In this chapter we will discuss the most important and well-known relations and parameters of an array antenna that are relevant for the conception of a radar system. Possible implementations for different applications will be summarised. We will start our discussion with a simple illustration, the basic principle of which is sketched in Figure 4.1. A set of antennas or an array of antenna elements is distributed on a metal ground plane, preferably on a regular grid. These antenna elements may be, for example, dipoles matched with the length of their arms to the operating wavelength l of the radar system. In the case of transmission each antenna element is the source of a spherical wavefront. As a first step we assume waves of equal phase from each antenna element. Comparatively, we observe circular water waves if a group of persons standing at a linear sea wall are throwing stones at the same instant of time into calm water. These waves superpose coherently according to the famous Huygens' Principle at each point in space. If all sources radiate in phase then at the boresight direction, orthogonal to the antenna plane, we have a linear or coherent summation of the field strength of all individual waves. That is if, at a certain distance from the antenna, the electrical field strength produced from one antenna element is E, we would have with N antenna elements the field strength NE resulting at the boresight direction, or a power density proportional to (NE)2=N2E2. Outside the boresight direction the condition of in-phase superposition is not fulfilled and there is approximately, as the spatial mean over all directions, only a superposition of the power; that is we have there a power density with an order of magnitude only proportional to NE2. More detailed considerations for the antenna pattern will follow. This results in a factor of N for the power density between the boresight direction and all other directions. In this example our main beam is formed in the boresight direction and in the other directions only the unwanted sidelobes are produced. We recognise that only for N approaching infinity can we expect the sidelobe to mainlobe power ratio to approach zero. That would require an antenna with an infinite antenna plane. The angular width of our main beam, the region with approximately coherent superposition of the partial waves from the antenna elements, also depends on N. The angular region for an in-phase superposition of all individual waves decreases for an increasing N, resulting in a narrower beam.
Array antennas, Page 1 of 2
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