1. Field of Invention
The techniques and apparatus described herein relate to piezoelectric electromechanical devices such as piezoelectric electromechanical transistors.
2. Discussion of the Related Art
Resonators are widely used in communication applications as filter components and as signal sources at selected frequencies. Some communication devices use conventional LC tank resonator circuits which have difficulty meeting the insertion loss, quality factor and out-of-band rejection capabilities needed to meet today's filtering requirements. A significant proportion of cellular telephones currently in use have large passive mechanical components such as Surface Acoustic Wave (SAW) and Film Bulk Acoustic Resonator (FBAR) components which have seen very little miniaturization over the past few years.
Microelectromechanical resonators can be produced having quality factors (Q) that are often several orders of magnitude higher than those of LC circuits, and offer the potential for integration using microfabrication. As the size of transistors continues to shrink, transistor threshold frequencies have increased, enabling transceiver circuitry to be designed to operate at frequencies in the range of tens of GHz. Conventional microelectromechanical resonators are not well-suited to such high frequency applications at least in part because of their capacitive coupling, which causes undesirable capacitive feedthrough between the input and output terminals at high frequencies.
Some embodiments relate to a piezoelectric electromechanical transistor that includes a semiconductor region in which are formed first and second terminals of the piezoelectric electromechanical transistor, a gate and a piezoelectric region between the gate and the semiconductor region. The piezoelectric region is configured to induce a change in strain of the semiconductor region in response to a signal applied to the gate.
Some embodiments relate to a piezoelectric electromechanical transistor that includes a semiconductor region in which are formed first and second terminals of the piezoelectric electromechanical transistor, a gate and a piezoelectric region between the gate and the semiconductor region. A signal is produced at the first terminal at least partially based on a change in strain of the semiconductor region.
Some embodiments relate to method that includes providing a first signal to a gate of a transistor to induce a change in strain of a semiconductor region using the piezoelectric effect, and receiving a second signal from the semiconductor region produced by the transistor.
Some embodiments relate to a piezoelectric electromechanical device that includes a first gate, a first piezoelectric region, a first region, a second piezoelectric region, and a second gate. The first piezoelectric region is configured to induce the piezoelectric electromechanical device to vibrate in response to a signal applied to the first gate.
Some embodiments relate to a method that includes applying a signal to a gate that creates strain in a piezoelectric material, thereby causing vibration and/or movement of a transistor.
Some embodiments relate to a method that includes receiving a signal from a drain based on strain of a piezoelectric material and a semiconductor material due to movement and/or vibration of a transistor.
The foregoing summary is provided by way of illustration and is not intended to be limiting.
In the drawings, each identical or nearly identical component that is illustrated in various figures is represented by a like reference character. For purposes of clarity, not every component may be labeled in every drawing. The drawings are not necessarily drawn to scale, with emphasis instead being placed on illustrating various aspects of the techniques and devices described herein.
a shows a top view of a piezoelectric electromechanical transistor, according to some embodiments.
b shows a cross-sectional view of the piezoelectric electromechanical transistor of
a shows a top view of a passive piezoelectric electromechanical device, according to some embodiments.
b shows a cross-sectional view of the passive piezoelectric electromechanical device of
Described herein are embodiments of a piezoelectric electromechanical transistor that can integrate both a transistor and a resonator in the same device. Integrating a transistor with a resonator can enable reducing the capacitive floor with respect to the output signal by electromechanically amplifying the mechanical signal. The use of piezoelectric actuation and/or sensing can reduce the impedance of the device by increasing the electromechanical coupling coefficient.
a shows a top view of a piezoelectric electromechanical transistor 1, according to some embodiments. Piezoelectric electromechanical transistor 1 includes a semiconductor region 2, a first gate 4, a second gate 6, a first piezoelectric region 8 and a second piezoelectric region 10. The body of the piezoelectric electromechanical transistor 1 may be formed in semiconductor region 2. As shown in
In some embodiments, piezoelectric electromechanical transistor 1 may be formed using a semiconductor wafer with suitable microfabrication techniques, such as surface micromachining, bulk micromachining, or any other suitable technique. The piezoelectric electromechanical transistor 1 may be formed in any suitable orientation with respect to the semiconductor crystal. In some embodiments, the semiconductor region 2 may be formed from a device layer of an SOI (silicon on insulator) wafer. However, piezoelectric electromechanical transistor 1 need not be formed using a semiconductor wafer, as piezoelectric electromechanical transistor 1 may be formed using any suitable material or type of substrate.
In piezoelectric electromechanical transistor 1, semiconductor region 2 may be formed of silicon or any other suitable type of semiconductor material, such as another group IV semiconductor material (e.g., germanium), a III-V semiconductor material or a II-VI semiconductor material. Piezoelectric regions 8 and 10 may be formed of any of a variety of piezoelectric materials, such as aluminum nitride (AlN), gallium nitride (GaN), or zinc oxide (ZnO), for example. Gates 4 and 6 may be formed of a metal, such as molybdenum, for example, or a semiconductor material such as polysilicon. If the piezoelectric films are leaky, a dielectric may be added to the surface of the piezoelectric regions 8 and/or 10 to insulate the piezoelectric region from the gate and/or semiconductor region. Such a dielectric may be formed of a material such as silicon nitride (SiN), hafnia (HsO2), silicon dioxide (SiO2) or any other suitable dielectric material. The materials described herein are listed merely by way of example, as the techniques and devices described herein are not limited to particular materials.
In the embodiment illustrated in
Semiconductor region 2 forms the body of piezoelectric electromechanical transistor 1. Any suitable type of transistor may be used in piezoelectric electromechanical transistor 1, such as a field effect transistor (FET) or a high electron mobility transistor (HEMT), for example. In the embodiment shown in
In some embodiments of piezoelectric electromechanical transistor 1, applying an AC voltage to gate 4 generates an electric field in piezoelectric region 8 that produces a strain in the piezoelectric region 8 based on the piezoelectric properties of piezoelectric region 8. In response to an electric field along the x-axis, the piezoelectric region 8 may expand and contract along the x-axis, causing the piezoelectric electromechanical transistor 1 to vibrate. The piezoelectric electromechanical transistor 1 may be driven to resonate in response to the driving signal applied to the gate 4. The piezoelectric electromechanical transistor 1 may thereby vibrate in a bulk acoustic wave mode, back and forth along the x-axis. In a bulk acoustic wave mode of vibration, substantially the entire piezoelectric electromechanical transistor 1 may be driven to vibrate throughout substantially the entire height H of the piezoelectric electromechanical transistor 1. In response to an AC driving voltage, the piezoelectric electromechanical transistor 1 may be driven to resonate at its resonance frequency. As the piezoelectric electromechanical transistor resonates, the mobility and concentration of carriers between the source and drain regions of the piezoelectric electromechanical transistor 1 is modulated by the varying strain produced in the semiconductor and piezoelectric regions. The changing strain of the piezoelectric electromechanical device 1 can be sensed to generate an output signal at a drain region D of the transistor.
In some embodiments, the resonance frequency of the piezoelectric electromechanical transistor 1 may be in the range of 100 MHz or higher. However, the piezoelectric electromechanical transistor 1 may be constructed to have any suitable resonance frequency, such as a resonance frequency in the kHz range or the MHz range, as the techniques described herein are not limited in this respect.
Although piezoelectric electromechanical transistor 1 has been described as operating in a bulk acoustic wave mode, the piezoelectric electromechanical transistor may operate in other modes of vibration, such as a flexural mode of vibration or a shear mode of vibration, as the techniques described herein are not limited to operation of the device in a bulk acoustic wave mode of vibration. Depending on the shape and structure of the piezoelectric electromechanical transistor 1, the piezoelectric electromechanical transistor may be driven to resonate in various modes of vibration such as a breathing mode of vibration, a wine glass mode of vibration, or another mode of vibration.
In some embodiments, acoustic vibrations may be driven piezoelectrically, through the e33 piezoelectric coupling coefficient, resulting in a high driving stress and large amplitude of vibrations. On the sensing side, the piezoelectric region 10 may experience a strain due to the longitudinal vibrations in the piezoelectric electromechanical transistor 1, and this results in a modulation in the polarization which produces an electric field across the piezoelectric region through the inverse piezoelectric coefficient. An output signal can be sensed as a modulation in the DC transistor current. The piezoelectric and piezoresistive components typically are the dominant terms over the capacitive contribution.
An analytical model for the embodiment of the piezoelectric electromechanical transistor 1 shown in
Driving of Acoustic Vibrations
Piezoelectric Contribution
Piezoelectric electromechanical transistor 1 may be operated as a transistor by biasing the source voltage Vs at ground and by applying a DC voltage VD to the drain and a DC voltage VG to gate 6. The driving gate 4 (e.g., the back gate) of the piezoelectric electromechanical transistor 1 may be biased into accumulation by applying a DC voltage VA. A small AC voltage vacejω
and an average value for the electric field across the piezoelectric region 8, which may be an AlN film of thickness g, is
The equations of piezoelectricity may be expressed in the following manner:
T=cS−eTE
D=eS+∈E
in which S is the strain matrix, T is the stress, c is the compliance matrix. E is the electric field applied externally and D is the electric displacement matrix. e and eT are the piezoelectric matrices (direct and transpose) and ∈ is the dielectric matrix.
For a crystal with hexagonal symmetry such as AlN, this matrix assumes the following form:
Using the above, the resultant in-plane stress in the piezoelectric film, σpiezo, along the direction of the electric field, which is also along the direction of the c-axis of an AlN crystal is given by
Thus, the AC stress, σp, is given by
Electrostrictive Contribution
In addition to the piezoelectric effect, electrostriction may also contribute to stress in the piezoelectric films. Mathematically, electrostriction can be defined as the quadratic coupling between strain (s) and electric field (E), or between strain and polarization (P). This is a fourth-rank tensor expressed by the following relationships:
sij=cEijklTij+MijmnEmEn
sij=cPijklTij+QijmnPmPn.
Using the second equation above, one can see that for a piezoelectric film such as AlN, the strain along the direction i, j is defined as sij, is related to the stress along that direction Tij, through the compliance cPijkl and to the polarization along the directions m and n, through the coefficient Qijmn. If one applies an electric field in only one direction, for example, along the c-axis of the piezoelectric material, the resultant electrostrictive stress, σestric, will be expressed in terms of Epiezo, the Young's Modulus of the material and s33, the strain along the c-axis as:
σestric=Epiezos33
This expands to:
Where ∈0 is the permittivity of free space, kpiezo, is the relative permittivity of the piezoelectric film of thickness g, and V is the voltage applied across it.
From these equations, the stress induced due to electrostriction, σestric, or is given by:
Ignoring the DC component and the component at frequency 2ωn, the AC component of the electrostrictive stress is given by:
Thus, the total driving stress will be σdrive=σp+σe
Acoustic Vibrations in the Structure
The Resonance Frequency
The wave equation for the modal shape for the piezoelectric electromechanical transistor 1 can be constructed by modeling it as a lateral mode bar resonator:
u(x,t)=U0 sin(knx)·ejω
where U0 is the amplitude of vibrations and the wave number, kn, for the nth harmonic is given by
and the resonance frequency, ωn, given by:
where Eeff and ρeff are the effective Young's modulus and the density of the piezoelectric electromechanical transistor 1. One may calculate the resonance frequency using the method of fractional wavelengths. At resonance, for a standing wave to be formed in the resonator, the following relationship holds:
As the piezoelectric electromechanical transistor 1 includes a stack of materials with different acoustic velocities, for a resonance frequency fn, the acoustic wavelength corresponding to a material is given by
When gates 4 and 6 are formed of molybdenum, the wavelength is given by:
Similarly, one may determine the acoustic wavelengths in each of the films using the Young's moduli, E, and density, ρ, of the constituent materials, Si for silicon, piezo for the piezoelectric film and Mo for molybdenum gate material. Due to the condition of forming a standing wave at resonance, the total length is a multiple of a half-wavelength. Since the wavelength in each material is different, one may assume that the sum of fractional wavelengths in each material constituting the resonator is a multiple of ½. This may be expressed as:
Substituting for the expression for the wavelengths,
Eeff and ρeff
Eeff and ρeff may be calculated as the effective Young's modulus and the density of the piezoelectric electromechanical transistor 1. Vibrations may occur along x-axis, which includes a five-film stack of materials forming piezoelectric electromechanical transistor 1. These five films may be modeled as five springs vibrating in series in response to a bulk acoustic wave. It can be assumed that each of these films is a cuboidal bar, and the spring constant for the same can be calculated. For such a bar with length l, and cross sectional area w×h, the spring constant kbar for a force along the length l, is given by:
Thus, in this case, for gates 4 and 6 formed of molybdenum, with Young's modulus EMo, the spring constant kMo will be
The spring constant for the other films may be determined in a similar manner. The spring constant, keff, can be determined using the effective resonance length L of the piezoelectric electromechanical transistor 1, as
For the five springs vibrating in series, the individual spring constants are related to the effective spring constant as:
Canceling the common terms and rearranging,
Using the above value, the effective density is given by the relation
Amplitude of Vibrations
One can use the equation for damped vibrations in a bar (1D) to solve for the amplitude of vibrations:
However, before using this equation to calculate the amplitude of vibrations, the damping coefficient b may be calculated in terms of material properties and other measurable quantities.
Term A may be canceled throughout and u(x,t)=U(t)sin(knx) substituted into the beam equation, where U(t)=U0ejω
The Laplace transform on both sides is taken with respect to the variable t and initial conditions of displacement and strain are set to zero. Let the Laplace transform of U(t)sin(knx) be denoted by (x,s) and the Laplace transform of the RHS be denoted by F(x,s) to get:
(x,s)[ρeffs2+bkn2s+Eeffkn2]=F(x,s)
This may be re-written as the transfer function H(s) given by:
This is a second order system response, the denominator of which may be compared to the denominator of the second order harmonic oscillator response with quality factor (Q) and an undamped resonance frequency, ωn, which is given by:
Equating the constant,
one may equate the coefficient of the s term to determine the damping coefficient b as:
This is now substituted into the equation for damped vibrations in a longitudinal bar and solved to find the amplitude of vibrations. Canceling the cross section area term A, substituting u(x,t)=U0 sin(knx)·ejω
which may be rewritten as
The driving stress due to the piezoelectric film is a constant value through the thickness of the piezoelectric film, g, and zero elsewhere. Thus, the slope of the driving stress may be represented as delta functions at interfaces of the piezoelectric film between the semiconductor region 2 and the driving gate 4. As per the x-axis convention shown in
Thus,
Substituting this into the above equation, multiplying both sides by sin(knx) and integrating from −L/2 to L/2 gives:
Simplifying:
Sensing of Acoustic Vibrations.
Calculation of DC Current
The DC current in a field effect transistor having its source tied to ground, gate biased at VGS and drain biased at VDS, with a threshold voltage VT, is given by two relations. In the linear regime, when VDS≦VGS−VT, the current IDCLin is given as
In the saturation regime VDS≧VG−VT, and the current IDCsat is given by
Calculation of Threshold Voltage
a) For “Long” Bulk (i.e. Maximum Depletion Region Achieved)
In this case, the threshold voltage, VT, is calculated using the formula:
where the difference in work functions φms between the semiconductor material and the gate material, also known as the flatband voltage, is:
where the subthreshold voltage is given by φsth where q is elementary charge, k is the Boltzmann constant, T is the temperature, NA is the doping of the bulk silicon region and ni is the intrinsic carrier density
The depletion charge at maximum depletion width is given by Qdmax, where ∈Si is the permittivity of silicon
Qdmax=√{square root over (2∈SiqNAφsth)}
b) For “Short” Bulk (i.e. Fully Depleted)
As the bulk of the device may be quite short, it may be fully depleted before the maximum possible depletion depth is achieved. Hence the threshold voltage occurs when the device reaches its maximum depth of depletion layer, following which it goes into inversion. In this case, the threshold voltage is given by:
In this scenario, the depletion charge, Qdep, is given by
Qdep=qNA(2d−g)
The surface potential, which is obtained by integrating the charge Qdep over the depletion region, which is the entire length of the silicon layer, to obtain the E-field, which is then integrated to obtain the potential at the surface
where φbg is the surface potential at the back gate 4 and is itself dependent on the back gate voltage. This is responsible for the feed-through. The AC modulation may be ignored for now, and the surface potential is calculated at the back gate for the DC bias VA.
where γ is the body factor coefficient and is given by:
Piezoelectric Contribution
In a hexagonal crystal such as AlN, for an externally applied field E3, dielectric constant, ∈3, direct piezoelectric coefficient matrix given by e and the inverse piezoelectric coefficient matrix given by d (as discussed in the previous section) and strain given by S, the electric displacement vector D3 is given by
D3=∈3E3+d31(S1+S2)+d33S3=∈3E3+e31(S1+S2)+e33S3
Assuming that the 1-D standing wave at resonance, u(x,t), is only along the x direction, which is also the direction along which the c-axis is oriented and the 33 coefficient is relevant, i.e., assuming that there is no strain along other two directions (S1=S2=0). Thus, the above can be re-written as:
D3=∈3E3+d33S3
Since the contribution of the externally applied electric field is already accounted for as the term VGS in the DC current equation for the sensing side, setting E3=0 results in
D3=e33S3
From this expression for the electric displacement, the equivalent piezoelectrically induced electric field, Epiezo and the corresponding voltage across the piezoelectric film, Vpiezo is calculated as:
Simplifying:
The transistor current in the linear regime, IDCLin and in saturation, IDCsat, as seen in the previous section is given by:
The Vpiezo term contributes to an additional AC voltage on gate 6. Thus, in the linear regime, as long as the linear regime condition is satisfied with the net gate voltage (VDS≦VG+Vpiezo−VT) the net current can be written as a sum of the DC current, IDCLin, and an AC component, ipelec, as
This may be expressed in terms of the DC linear regime current as:
Similarly, in the saturation regime, (VDS≧VG+Vpiezo−VT)
This may be expressed in terms of the DC saturation current as:
Piezoresistive Contribution
The standing wave along the x-direction in the resonator results in a time-dependent strain along the channel which modulates the mobility due to the piezoresistive effect. From the previous section, this may be expressed as:
In the linear regime,
Similarly in the saturation regime,
The sign of the piezoresistive coefficient along the direction of the current determines whether this contribution is π/2 or 3π/2 phase-shifted with respect to the piezoelectric contribution.
Capacitive Contribution
Apart from the piezoelectric contribution to the output AC current, an AC current is present resulting from the change in the capacitance of the piezoelectric film. An insulating piezoelectric film forms a capacitor which squeezes and expands due to the acoustic wave, and this results in an additional AC current. Thus, this current is positive when the capacitance increases, i.e., when the piezoelectric film is compressed. Calculating the capacitance at DC, Cpiezo, and at the maximum amplitude of resonance, C′piezo, where the piezoelectric film expands to thickness g+Δg,
Thus, the change in capacitance, ΔCpiezo, assuming Δg is small, is given by:
The net increase in the thickness of the piezoelectric film, Δg, is calculated by integrating the strain function over the thickness of the film
Simplifying:
In the linear regime,
Similarly in the saturation regime,
The total modulation current in the linear or the saturation regime is thus given by summing these three contributions in that regime:
iout=ipelec+ipres+icap
The piezoelectric and capacitive contributions are in-phase with one another. The piezoresistive contribution is π/2 out of phase with the piezoelectric and capacitive contributions. This phase difference may be corrected with post-processing and/or minimized with design.
The relative contributions of the different physical mechanisms to driving and sensing will be discussed using an exemplary design.
A design example will now be discussed in which the piezoelectric electromechanical device 1 has exemplary dimensions and operating parameters. These parameters are described solely by way of example, as any suitable dimensions and operating parameters may be used.
Exemplary Dimensions and Parameters
Piezoelectric Coefficients for AlN
Electromechanical Drive
Using the values from the table of exemplary parameters, the relative amplitude of the piezoelectric and electrostrictive stress (AC) is given by:
Thus, the piezoelectric stress is more than two orders of magnitude greater than that due to electrostriction, hence the latter is assumed to be insignificant in subsequent analysis.
Electromechanical Sensing
For a gate voltage VG of 5V, threshold voltage <1V and drain voltage of 1V, the transistor may be operated in saturation. In this case, on the sensing side, the relative magnitude of the piezoelectric and the piezoresistive contribution in saturation is given by:
In the linear regime, the relative amplitude is given by:
and the relative magnitude depends on the values set for VGS and VDS. Thus for now it is assumed that both the piezoelectric and piezoresistive effects have a non-negligible contribution to the output current.
The relative magnitude of the piezoresistive and the capacitive contribution in the saturation as well as the linear regimes are given by:
Thus the capacitive contribution can be ignored while setting up the equations related to sensing signals from the device.
Equivalent Circuit Model
A small-signal equivalent circuit may be developed based on the resonance frequency and quality factor of the piezoelectric electromechanical transistor 1 (
Performance Trends
One can set up equations to plot the total AC output current iout vs time. Two of the control parameters are VGS and VDS. The effect of changing these control parameters on the AC output current will be discussed.
A non-linearity for small values of the gate voltage is believed to occur because the net gate voltage, which is given by VGS+Vpiezo switches between the saturation, linear and sub-threshold regimes. For the net gate voltage to stay completely in the saturation regime, VGS−Vpiezo−VT>VDS. For a threshold voltage VT=0.7V, VDS=1V, and Vpiezo=1V, the DC gate bias VGS≧2.7V. Higher gate bias voltages lead to larger AC output current as the DC bias current IDCsat increases with VGS in saturation, and the piezoelectric contribution to the AC output current also increases linearly with VGS following the transistor equations:
Thus, the higher the gate voltage, the higher the DC as well as AC output current, which leads to a higher transconductance and lower insertion loss for the device. The upper limit on this is that a large VGS will lead to a large leakage current through the piezoelectric film and ultimately may result in its breakdown.
For small values of VDS (<3.3V), the condition VGS−Vpiezo−VT>VDS holds for the known values of the VGS=5V, Vpiezo=1V and VT=0.7 V and the transistor remains in saturation and no dependence on VDS is observed as expected from the transistor equations. For intermediate values of VDS (between 3.3 V and 5.3 V), the transistor switches back and forth between the saturation and linear regimes when Vpiezo is near its peak values and a distortion in the output waveform is observed. For high values of VDS, the condition VGS−Vpiezo−VT<VDS holds, pushing the transistor into the linear regime where the dominant component of the AC output current, ipeleclin, is dependent on VDS through the relation:
Thus, for a sinusoidally varying output AC current the transistor should remain in the saturation or linear regimes. However, for a fixed drain voltage, the piezoelectrically modulated AC current in the linear regime is smaller than that in the saturation regime if:
when
Thus, one can conclude that the output signal may be maximized by applying high gate and drain voltages to the device, but the ability to apply high gave or drain voltages may be limited by the application.
A plot of the AC output current, iout and RMS distortion of iout as a function of the quality factor is shown in
Lchannel may be chosen to be small, but may be limited by fabrication tolerances. A larger length for Lchannel may, however, be advantageous for reducing spurious modes of vibration. The thickness of the piezoelectric film (g) as well as its position from the center of the device (d) are both parameters that may be optimized for specific resonator performance characteristics.
Comparison of Transistor Sensing and Passive Sensing
To analyze the effect of sensing using a transistor, a passive piezoelectric electromechanical device will be discussed having a structure similar to that of the piezoelectric electromechanical transistor 1 shown in
In some embodiments, the passive piezoelectric electromechanical device 11 can be operated by applying a actuation voltage of VA+vac to the driving gate 14, the semiconductor region 12 can be grounded and a DC voltage VG can be applied to the sensing gate 16.
For the passive piezoelectric electromechanical device 11, the effective spring constant, keff, is
Where the effective Young's modulus, Eeff, is determined as
Thus,
This equation can be used to determine an effective mass for the system, Meff, which is related to the effective spring constant as
keff=ωn2Meff
For the passive piezoelectric electromechanical device 11, the sensing current is the result of the time-dependent charge that accumulates at the piezoelectric film as a result of its vibrations. For an externally applied field E3, dielectric constant, ∈3, direct piezoelectric coefficient matrix given by e and the inverse piezoelectric coefficient matrix given by d (as discussed in the previous section) and strain given by S, the electric displacement vector D3 is given by
D3=∈3E3+e31(S1+S2)+e33S3=∈3E3+e31(S1+S2)+e33S3
Assuming a 1-D standing wave at resonance and S1=S2=0, and ignoring the externally applied DC field E3 the above can be re-written as,
D3=e33S3
As calculated previously, the corresponding voltage across the piezoelectric film, Vpiezo is given as:
The induced charge at the gate, Qpiezo, is calculated using the capacitive equation
The output current iout is given by
The equivalent motional impedance RX is given by
The equivalent motional inductance LX and capacitance CX is calculated so that the resonator may be simulated as an equivalent RLC circuit over a range of frequencies. The transduction efficiency η which is related to the motional impedance RX and the effective mass Meff as
The LX and CX are:
The performance of piezoelectric electromechanical transistor 1 will now be described and compared with that of the passive piezoelectric electromechanical device 11.
The RX of the piezoelectric electromechanical transistor 1 is about an order of magnitude lower than that of the passive piezoelectric electromechanical device 11 when the film position is selected to minimize RX. The amplitude of the AC output current as well as the impedance RX does not change monotonically with the piezoelectric film position with respect to the center of the device. In this example, an excellent RX occurs at d˜250 nm.
Next, the effect of the piezoelectric film thickness is described to illustrate how RX can be decreased.
Additional Embodiment
Application Examples
Microelectromechanical resonators provide a small size, low cost and low-power alternative to traditional LC tanks, which makes them attractive candidates which can keep pace with the miniaturization trends of the wireless communication industry. The piezoelectric electromechanical transistors described herein offer a low impedance, small footprint device that may be used with GHz-frequency transceiver circuitry as a low impedance high-Q component. In microprocessor technology, small-size silicon-based electromechanical resonators can provide synchronized low power clocking arrays with reduced jitter and skew, allowing the technology to scale to high frequencies with high-precision clocking.
Additional Aspects
Various aspects of the present invention may be used alone, in combination, or in a variety of arrangements not specifically discussed in the embodiments described in the foregoing description and is therefore not limited in its application to the details and arrangement of components set forth in the foregoing description or illustrated in the drawings. For example, aspects described in one embodiment may be combined in any manner with aspects described in other embodiments.
Also, the invention may be embodied as a method, of which an example has been provided. The acts performed as part of the method may be ordered in any suitable way. Accordingly, embodiments may be constructed in which acts are performed in an order different than illustrated, which may include performing some acts simultaneously, even though shown as sequential acts in illustrative embodiments.
Use of ordinal terms such as “first,” “second,” “third,” etc., in the claims to modify a claim element does not by itself connote any priority, precedence, or order of one claim element over another or the temporal order in which acts of a method are performed, but are used merely as labels to distinguish one claim element having a certain name from another element having a same name (but for use of the ordinal term) to distinguish the claim elements.
Also, the phraseology and terminology used herein is for the purpose of description and should not be regarded as limiting. The use of “including,” “comprising,” or “having,” “containing,” “involving,” and variations thereof herein, is meant to encompass the items listed thereafter and equivalents thereof as well as additional items.
This invention was made with government funding under Grant No. N66001-10-1-4046, awarded by the Space and Naval Warfare Systems Center. The government has certain rights in this invention.
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3792321 | Seifert | Feb 1974 | A |
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5293138 | Kansy | Mar 1994 | A |
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6727522 | Kawasaki et al. | Apr 2004 | B1 |
7687971 | Stokes et al. | Mar 2010 | B2 |
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Number | Date | Country | |
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20130038383 A1 | Feb 2013 | US |