Standard linear array

A standard linear array (SLA) is a linear array of interconnected transducer elements, e.g. microphones or antennas, where the individual elements are uniformly weighted (un-tapered) and arranged in a straight line spaced at one half of the smallest wavelength of the intended signal to be received and/or transmitted. The reason for this spacing is that it prevents grating lobes in the visible region of the array.^[1]

Intuitively one can think of a linear array of elements as spatial sampling of a signal in the same sense as time sampling of a signal, and spacing of the array elements is analogous to the sampling interval of a signal in time series analysis.^[2] 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 element pattern, 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. The analog of radian frequency in the time domain is wavenumber, $k={\frac {2\pi }{\lambda }}$ radians per meter, in the spatial domain. Therefore the spatial sampling rate, in samples per meter, must be $\geq 2{\frac {samples}{cycle}}\times {\frac {k{\frac {radians}{meter}}}{2\pi {\frac {radians}{cycle}}}}$ . The sampling interval, which is the inverse of the sampling rate, in meters per sample, must be $\leq {\frac {\lambda }{2}}$ .

^ Van Trees, H.L. Optimum Array Processing. p. 51.
^ Van Trees, H.L. Optimum Array Processing. p. 51.

[1] Van Trees, H.L. Optimum Array Processing. p. 51.

[2] Van Trees, H.L. Optimum Array Processing. p. 51.

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