Digital antenna array (DAA) is a smart antenna with multi channels digital beamforming, usually by using fast Fourier transform (FFT). The development and practical realization of digital antenna arrays theory started in 1962 under the guidance of Vladimir Varyukhin (USSR).
The history of the DAA was started to emerge as a theory of multichannel analysis in the 1920s.[1] In the 1940s this theory evolved to the theory of three-channel antenna analyzers.[1]
The implementation of effective signal processing in radars by the end of the 1950s predetermined the use of electronic computers in this field. In 1957, Ben S. Meltont and Leslie F. Bailey published article[2] regarding using algebraic operations for signal processing with the help of electronic circuits or analog computer.[1]
Three years after in 1960 the idea of using high-speed computers to solve directional finding problems was embodied, initially to locate earthquake epicenter. B. A. Bolt was one of the first who implemented this idea in practice.[1] [3] Almost simultaneously a similar approach was used by Flinn, a research fellow of the Australian National University.[4]
Despite the fact that in the mentioned experiments the interaction between sensors and computers was implemented with the help of data input cards, such decision was a decisive step on the way of the appearance of the DAA. Then, it was needed only to solve the problem of direct digital data input into the computer from sensors, excluding the step of preparation of punch card and operator assistance as a surplus element.[1] This step for radars theory was made after 1962 in the former USSR conducted with a solution to the problem of superRayleigh resolution of the emission sources.[1]
The main approach to digital signal processing in DAA is the "digital beamforming" after Analog-to-digital converters (ADC) of receiver channels or before Digital-to-analog converters (DAC) by transmission.
Digital beamforming of DAA has advantages because the digital signals can be transformed and combined in parallel, to produce different output signals. The signals from every direction can be estimated simultaneously and integrated for a longer time to increasing of signals energy when detecting far-off objects and simultaneously integrated for a shorter time to detecting fast-moving close objects.[5]
Before digital beamforming operation should be used a correction of channels characteristics by a special test source or using the heterodyne signal.[6] [7] [8] Such correction can be used not only for receiving channels but also in transmission channels of active DAA.[9]
Limitations on the accuracy of estimation of direction of arrival signals and depth of suppression of interferences in digital antenna arrays are associated with jitter in ADCs and DACs.[10] [11]
In maximum likelihood beamformer (DML), the noise is modeled as a stationary Gaussian white random processes while the signal waveform as deterministic (but arbitrary) and unknown.
The Bartlett beamformer is a natural extension of conventional spectral analysis (spectrogram) to the DAA. Its spectral power is represented by
\hat{P}Bartlett(\theta)=\boldsymbolvH\boldsymbolR\boldsymbolv (1)
The angle that maximizes this power is an estimation of the angle of arrival.
Capon beamformer, also known as the minimum-variance distortionless response (MVDR) beamforming algorithm,[12] has a power given by
\hat{P}Capon(\theta)=
| 1 | |
| \boldsymbolvH\boldsymbolR-1\boldsymbolv |
(2)
The MVDR/Capon beamformer can achieve better resolution than the conventional (Bartlett) approach, but this algorithm has higher complexity due to the full-rank matrix inversion. Technical advances in GPU computing have begun to narrow this gap and make real-time Capon beamforming possible.[13]
See main article: MUSIC (algorithm). MUSIC (MUltiple SIgnal Classification) beamforming algorithm starts with decomposing the covariance matrix for both the signal part and the noise part. The eigen-decomposition of is represented by
\boldsymbolR=\boldsymbolUs\boldsymbolΛs\boldsymbol
| H | |
| U | |
| s |
+\boldsymbolUn\boldsymbolΛn\boldsymbol
| H | |
| U | |
| n |
(3)
MUSIC uses the noise sub-space of the spatial covariance matrix in the denominator of the Capon algorithm
\hat{P}MUSIC(\theta)=
| 1 | ||||||||
|
(4)
Therefore, MUSIC beamformer is also known as subspace beamformer. Compared to the Capon beamformer, it gives much better DOA estimation.As an alternative approach can be used ESPRIT algorithm as well.
See main article: Artificial Intelligence. The important trend in evolving digital signal processing for DAA is the use of Artificial Intelligence technologies.[14]
See main article: MIMO. DAA use to improve the performance of radio communications in MIMO (Massive MIMO) systems.
DAA was implemented in a big lot of sonars and medical ultrasound sensors.