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Stub Tuning I 625 t 0I Vma, Vmmn Figure 8-24 of A/2). Thus, the solutions can be summarized as or 11 = 0.25A + nA/2, 12 = A/8 + m/2 11= 0.427A + nA/2, 12 = 3A/8 + (9) mA/2 where n and m are any nonnegative integers (including zero). When the load is matched by the stub to the line, the VSWR to the left of the stub is unity, while to the right of the stub over the length 11the reflection coefficient is FL = ZL +- l 2+j (10) which has magnitude fLI = 1/,5= 0.447 (11) so that the voltage standing wave ratio is VSWR= FL 2.62 (12) The disadvantage to single-stub tuning is that it is not easy to vary the length II. Generally new elements can only be connected at the ends of the line and not inbetween. 8-5-3 Double-Stub Matching This difficulty of not having a variable length line can be overcome by using two short circuited stubs a fixed length apart, as shown in Figure 8-25a. This fixed length is usually RA. A match is made by adjusting the length of the stubs 1, and Y-->. __ y > (a) Figure 8-25 (a) A double stub tuner of fixed spacing cannot match all loads but is useful because additional elements can only be placed at transmission line terminations and not at any general position along a line as required for a single-stub tuner. (b) Smith chart construction. If the stubs are 1A apart, normalized load admittances whose real part exceeds 2 cannot be matched. 626 __·._ Stub Tuning 627 12. One problem with the double-stub tuner is that not all loads can be matched for a given stub spacing. The normalized admittances at each junction are related as Y,= Yi+ YL (13) Y,,= Y2 + Yb where Y, and Y2 are the purely reactive admittances of the stubs reflected back to the junctions while Yb is the admittance of Y. reflected back towards the load by 8A. For a match we require that Y,, be unity. Since Y2 iApurely imaginary, the real part of Yb must lie on the circle with a real part of unity. Then Y. must lie somewhere on this circle when each point on the circle is reflected back by 2A. This generates another circle that is 2· r back in the counterclockwise direction as we are moving toward the load, as illustrated in Figure 8-25b. To find the conditions for a match, we work from left to right towards the load using the following reasoning: (i) (ii) Since Y2 is purely imaginary, the real part of Yb must lie on the circle with a real part of unity, as in Figure 8-25b. Every possible point on Yb must be reflected towards the load by IA to find the locus of possible match for Y,. This generates another circle that is irr back in the counterclockwise direction as we move towards the load, as in Figure 8-25b. Again since Y, is purely imaginary, the real part of Y, must also equal the real part of the load admittance. This yields two possible solutions if the load admittance is outside the forbidden circle enclosing all load admittances with a real part greater than 2. Only loads with normalized admittances whose real part is less than 2 can be matched by the doublestub tuner of 3A spacing. Of course, if a load is within the forbidden circle, it can be matched by a double-stub tuner if the stub spacing is different than -A. EXAMPLE 8-4 DOUBLE-STUB MATCHING The load impedance ZL = 50(1 +j) on a 50-Ohm line is to be matched by a double-stub tuner of 8A spacing. What stub lengths I1and 12 are necessary? SOLUTION The normalized load impedance Z.A = 1+j corresponds to a normalized load admittance: YnL =0.5(1 -j) (b) Figure 8-26 (a) The Smith chart construction for a double-stub tuner of -A spacing with Z,.= I +j. (b) The voltage standing wave pattern. 628 The Rectangular Waveguide 629 Then the two solutions for Y, lie on the intersection of the circle shown in Figure 8-26a with the r = 0.5 circle: Y,a = 0.5-0.14i Y- 2 = 0.5 - 1.85/ We then find Y, by solving for the imaginary part of the upper equation in (13): 0.36j S= I - Y) = 0.305A (F) -1.35j:• > I = 0.1A (E) By rotating the Y. solutions by -A back to the generator (270" clockwise, which is equivalent to 900 counterclockwise), their intersection with the r = 1 circle gives the solutions for Yb as Ybi = 1.0-0.72j Yb2 = 1.0+2.7j This requires Y2 to be Y2 =- Im (Yb) = 0.72j 12 = 0.349A (G) -2.7j/=> 2 = 0.056A (H) The voltage standing wave pattern along the line and stubs is shown in Figure 8.26b. Note the continuity of voltage at the junctions. The actual stub lengths can be those listed plus any integer multiple of A/2. 8-6 THE RECTANGULAR WAVEGUIDE We showed in Section 8-1-2 that the electric and magnetic fields for TEM waves have the same form of solutions in the plane transverse to the transmission line axis as for statics. The inner conductor within a closed transmission line structure such as a coaxial cable is necessary for TEM waves since it carries a surface current and a surface charge distribution, which are the source for the magnetic and electric fields. A hollow conducting structure, called a waveguide, cannot propagate TEM waves since the static fields inside a conducting structure enclosing no current or charge is zero. However, new solutions with electric or magnetic fields along the waveguide axis as well as in the transverse plane are allowed. Such solutions can also propagate along transmission lines. Here the axial displacement current can act as a source 630 Guided Electromagnetic Waves of the transverse magnetic field giving rise to transverse magnetic (TM) modes as the magnetic field lies entirely within the transverse plane. Similarly, an axial time varying magnetic field generates transverse electric (TE) modes. The most general allowed solutions on a transmission line are TEM, TM, and TE modes. Removing the inner conductor on a closed transmission line leaves a waveguide that can only propagate TM and TE modes. 8-6-1 Governing Equations To develop these general solutions we return to Maxwell's equations in a linear source-free material: aH VxE=-y- at aE VxH= eat (1) V-E=0 CIV H=0 Taking the curl of Faraday's law, we expand the double cross product and then substitute Ampere's law to obtain a simple vector equation in E alone: V x (V x E) = V(V - E) - V 2 E a =-e-(VxH) at a"E a •- •e (2) Since V- E= 0 from Gauss's law when the charge density is zero, (2) reduces to the vector wave equation in E: c 1 a'E V 1 (3) =2E If we take the curl of Ampere's law and perform similar operations, we also obtain the vector wave equation in H: VH = 1 82 H dg- 2 C at __ ¢- The Rectangular Waveguide 631 The solutions for E and H in (3) and (4) are not independent. If we solve for either E or H, the other field is obtained from (1). The vector wave equations in (3) and (4) are valid for any shaped waveguide. In particular, we limit ourselves in this text to waveguides whose cross-sectional shape is rectangular, as shown in Figure 8-27. 8-6-2 Transverse Magnetic (TM) Modes We first consider TM modes where the magnetic field has x and y components but no z component. It is simplest to solve (3) for the z component of electric field and then obtain the other electric and magnetic field components in terms of Ez directly from Maxwell's equations in (1). We thus assume solutions of the form Ez = Re [/E(x, y) ei'"' - k z) z ] (5) where an exponential z dependence is assumed because the cross-sectional area of the waveguide is assumed to be uniform in z so that none of the coefficients in (1) depends on z. Then substituting into (3) yields the Helmholtz equation: a2 E ax2 Figure 8-27 z a -+-ay /E 2 ka Ez =0 c2 A lossless waveguide with rectangular cross section. ( (6) 632 Guided Electromagnetic Waves This equation can be solved by assuming the same product solution as used for solving Laplace's equation in Section 4-2-1, of the form Ez(x, y) = X(x) Y(y) (7) where X(x) is only a function of the x coordinate and Y(y) is only a function of y. Substituting this assumed form of solution into (6) and dividing through by X(x) Y(y) yields 1 d2 X Sw+- 1 d2Y = k2 X dx2 Ydy2 W2 (8) C2 When solving Laplace's equation in Section 4-2-1 the righthand side was zero. Here the reasoning is the same. The first term on the left-hand side in (8) is only a function of x while the second term is only a function of y. The only way a function of x and a function of y can add up to a constant for all x and y is if each function alone is a constant, I d 2X S =- 1 d2 Y Y dy2 k2 (9) 2 S-k~Y where the separation constants must obey the relation k + k, + k = k= ,2/C2 (10) When we solved Laplace's equation in Section 4-2-6, there was no time dependence so that w = 0. Then we found that at least one of the wavenumbers was imaginary, yielding decaying solutions. For finite frequencies it is possible for all three wavenumbers to be real for pure propagation. The values of these wavenumbers will be determined by the dimensions of the waveguide through the boundary conditions. The solutions to (9) are sinusoids so that the transverse dependence of the axial electric field Ez(x, y) is E,(x, y) = (A 1 sin kx + A 2 cos klx)(Bi sin ky + B 2 cos ky) (11) Because the rectangular waveguide in Figure 8-27 is composed of perfectly conducting walls, the tangential component of electric field at the walls is zero: Pz(x, y = 0)= 0, Es(x = 0, y)= 0 E.(x, y = b)= 0, ,(x = a, y)= 0 (12) These boundary conditions then require that A 2 and B 2 are zero so that (11) simplifies to E,(x, y)= Eo sin kA sin ky (13) The Rectangular Waveguide 633 where Eo is a field amplitude related to a source strength and the transverse wavenumbers must obey the equalities kx = mlr/a, m= 1,2,3, ... k, = nor/b, n = 1, 2, 3 .... (14) Note that if either m or n is zero in (13), the axial electric field is zero. The waveguide solutions are thus described as TM,, modes where both m and n are integers greater than zero. The other electric field components are found from the z component of Faraday's law, where H, = 0 and the chargefree Gauss's law in (1): aE,_ aE ax Oy aEx aE, lEz= 0 ax az ay (15) By taking /lax of the top equation and alay of the lower equation, we eliminate Ex to obtain a'E, a'E, ax ay - aE, ay az where the right-hand side is known from (13). The general solution for Ey must be of the same form as (11), again requiring the tangential component of electric field to be zero at the waveguide walls, Ey(x = 0, y)= 0, E,(x = a, y)= 0 (17) so that the solution to (16) is Ei - jkykrEo k7k + k2 sin kx cos kyy k2 (18) We then solve for Ex using the upper equation in (15): jkk,Eo k2+kcos kx sin ky E= (19) where we see that the boundary conditions ax(x, y = 0)= 0, are satisfied. x(x, y = b)= 0 (20) 634 Guided Electromagnetic Waves The magnetic field is most easily found from Faraday's law R(x, y)= V-xE(x, y) (21) to yield I X E1 8aEY & A(y k+k az )Eo sin kx cos ky Sjwek, =2+ k2 Eo sin kx cos k,y (22) SE---- kk 2 Eo k2 jow (k! + AY)2 cos kx sin k,y j.o i6Ek, k + ki- Eo cos kx sin ky /1,=0 Note the boundary conditions of the normal component of H being zero at the waveguide walls are automatically satisfied: H,(x, y = 0) = 0, H,(x, y = b) = 0 H,(x = 0, y)= 0, I4,(x = a,y)= 0 (23) The surface charge distribution on the waveguide walls is found from the discontinuity of normal D fields: (x = 0, y)= ,(x=0, y) = f(x = a, y) = -e,(x = a, y) = (x, y =0)= = ,(x, y = 0) = - k" Eo sink,y k +k,2 i"-+2 Eo cos mir sin ky k2 + ky Eo sin kh jk,k,e Eo cos nir sin kx t(x, y = b) = -eE,(x, y = b)= T+y: 2 (24)