LITMIR.BIZ

Скачать книгу

The medium that supports the frequency‐dependent phase velocity is known as the dispersive medium. Normally, the characteristic impedance or intrinsic impedance of a dispersive medium is also frequency‐dependent. The parameters (L, C) and (ε, μ) are usually independent of signal strength. Such a medium is called a linear medium, whereas the signal strength dependent medium is a nonlinear medium. The characteristics of the medium are discussed in Section (4.2) of chapter 4. The present discussion is only about the linear and dispersive transmission lines.

      Why a medium becomes dispersive? One reason for dispersion is the loss associated with a medium. The geometry of a wave supporting inhomogeneous structures, commonly encountered in the planar technology, is another source of the dispersion. In the case of a transmission line, the parameters R and G are associated with losses and they make propagation constant β frequency‐dependent. Likewise, losses make permittivity ε and permeability μ of material medium frequency‐dependent complex quantities. However, a low‐loss dielectric medium can be nondispersive in the useful frequency band. For such cases, the attenuation and propagation constants are given by

(3.3.3)

In equation (3.3.3), c is the velocity of EM‐wave in free space. The above expressions are obtained from equations (4.5.16) and (4.5.19) of chapter 4. The complex permittivity is given by ε = ε^′ − jε^″. The imaginary part, showing a loss in a medium, is related to the conductivity of a medium through relation σ = ωε^″. If ε^′ and ε^″ are not frequency‐dependent, the propagation constant β is not frequency‐dependent and the phase velocity is also not frequency‐dependent. However, if they are frequency dependent, the phase velocity is also frequency‐dependent. The phase velocity in the low‐loss dielectric medium is

      (3.3.4)

      Therefore, the presence of loss decreases the phase velocity of EM‐wave. This kind of wave is known as the slow‐wave. The slow‐wave can be dispersive or nondispersive. However, it is associated with a loss. This aspect is further illustrated through the EM‐wave propagation in a high conductivity medium. The conducting medium is discussed in subsection (4.5.5) of chapter 4. The attenuation (α), phase constant (β), and phase velocity (v_p,con) of a highly conducting medium are given by equation (4.5.35b) of chapter 4 [B.3]:

(3.3.5)

      (3.3.6)

The above expressions are obtained for a highly conducting medium, σ/ωε >> 1. It does not apply to the lossless medium with σ = 0. The wave propagation is associated with significant loss (α) given by equation (3.3.5). Moreover, both the attenuation constant and phase velocity are frequency dependent, so a conducting medium is highly dispersive. However, the periodic structures and other mechanisms give slow‐wave structures with a small loss. Such structures are useful for the development of compact microwave components and devices [B.1, ]. The slow‐wave periodic transmission line structures are discussed in chapter 19.

      Some EM‐wave supporting media have cut‐off property. They support the wave propagation only above the certain characteristic frequency of a medium or a structure. These media and structures are also dispersive. For instance, the nonmagnetic plasma medium has such cut‐off property [B.4, B.14]. The plasma medium is discussed in the subsection (6.5.2) of chapter 6. The permittivity of a plasma medium is given by equation (6.5.16 ):

      (3.3.7)

      In the above expression, f_p is the plasma frequency that is a characteristic cut‐off frequency of the plasma medium [B.4, B.14]. The permeability of nonmagnetized plasma is μ = μ₀. Other parameters are as follows‐ε₀: permittivity of free space, N: electron density, e: electron charge, and m_e: electron mass. The propagation constant, phase velocity, and plasma wavelength λ_plasma of the EM‐wave wave in a plasma medium are given below:

(3.3.8)

In equation (3.3.8), is the velocity of EM‐wave in the homogeneous medium with parameters ε₀ and μ. The wavelength in the homogeneous medium is λ = v/f. However, the nonmagnetized plasma medium has the parameters ε₀, μ_o supporting the wavelength λ₀ = c/f. The nonmagnetized plasma medium behaves as free space.

      The phase velocity of the EM‐waves in a plasma medium is frequency‐dependent. Therefore, it is a dispersive medium that supports a fast‐wave. It is fast in the sense that the phase velocity is higher than the phase velocity of the EM‐wave in free space given by . The plasma medium exhibits the cut‐off phenomenon, similar to the cut‐off behavior of the waveguide medium. The waveguide medium is discussed in the section (7.4) of chapter 7. There is no wave propagation at the plasma frequency f = f_p. The plasma frequency f_p behaves like the cut‐off frequency f_c of a waveguide. Thus, the waveguide can be used to simulate the electrical behavior of plasma. For f < f_p, no wave propagation takes place, as the propagation constant β becomes an imaginary quantity. Such a wave is known as an evanescent wave. It is an exponentially decaying nonpropagating wave (E = E₀ e^−αz). The standard metallic waveguide also supports the cut‐off phenomenon and has a frequency‐dependent phase velocity [B.1, B.5, B.7, B.8, B.15–B.17].

      The dispersion is a property of the wave‐supporting medium. The phase velocity of a wave in a dispersive medium can either decrease or increase with the increase in frequency. Thus, all dispersive media could be put into two groups – (i) normal dispersive medium and (ii) abnormal or anomalous dispersive medium.

Figure 3.21 Nature of normal (positive) dispersion.

Figure

Скачать книгу