Prof. David R. Jackson ECE Dept.

ECE 6341 Spring 2014 Prof. David R. Jackson ECE Dept. Notes 6

Leaky Modes v TM1 Mode R SW u Splitting point f = fs ISW f > fs We will examine the solutions as the frequency is lowered.

v SW u ISW Leaky Modes (cont.) a) f > fc SW+ISW TM1 Mode The TM1 surface wave is above cutoff. There is also an improper TM1 SW mode. Note: There is also a TM0 mode, but this is not shown

Im kz ISW SW k0 k1 Re kz Leaky Modes (cont.) a) f > fc SW+ISW The red arrows indicate the direction of movement as the frequency is lowered. TM1 Mode

Leaky Modes (cont.) v u b) f = fc TM1 Mode The TM1 surface wave is now at cutoff. There is also an improper SW mode.

Leaky Modes (cont.) Im kz k0 k1 Re kz b) f = fc TM1 Mode

Leaky Modes (cont.) v u c) f < fc2ISWs TM1 Mode The TM1 surface wave is now an improper SW, so there are two improper SW modes.

Leaky Modes (cont.) c) f < fc2ISWs Im kz k0 k1 Re kz TM1 Mode The two improper SW modes approach each other.

Leaky Modes (cont.) v u d) f = fs TM1 Mode The two improper SW modes now coalesce.

Leaky Modes (cont.) d) f = fs Im kz Splitting point k0 k1 Re kz TM1 Mode

Leaky Modes (cont.) v u e) f < fs The wavenumberkz becomes complex (and hence so do u and v). The graphical solution fails! (It cannot show us complex leaky-wave modal solutions.)

Leaky Modes (cont.) e) f < fs2 LWs This solution is rejected as completely non-physical since it grows with distance z. Im kz LW k0 k1 Re kz LW The growing solution is the complex conjugate of the decaying one (for a lossless slab).

Leaky Modes (cont.) Proof of conjugate property (lossless slab) TMx Mode TRE: Take conjugate of both sides: Hence, the conjugate is a valid solution.

Leaky Modes (cont.) a) f > fc Here we see a summary of the frequency behavior for a typical surface-wave mode (e.g., TM1). b) f = fc c) f < fc Exceptions: • TM0: Always remains a proper physical SW mode. • TE1: Goes from proper physical SW to nonphysical ISW; remains nonphysical ISW down to zero frequency. d) f = fs e) f < fs

Leaky Modes (cont.) A leaky mode is a mode that has a complex wavenumber (even for a lossless structure). It loses energy as it propagates due to radiation. x Power flow 0 z

Leaky Modes (cont.) One interesting aspect: The fields of the leaky mode must be improper (exponentially increasing). Proof: Notes: z > 0 (propagation in +z direction) z > 0 (propagation in +z direction) x > 0 (outward radiation) Taking the imaginary part of both sides:

Leaky Modes (cont.) x Region of weak fields Power flow 0 Region of exponential growth z Leaky mode Source For a leaky wave excited by a source, the exponential growth will only persist out to a “shadow boundary” once a source is considered. This is justified later in the course by an asymptotic analysis: In the source problem, the LW pole is only captured when the observation point lies within the leakage region (region of exponential growth). A hypothetical source launches a leaky wave going in one direction.

Leaky Modes (cont.) A leaky-mode is considered to be “physical” if we can measure a significant contribution from it along the interface (0 = 90o) . A requirement for a leaky mode to be strongly “physical”is that the wavenumber must lie within the physical region (z=Re kz < k0) where is wave is a fast wave*. (Basic reason: The LW pole is not captured in the complex plane in the source problem if the LW is a slow wave.) * This is justified by asymptotic analysis, given later.

Leaky Modes (cont.) f) f < fp Physical LW Im kz k0 k1 LW Re kz Non-physical Physical f = fp Note: The physical region is also the fast-wave region. Physical leaky wave region (Re kz < k0)

Leaky Modes (cont.) If the leaky mode is within the physical (fast-wave) region, a wedge-shaped radiation region will exist. This is illustrated on the next two slides.

Leaky Modes (cont.) x Power flow 0 z Leaky mode Source (assuming small attenuation) Hence Significant radiation requires z<k0.

Leaky Modes (cont.) x Power flow 0 z Leaky mode Source As the mode approaches a slow wave (zk0), the leakage region shrinks to zero (0 90o).

Leaky Modes (cont.) Phased-array analogy x 0 d z I0 I1 In IN Equivalent phase constant: Note: A beam pointing at an angle in “visible space” requires that kz < k0.

Leaky Modes (cont.) The angle 0 also forms the boundary between regions where the leaky-wave field increases and decreases with radial distance  in cylindrical coordinates (proof omitted*). x Fields are increasing radially Power flow 0 Fields are decreasing radially  z Leaky mode Source *Please see one of the homework problems.

Leaky Modes (cont.) Line source Excitation problem: The aperture field may strongly resemble the field of the leaky wave (creating a good leaky-wave antenna). Requirements: • The LW should be in the physical region. • The amplitude of the LW should be strong. • The attenuation constant of the LW should be small. A non-physical LW usually does not contribute significantly to the aperture field (this is seen from asymptotic theory, discussed later).

Leaky Modes (cont.) Summary of frequency regions: a) f > fc physical SW (non-radiating, proper) b) fs<f < fc non-physical ISW (non-radiating, improper) c) fp <f < fsnon-physical LW (radiating somewhat, improper) d) f < fp physical LW (strong focused radiation, improper) The frequency region fp <f < fcis called the“spectral-gap” region (a term coined by Prof. A. A. Oliner). The LW mode is usually considered to be nonphysical in the spectral-gap region.

Leaky Modes (cont.) Spectral-gap region f = fc fp < f < fc Im kz ISW k0 k1 f = fs Re kz LW Physical Non-physical f = fp

Field Radiated by Leaky Wave x z Line source TEx leaky wave Aperture For x > 0: Assume: Note: The wavenumber kx is chosen to be either positive real or negative imaginary. Then

Radiation occurs at 60o. x / 0 x / 0 10 10 5 5 z / 0 0 0 -10 0 10 -10 0 10

The LW is nonphysical. x / 0 x / 0 10 10 5 5 z / 0 0 0 -10 0 10 -10 0 10

Leaky-Wave Antenna x z Line source x / 0 Aperture Near field Far field

Leaky-Wave Antenna (cont.) x z line source x / 0  Far-Field Array Factor (AF)

Leaky-Wave Antenna (cont.) A sharp beam occurs at

Leaky-Wave Antenna (cont.) t b Two-layer (substrate/superstrate) structure excited by a line source. x / 0 x z Far Field Note: Here the two beams have merged to become a single beam at broadside.

Leaky-Wave Antenna (cont.) x / 0 Implementation at millimeter-wave frequencies (62.2 GHz) r1 = 1.0, r2 = 55, h = 2.41 mm, t = 0.484 mm, a = 3.73 0 (radius)

Leaky-Wave Antenna (cont.) x / 0 (E-plane shown on one side, H-plane on the other side)

Leaky-Wave Antenna (cont.) • W. W. Hansen, “Radiating electromagnetic waveguide,” Patent, 1940, U.S. Patent No. 2.402.622. W. W. Hansen, “Radiating electromagnetic waveguide,” Patent, 1940, U.S. Patent No. 2.402.622. This is the first leaky-wave antenna invented. y Slotted waveguide Note:

Leaky-Wave Antenna (cont.) x / 0 The slotted waveguide illustrates in a simple way why the field is weak outside of the “leakage region.” Region of strong fields (leakage region) Slot a Waveguide TE10 mode Source Top view

Leaky-Wave Antenna (cont.) Another variation: Holey waveguide x / 0 y

Leaky-Wave Antenna (cont.) x / 0 Another type of leaky-wave antenna: Surface-Integrated Waveguide (SIW)

Prof. David R. Jackson ECE Dept.