For discrete aperture antennas (such as phased arrays) in which the element spacing is greater than a half wavelength, a spatial aliasing effect allows plane waves incident to the array from visible angles other than the desired direction to be coherently added, causing grating lobes. Grating lobes are undesirable and identical to the main lobe. The perceived difference seen in the grating lobes is because of the radiation pattern of non-isotropic antenna elements, which affects main and grating lobes differently. For isotropic antenna elements, the main and grating lobes are identical.
In antenna or transducer arrays, a grating lobe is defined as "a lobe other than the main lobe, produced by an array antenna when the inter-element spacing is sufficiently large to permit the in-phase addition of radiated fields in more than one direction."[1]
To illustrate the concept of grating lobes, we will use a simple uniform linear array. The beam pattern (or array factor) of any array can be defined as the dot product of the steering vector and the array manifold vector. For a uniform linear array, the manifold vector is
\vec{v}(\psi)=
| ||||||
| e |
\psi
n
N
| N-1 | |
| 2 |
\psi
| \psi= | 2\pi |
| λ |
d x cos\theta
\theta
\theta=90\circ
For a uniformly weighted (un-tapered) uniform linear array, the steering vector is of similar form to the manifold vector, but is "steered" to a target phase,
\psiT
\psi
\psi\Delta=\psi-\psiT
AF=
| 1 | |
| N |
| H(\psi | |
| \vec{v} | |
| T)\vec{v}(\psi)= |
| 1 | |
| N |
| N-1 | |
| \sum | |
| n=0 |
| ||||||
| e |
| |||||||
| e | = |
| 1 | |
| N |
| ||||||
| e |
| N-1 | |
| \sum | |
| n=0 |
| jn\psi\Delta | |
| e |
=
| ||||||
|
,-infty<\psi\Delta<infty
The array factor is therefore periodic and maximized whenever the numerator and denominator both equal zero, by L'Hôpital's rule. Thus, a maximum of unity is obtained for all integers
n
\psi\Delta=2\pin
\theta
\theta=0\circ
\theta=180\circ
180\circ
\psi
2\pin=
| 2\pi | |
| λ |
d x \left(cos\theta-cos\thetaT\right)
|n|=1
| \circ | |
| \theta | |
| T=180 |
\theta=0\circ
| d= | 2\piλ |
| 2\pi\left(1+1\right) |
=
| λ | |
| 2 |
Alternatively, one can think of a uniform linear array (ULA) as spatial sampling of a signal in the same sense as time sampling of a signal. Grating lobes are identical to aliasing that occurs in time series analysis for an under-sampled signal.[4] Per Shannon's sampling theorem, the sampling rate must be at least twice the highest frequency of the desired signal in order to preclude spectral aliasing. Because the beam pattern (or array factor) of a linear array is the Fourier transform of the element pattern,[5] the sampling theorem directly applies, but in the spatial instead of spectral domain. The discrete-time Fourier transform (DTFT) of a sampled signal is always periodic, producing "copies" of the spectrum at intervals of the sampling frequency. In the spatial domain, these copies are the grating lobes. The analog of radian frequency in the time domain is wavenumber,
k=
| 2\pi | |
| λ |
\geq2
| samples | |
| cycle |
x
| ||||||
|
\leq
| λ | |
| 2 |