations with the parameters listed in this table.

Parameter	Value
Parameter	Scenario 1	Scenario 3
$D_{s}$	1,000 m	300 m
$D_{\min}$	50 m	2 m
ν	350 km/hr	300 km/kr
$f_{d}$	1,340 Hz	1,150 Hz

Both of these scenarios result in Doppler shifts that apply to all frequency bands. The Doppler shift trajectory for scenario 1 is shown in this figure.

Doppler shift trajectory for scenario 1

The Doppler shift trajectory for scenario 3 is shown in the following figure.

Doppler shift trajectory for scenario 3

For UE testing, you can calculate the Doppler shift $f_{s} (t)$ using the preceding equations with the parameters listed in this table.

Parameter	Value
$D_{s}$	300 m
$D_{\min}$	2 m
ν	300 km/hr
$f_{d}$	750 Hz

These parameters result in the Doppler shift, applied to all frequency bands, shown in this figure.

Doppler shift for UE testing

Moving Propagation Condition

The moving propagation channel in LTE defines a channel condition where the location of multipath components changes. The time difference between the reference time and the first tap, Δτ, is given by the following equation.

$Δ τ = \frac{A}{2} \cdot \sin (Δ ω \cdot t)$

The variable A is the starting time in seconds and Δω is angular rotation in radians per second.

Note

Relative time between multipath components stays fixed.

The parameters for the moving propagation conditions are shown in this table.

Parameter	Scenario 1	Scenario 2
Channel model	ETU200	AWGN
UE speed	120 km/hr	350 km/hr
CP length	Normal	Normal
A	10 μs	10 μs
Δω	0.04 s^–1	0.13 s^–1

Doppler shift applies only for generating fading samples for scenario 1. Scenario 2 models a single non-fading multipath component with additive white gaussian noise (AWGN). The location of this multipath component changes with time according to the preceding equation.

An example of a moving channel with a single non-fading tap is shown in this figure.

Moving channel with a single non-fading tap

MIMO Channel Correlation Matrices

In MIMO systems, there is correlation between transmit and receive antennas. This depends on multiple factors such as the separation between antenna and the carrier frequency. For maximum capacity, it is desirable to minimize the correlation between transmit and receive antennas.

There are different ways to model antenna correlation. One technique uses correlation matrices to describe the correlation between multiple antennas both at the transmitter and the receiver. The technique is to compute the matrices independently at both the transmitter and the receiver, then combine them using the Kronecker product to generate a channel spatial correlation matrix.

TS 36.101 [1] defines three different correlation levels.

low or no correlation
medium correlation
high correlation

For each level of correlation, there exist parameters α and β as shown in this table.

Low correlation		Medium correlation		High correlation
α	β	α	β	α	β
0	0	0.3	0.9	0.9	0.9

The independent correlation matrices at eNodeB and UE, which are denoted by R_eNB and R_UE respectively, are shown for different amounts of antennas (one, two, and four) in this table.

Correlation	One antenna	Two antennas	Four antennas
eNodeB	$R_{e N B} = 1$	$R_{e N B} = (\begin{array}{l} 1 α \\ α^{*} 1 \end{array})$	$R_{e N B} = (\begin{matrix} 1 & α^{\frac{1}{9}} & α^{\frac{4}{9}} & α \\ α^{\frac{1}{9}}^{} & 1 & α^{\frac{1}{9}} & α^{\frac{4}{9}} \\ α^{\frac{4}{9}}^{} & α^{\frac{1}{9}}^{} & 1 & α^{\frac{1}{9}} \\ α^{} & α^{\frac{4}{9}}^{} & α^{\frac{1}{9}}^{} & 1 \end{matrix})$
UE	$R_{U E} = 1$	$R_{U E} = (\begin{array}{l} 1 β \\ β^{*} 1 \end{array})$	$R_{U E} = (\begin{matrix} 1 & β^{\frac{1}{9}} & β^{\frac{4}{9}} & β \\ β^{\frac{1}{9}}^{} & 1 & β^{\frac{1}{9}} & β^{\frac{4}{9}} \\ β^{\frac{4}{9}}^{} & β^{\frac{1}{9}}^{} & 1 & β^{\frac{1}{9}} \\ β^{} & β^{\frac{4}{9}}^{} & β^{\frac{1}{9}}^{} & 1 \end{matrix})$

The channel spatial correlation matrix, R_spat, is given by the following equation.

$R_{s p a t} = R_{e N B} \otimes R_{U E}$

The symbol ⊗ represents the Kronecker product. The values of the channel spatial correlation matrix R_spat, for different matrix sizes are defined in this table.

Matrix size	R_spat values
1×2 case	$R_{s p a t} = R_{U E} = (\begin{matrix} 1 & β \\ β^{*} & 1 \end{matrix})$
2×2 case	$R_{s p a t} = R_{e N B} \otimes R_{U E} = (\begin{matrix} 1 & α \\ α^{} & 1 \end{matrix}) \otimes (\begin{matrix} 1 & β \\ β^{} & 1 \end{matrix}) = (\begin{matrix} 1 & β & α & α β \\ β^{} & 1 & α β^{} & α \\ α^{} & α^{} β & 1 & β \\ α^{} β^{} & α^{} & β^{} & 1 \end{matrix})$
4×2 case	$R_{s p a t} = R_{e N B} \otimes R_{U E} = (\begin{matrix} 1 & α^{\frac{1}{9}} & α^{\frac{4}{9}} & α \\ α^{\frac{1}{9}}^{} & 1 & α^{\frac{1}{9}} & α^{\frac{4}{9}} \\ α^{\frac{4}{9}}^{} & α^{\frac{1}{9} } & 1 & α^{\frac{1}{9}} \\ α^{} & α^{\frac{4}{9}}^{} & α^{\frac{1}{9}}^{} & 1 \end{matrix}) \otimes (\begin{matrix} 1 & β \\ β^{*} & 1 \end{matrix})$
4×4 case	$R_{s p a t} = R_{e N B} \otimes R_{U E} = (\begin{matrix} 1 & α^{\frac{1}{9}} & α^{\frac{4}{9}} & α \\ α^{\frac{1}{9}}^{} & 1 & α^{\frac{1}{9}} & α^{\frac{4}{9}} \\ α^{\frac{4}{9}}^{} & α^{\frac{1}{9} } & 1 & α^{\frac{1}{9}} \\ α^{} & α^{\frac{4}{9}}^{} & α^{\frac{1}{9}}^{} & 1 \end{matrix}) \otimes (\begin{matrix} 1 & β^{\frac{1}{9}} & β^{\frac{4}{9}} & β \\ β^{\frac{1}{9}}^{} & 1 & β^{\frac{1}{9}} & β^{\frac{4}{9}} \\ β^{\frac{4}{9}}^{} & β^{\frac{1}{9} } & 1 & β^{\frac{1}{9}} \\ β^{} & β^{\frac{4}{9}}^{} & β^{\frac{1}{9}}^{} & 1 \end{matrix})$

References

[1] 3GPP TS 36.101. “Evolved Universal Terrestrial Radio Access (E-UTRA); User Equipment (UE) Radio Transmission and Reception.” 3rd Generation Partnership Project; Technical Specification Group Radio Access Network. URL: https://www.3gpp.org.

[2] 3GPP TS 36.104. “Evolved Universal Terrestrial Radio Access (E-UTRA); Base Station (BS) Radio Transmission and Reception.” 3rd Generation Partnership Project; Technical Specification Group Radio Access Network. URL: https://www.3gpp.org.