Apparatus and method to control electromagnetic heating of ceramic materials

Abstract

An electrode is embedded in a piece of ceramic material having a population of conduction band electrons. Applying a voltage bias to the electrode causes electrons to flow towards or away from the electrode to form a positively charged sheath either a distance apart from or adjacent the electrode, depending the polarity of the bias. The electron flow also forms a negatively charged sheath lying opposite the positively charged sheath, and an electrically neutral region lying between the two sheaths. Electromagnetic radiation impinging the ceramic material heats the ceramic where the radiation is absorbed by the electron population. As the incident radiation is absorbed in proportion to the electron density, heating is increased in the negatively charged sheath, relative to the other parts of the ceramic material. The location of heating is controlled by controlling the magnitude and polarity of the voltage bias.

Claims

1. A method to control heating of ceramic material caused by impinging electromagnetic radiation, comprising: creating a sheath including a first region in a ceramic material by applying an electric field or potential or a magnetic field to the ceramic material, the sheath having an adjustable first size and a first electron density which is lower than a second electron density in an electromagnetically absorptive second region located in the ceramic material, and outside of the sheath; adjusting the first size by controlling the electric field or potential or magnetic field; the second region having a second size; controlling the second size by adjusting the first size; heating the second region by subjecting the second region to impinging electromagnetic radiation; embedding an electrode in the ceramic material; and applying a voltage bias to the electrode, whereby the electric field or potential is applied.

2. The method to control heating as defined in claim 1 wherein: the voltage bias has a voltage bias polarity; and the location of the sheath relative to the electrode is controlled by the voltage bias polarity.

3. The method to control heating as defined in claim 1 wherein the second region has a negative electrical charge.

4. The method to control heating as defined in claim 3 wherein the second region is a conduction band.

5. The method to control heating as defined in claim 1 wherein the impinging electromagnetic radiation has wavelengths ranging from centimeters to millimeters.

6. A method to control heating of ceramic material caused by impinging electromagnetic radiation, comprising: creating a sheath including a first region in a ceramic material by applying an electric field or potential or a magnetic field to the ceramic material, the sheath having an adjustable first size and a first electron density which is lower than a second electron density in an electromagnetically absorptive second region located in the ceramic material, and outside of the sheath; adjusting the first size by controlling the electric field or potential or magnetic field; the second region having a second size; controlling the second size by adjusting the first size; heating the second region by subjecting the second region to impinging electromagnetic radiation; wherein the sheath is comprised of a positive sheath having a positive electrical charge and a neutral sheath having a neutral electrical charge and lying adjacent the positive sheath; and the positive and neutral sheaths each have respective electron densities lower than the second electron density.

7. The method to control heating as defined in claim 6 wherein the second region has a negative electrical charge.

8. The method to control heating as defined in claim 7 wherein the second region is a conduction band.

9. The method to control heating as defined in claim 6 wherein the impinging electromagnetic radiation has wavelengths ranging from centimeters to millimeters.

Description

(1) DESCRIPTION OF THE DRAWINGS

(2) For a better understanding of the present invention, and to show how the same may be carried into effect, reference will now be made, by way of example, to the accompanying drawings in which:

(3) FIG. 1 is a plot of calculated conduction band electron density as a function of temperature for hypothetical materials with band gaps ranging from 5 eV to 7 eV.

(4) FIG. 2 depicts an example of the present invention using simplified geometry in which a conductor is placed in electrical contact with the heated ceramic and an electric potential is applied via a bias voltage.

(5) FIG. 3 depicts an example of the present invention showing conduction band electron reconfiguration due to an applied bias voltage such that a sheath is formed.

(6) FIG. 4 depicts another embodiment of the present invention in which the electric potential is applied to a conducting rod embedded in the heated ceramic.

(7) FIG. 5 depicts a plot of estimated sheath thickness as a function of applied voltage for the geometry depicted in FIG. 3.

(8) FIG. 6 depicts an embodiment of the present invention in which a potential is applied to multiple bias electrodes oriented orthogonal to the incoming electric field polarization.

(9) FIG. 7 depicts an embodiment of the present invention in which an electromagnetic wave is incident on a ceramic immersed in a magnetic field.

DETAILED DESCRIPTION

(10) The conduction band population of a heated ceramic material can be estimated using the equation

(11) $\begin{array}{cc}{n}_{\mathrm{cb}}=\left({\left(\frac{2\pi \mathrm{kT}}{h^2}\right)}^{\frac{3}{2}}{m}_e^{*\frac{3}{2}}\right)\exp \left(-\frac{E_g}{2\mathrm{kT}}\right)& \left(1\right)\end{array}$
where k is the Boltzmann constant, T is temperature, h is Planck's constant, Eg is the energy separation between the conduction and valence bands of the material and m*.sub.e is the effective mass of a conduction band electron within the material. At this point, for the purposes of this analysis, two assumptions are made: 1) the effective electron mass is equal to the rest mass of a free electron and 2) that the valence band holes created by promoting electrons to the conduction band are effectively stationary. FIG. 1 depicts a chart 100 of calculated conduction band electron density as a function of temperature for band gaps ranging from 5 to 7 eV.

(12) From the calculated conduction band population, it is possible to make predictions regarding the bulk conductivity of a heated ceramic, using the relation
σ=n.sub.cb|e|μ.sub.e   (2)
where n.sub.cb is the conduction band population from equation (1), e is the charge of an electron, and μ.sub.e is the electron mobility, and the electrons are the majority of mobile charge carriers. It is known that electron mobility, μ.sub.e changes as a function of temperature, but over narrow temperature ranges, it can be considered to be approximately constant. This means that at a given temperature, bulk conductivity is proportional to conduction band population.

(13) From Maxwell's equations,

(14) $\begin{array}{cc}\begin{array}{c}\nabla \times H=j\omega D+J\\ =j\omega D+\sigma E\\ =j\mathrm{\omega ϵ}E+\sigma E\\ =j{\mathrm{\omega ϵ}}^{\prime }E+\left({\mathrm{\omega ϵ}}^{″}+\sigma \right)E\\ =j\omega \left({ϵ}^{\prime }-{\mathrm{jϵ}}^{″}-j\frac{\sigma }{\omega }\right)E\end{array}& \left(3\right)\end{array}$

(15) where J is the current density, σ is the material conductivity, E is the RE electric field, H is the RF magnetic field, ϵ′ is the real portion of the permittivity, ϵ″ is the imaginary portion of permittivity due to dielectric damping, and ω is 2π times the electric field frequency. The loss tangent, tan δ, commonly used to denote power lost to the material by the electromagnetic wave is defined as

(16) $\begin{array}{cc}\tan \delta =\frac{{\mathrm{\omega ϵ}}^{″}+\sigma }{{\mathrm{\omega ϵ}}^{\prime }}.& \left(4\right)\end{array}$

(17) Because electromagnetic heating of high temperature ceramics is generally dominated by material conductivity, the dielectric damping term, ωϵ″ is neglected, leaving

(18) $\begin{array}{cc}\tan \delta \cong \frac{\sigma }{{\mathrm{\omega ϵ}}^{\prime }}\propto n_{\mathrm{cb}}.& \left(5\right)\end{array}$

(19) From equation 5 it is clear that the energy lost in the material by an incoming electromagnetic wave (and converted to heat) is proportional to the number density of electrons in the conduction band.

(20) Methods Using Electric Potentials

(21) In most applications involving heating of a sample using cm or mm wavelength electromagnetic waves, it is desirable to be able to control the amount of heating experienced by the material. There are circumstances in which altering the output power of the radiation source or placing attenuators in the path of the beam are either undesirable or unviable options.

(22) As described in the previous section, if dielectric damping is neglected, heating of a ceramic material from an incoming electromagnetic wave is primarily due to the bulk conductivity of the material. This bulk conductivity is approximately proportional to the density of electrons in the conduction band. This suggests that another way to control the heating of a material is to manipulate the conduction band electron population and thus change the way the material absorbs the incoming electromagnetic energy.

(23) The present inventors have found a way to change the spatial distribution of conduction band electron population, which is shown by the illustration of a heated ceramic 200 in FIG. 2. Electrically conductive material such as a conductor plate 220 can be placed in electrical contact with the hot ceramic material 210. A neutral region 240 of the ceramic material 210 is located next to the conductor plate 220. In this example it can be assumed that the ceramic material 210 and the conductor plate 220 are infinite in the Y and Z directions, effectively reducing the arrangement to a 1-D system (in the X direction).

(24) As illustrated in the diagram 300 in FIG. 3, if a positive voltage bias 250 is applied to the conductor plate 220, mobile electrons will flow through the neutral region 240 toward the conducting plate 220 until a positive sheath 245 is formed on the right-hand side of the ceramic material 210, that is, to the right of the neutral region 240. A positive bias potential 250 is used in this example; however, it should be appreciated that the conducting plate 220 could also be biased negatively. Within the sheath 245, electrons are depleted, leaving a combination of positively charge ions and neutral atoms (giving the sheath 245 an overall positive charge when a positive bias is applied). The sheath 245 will continue to expand until the potential due to the exposed positive charge on the right hand side (sheath 245) balances the potential due to the positively biased conducting plate 220, such that the electric field in the neutral region 240 between the conducting plate 220 and the sheath 245 is zero. Alternatively, if the applied bias was negative, positive sheath 245 would lie adjacent conducting plate 220. It is possible to generate this type of sheath effect in more complicated geometries by using embedded electrodes 225, such as that shown in the diagram 400 of FIG. 4; however, for simplicity, the example geometry provided in FIG. 3 will continue to be used.

(25) Conceptually, a heated ceramic 210 having enough thermal energy to promote some of its electrons to the conduction band can be viewed as plasma. Like electrons in a plasma, the conduction band electrons are free to move about an arrangement of positively charged ions; however, unlike ions in a typical plasma, the background lattice ions in a solid are effectively stationary. For the present discussion, the issue of ion mobility is ignored.

(26) An estimate of the sheath thickness can be made by replacing the heated ceramic in FIG. 3 with a zero temperature plasma (plasma is in electrostatic equilibrium with zero electron motion) in which the plasma density is set equal to the conduction band electron population of the heated ceramic (n.sub.cb=n.sub.p). In this configuration, the sheath thickness, s, at a given applied voltage, V.sub.0 follows the relation

(27) $\begin{array}{cc}s=\sqrt{\frac{2V_0{ϵ}_0}{n_{p}e}}.& \left(6\right)\end{array}$

(28) FIG. 5 depicts a chart 500 Of sheath thickness calculations based on equation 6 for three different conduction band electron densities. In actuality, due to electron mobility, sheath boundaries will not be as well defined as in the zero temperature models. Additionally, this analysis ignores the secondary sheath formed due to thermal motion of conduction band electrons in areas where the conductor contacts the ceramic material. This secondary sheath is not of interest in the present discussion, as it is not as strongly affected by applied DC electric fields or potentials as the primary sheath.

(29) As described previously, and as shown by equation 5, the power absorbed in the ceramic is proportional to the conduction band electron density. When a positive voltage is applied to the conductors in contact with or embedded in the ceramic, the formation of the positive sheath creates a region in which electromagnetic energy is much less readily absorbed due to the reduced density of electrons in this region. In this manner, by controlling the location of the sheath boundary, it is possible to control where in the material that the majority of the heating will occur.

(30) In certain configurations, such as the diagram 600 shown in FIG. 6, the sheath forming effect could be used as an electrically controllable attenuator for the electromagnetic energy. Specifically, when no bias is applied to the conduction wires (lying along the Z axis), the hot ceramic attenuates the incoming electromagnetic radiation. When a voltage is applied to the wires and a positive sheath is formed, more electromagnetic energy will pass through the assembly due to reduced absorption in the sheath region. It should be noted that in this configuration, the electric field would be preferably oriented in a direction orthogonal to the direction of the wires. It can be appreciated, however, that the wires could be oriented such that the Rf electric field is not exactly orthogonal, but such a configuration would be less desirable because of increased coupling of the RF energy to the wires.

(31) Methods Using Magnetic Fields

(32) Instead of using an electric field, as described previously, it is also possible to control electromagnetic heating in a ceramic by applying a magnetic field, as shown in the diagram 700 in FIG. 7. In plasma, applying a magnetic field can alter the motion and mobility of charged particles. In reference to plasma, charged particles, specifically electrons in the present case, gyrate around magnetic field lines in a plane perpendicular to the direction of the magnetic field lines at the location of the charged particle. Because of this effect, electrons are prevented from moving across magnetic field lines, but are free to move along the direction of the magnetic field lines. A similar effect occurs with the conduction band electrons in a heated ceramic when immersed in a magnetic field.

(33) When the electric field polarization of incoming electromagnetic radiation is oriented normal to an applied magnetic field, the decreased electron mobility in the direction of the incoming electromagnetic radiation will reduce the degree to which the electrons can interact with the electromagnetic wave. As a result, the magnetized portion of the ceramic will absorb less energy. If the electric field of the incoming electromagnetic wave is polarized parallel to the DC magnetic field, the wave will more readily couple to the electrons due to the increased electron mobility in that direction, thus resulting in heating close or equal to the unmagnetized case.

(34) It is possible to use an applied magnetic field to enhance energy absorption in the heated ceramic with respect to the unmagnetized case. If the magnetic field is set such that the gyration frequency of the electrons, or cyclotron frequency, is equal to that of the incoming electromagnetic wave, the electrons will resonantly absorb energy from the wave and transfer it as heat to the surrounding material via collisions. The cyclotron frequency, f.sub.c, in the presence of an applied magnetic field, B, is defined as

(35) $\begin{array}{cc}{f}_c=\frac{.Math.e.Math.B}{2\pi m_e^{*}}.& \left(7\right)\end{array}$

(36) In regions where the magnetic field is such that the incoming electromagnetic energy is at or close to the cyclotron frequency, absorption of the electromagnetic energy in the heated ceramic material will be greater than in unmagnetized cases or cases where the applied magnetic field is such that the cyclotron frequency is sufficiently different from the frequency of the incoming electromagnetic wave.