Patent Grant
7877020
The present application claims the benefit of U.S. Provisional Patent Application No. 60/795,687, filed on the date even herewith, by Robert R. Hayes, entitled DOWN CONVERSION FOR DISTORTION FREE RECOVERY OF A PHASE MODULATED OPTICAL SIGNAL, herein incorporated by reference in its entirety.
The photonic transmission of high frequency microwave signals is typically accomplished by impressing the RF as an envelope on the amplitude of an optical carrier, using either an electro-optic (EO) or electro-absorption (EA) modulator. Although linearized EO modulators have been proposed for many years, the vast majority of modulators available for analog transmission still suffer from intrinsic nonlinearities in their transfer function. For example, the most common Mach Zehnder EO modulator possesses a raised-cosine modulation transfer curve.
As a result, intermodulation products and harmonic distortions are incurred at the transmitter end of these intensity or amplitude modulated analog links, giving rise to well-known impairments of the link's spur free dynamic range (SFDR).
Thus, what is needed is a high spur free dynamic range in an optical link. Further, what is needed is a high spur free dynamic range in an optical link for high frequency signals.
In one of many possible implementations and embodiments, a method is provided for providing linearized phase modulation in an RF-photonic link having an RF input and an RF output. The method includes phase modulating a photonic carrier signal in a signal arm using the RF input. The method further includes using the RF output in a negative feedback phase tracking loop to modulate either the RF input modulated carrier signal in the signal arm, or a signal in a local oscillator arm. Optical signals from the signal arm and the local oscillator arm are coupled to provide coupled optical signals. The coupled optical signals are photodetected and differentially combined. The differentially combined signals are amplified to provide the RF output signal.
In some implementations, the photonic carrier signal is suppressed prior to photodetection. Further, in some implementations a small portion of the local oscillator signal may be coupled with the carrier suppressed optical signal.
The features and advantages of the present invention will be better understood with regard to the following description, appended claims, and accompanying drawings where:
If the phases of the optical fields in the signal arm 120 and local oscillator (LO) arm 130 are given by φs(t) and φLO respectively, then the beat-term that allows one to recover the phase-modulation φs(t) is given by: EsELO cos [(ωs−ωLO)t+(φs−φLO)]/2. Assuming that φLO has been phase locked to optimize phase-detection, the phase-modulation φs(t) needs to be extracted from a photocurrent id that is proportional to EsELO sin [(ωs−ωLO)t+φs(t)]. Since φs(t) is part of a sine function's argument, phase-demodulation in a conventional coherent receiver suffers from sinusoidal nonlinearities due to the very process of heterodyning (or homodyning if ωs=ωLO).
The receiver (shown as 102 in
The embodiment of
The physical layout of a homodyne approach is especially attractive for antenna remoting applications that utilize external modulation. In these applications, the single frequency laser source 105 is typically co-located with the optical receiver (photodetectors 165 and amplifier 170) in a secure area. Therefore, one can tap off a small fraction of its output power PL with a splitter 110 and use it as the local oscillator (LO) in the coherent receiver 102. Using this homodyne approach substantially simplifies the hardware requirements for the coherent link 100. To achieve optimal coherent detection, one only needs to keep the relative time-delay between the signal arm 120 and LO arm 130 to less than the inverse of the linewidth of the laser source 105.
As shown in
Homodyne (or heterodyne) detection of a phase-modulated optical carrier introduces sinusoidal nonlinearities. In conventional coherent receivers, the phase modulation φ(t) is recovered from a beat-signal that is proportional to [EsELO sin(ωLOt−ωst+φ(t))]/2, where Es and ELO denote, respectively, the input optical fields of the signal arm 120 (of frequency ωs) and LO arm 130 (of frequency ωLO). For a homodyned coherent optical link, ωs=ωLO, and the source of the nonlinearity of the detected signal, sin(φ(t)), becomes apparent. To achieve a large SFDR in a coherent RF-photonic link 100, one needs to devise an approach that can recover the optical phase φ(t) with little or no distortion at the receiver 102. This is precisely the function of the phase-tracking loop 140 depicted in
Using the phase tracking modulator 135, the photocurrent Ii (i=1,2) obtained from the two photodiodes 162, 164, (each with quantum efficiency ηd) in the double-balanced (differential) photodiode receiver 165 becomes:
Notice that the sinusoidal signal of the homodyned output now has a new argument ε=(φ−θ), as opposed to the φ(t) discussed above. Expressing the differential photocurrent Δid (=I1−I2) that feeds the post-amplifier 170 of the receiver 102 in terms of photocurrents due to the signal arm 120 (Is=Es2/2) and LO arm 130 (ILO=ELO2/2), yields the following:
Δid=2√{square root over (IsILO)} sin(φ−θ)=2√{square root over (IsILO)} sin(ε) (2)
Thus, the coupler 150 along with and the detectors 165 provide a dual balanced detector system that couples and converts the photonic signals of signal arm 120 and LO arm 130 to the differential current id.
The linearization mechanism of the phase-tracking loop becomes transparent when we solve for the loop's output voltage Vout(t), obtained after the post-amplifier [with Gain=GA(ωm)]. Accomplishing that, the argument of the sine-term in the equation (2) is ε=[πVin/(Vπ)φ]GL−1, as opposed to φ=[πVin/(Vπ)φ] for a conventional homodyne link that has no phase tracking. Here, (Vπ)φ and GL denote, respectively, the half-wave voltage of the EO mod1 125 and the loop-gain in the phase-tracking loop 140. Typically, GL is designed to be much greater than 1 for linearization. Therefore, the magnitude of the argument for the sinusoidal term (in Eq. 2) is substantially reduced via negative feedback. This argument reduction [from φ(t) to ε(t)] is the mechanism responsible for our link linearization, and the subsequent enhancement in SFDR. For a half-wave voltage (Vπ)θ in the tracking-modulator θ-mod, GL is given by:
where D is a transimpedance (in Ω), and τd represent the aggregate time-delay, illustrated at 142, in the feedback loop 140. Note that the time delay τd may be inherent in, or designed into the path length of the feedback loop 140, and not a separate component, or structure as shown for discussion purposes.
The time of propagation through the phase tracking feedback loop 140 is such that it corresponds to less than 180 degrees at the highest operating frequency for which there is unity gain greater than 1. (The unity gain is for entire phase tracking loop 140.) This will keep the feedback loop 140 from causing oscillations.
In some embodiments, the post-amplifier 170 may be an operational amplifier (OpAmp) that possesses: (i) a single-pole response, and (ii) a large gain-bandwidth product ft. For such an amplifier, the frequency response GA(ω) can be modeled as:
where ωt=2πft, and Go is the open loop gain of the amplifier 170 at low frequencies. Using a transistor-ft of 406 GHz offered by InP-HBT technologies, it should be possible to attain a large amplifier gain-bandwidth product (ft) greater than 50 GHz. This will, in turn, help boost the loop gain available for link linearization.
The optical signals from the signal arm 220 and the local oscillator arm 230 are coupled with a coupler 250 in the receiver 202, such as a 3 dB coupler, and provided to photodetectors 265. The photodetected signals is supplied to an amplifier 270, which provides the RF Output Vout(t). The return path 240r of the phase lock loop 240 couples the RF Output signal Vout(t) to the phase tracking modulator 235.
Referring to
Carrier suppression allows suppression of the carrier of the phase-modulated (PM) optical signal, so that only the energy in the phase modulated sidebands reaches the photodetector(s). This allows the use of carriers with very high energy, and hence achieves a very high Signal to Noise Ratio (SNR), without having the accompanying concerns of photodetector overload and burnout. This improves the spur free dynamic range. Further, this technique can also mitigate the effects of detector nonlinearity.
In conventional phase modulation (not shown), the carrier of a phase modulated signal can be suppressed at the transmitter by using a Mach-Zehnder modulator with single-sided drive. The DC-balance of the modulator's interferometer is adjusted so that the light in one arm is 180 degrees out-of-phase with that in the other, so that with no applied modulation the two lightwaves exactly cancel in the interferometer's summing junction. When a modulation signal is applied to the modulator, this perfect cancellation is destroyed, and a small amount of light passes through the modulator. The energy in this light is that of the phase modulation sidebands.
Such a technique for carrier suppression, however, is unsatisfactory for systems requiring very high linearity. This is because the magnitude of the broadcast sideband is proportional to 2 sin(φ/2), where φ is the time-dependent modulation angle. Thus, if one has a transmitter that produces a phase shift φ that is linearly related to the drive signal, the received signal will be distorted because it is proportional to 2 sin(φ/2), and not to φ. Although for small signals the difference between 2 sin(φ/2) and φ is not appreciable, the difference nevertheless causes distortion that limits the performance of systems requiring high Spur Free Dynamic Range (SFDR).
The Spur Free Dynamic Range (SFDR) for a coherent PM optical link is given by:
where Is is the photodetector current of the carrier lightwave, e the electron charge, Δf the receiver noise bandwidth, and GL the gain of the negative feedback loop. GL is unity for conventional phase detection and greater than unity for the phase-tracking approach that we shall describe below.
To get the largest possible SFDR, Is should be as large as possible. The only real constraint on doing this is the current-handling capability of the photodiodes, which is presently limited in conventional technologies to about 20-30 mA. To get the benefit of higher current levels using such technologies, some form of carrier suppression must be used.
It is possible to suppress the carrier completely at the transmitter by adding a field that is 180° out of phase with the carrier, and then transmit and receive a small sideband signal that is proportional to 2 sin(φ/2).
After being processed by the coherent receiver (photodetectors 265 in
There is, however, a fundamental problem in doing this for PM if the goal is very high SFDR. If the carrier is suppressed at the transmitter, the information necessary to accurately recover the phase angle φ is lost, i.e., it is possible to accurately determine the phase angle φ from the resultant vector without knowing the length of the original vector. By transmitting only the resultant vector, it is not possible to achieve an SFDR higher than that for conventional phase or amplitude modulation, both of which are limited by the distortion caused by the sinusoidal dependence on the phase angle φ.
As such, to accurately measure the phase-modulation of an incoming wave, the sidebands and the carrier are necessary. Both are needed to recapture the phase angle φ. The implementation discussed below uses the complete incoming wave (carrier plus sidebands) to determine the phase angle φ, and then strips off the carrier before the signal reaches the photodetectors. Thus, it is possible to have both a high SNR and a small detector photocurrent.
Various embodiments discussed herein can provide a super-high linearity analog optical link that could be used either with fiber-optics or free-space communications. Phase modulation is discussed herein because the phase modulation process is perfectly linear. Thus, if one can make a receiver that is also has ultra high linearity, a high-linearity link will result.
Turning to
When the phase tracking loop is functioning correctly, the resultant vector will have a vanishingly-small length, which means that the angle θ essentially equals the phase angle φ, and near-perfect tracking has been achieved. A non-zero resultant vector generates an error voltage that tells the loop 340 in which direction and by how much it must shift angle θ with the electro-optic phase tracking modulator 335 to reduce the error voltage to zero.
Simple photodetection of the lightwave of the resultant vector is not adequate to control the phase-tracking loop 340. The measured signal would be quadratic in vector length, and would give no information about the vector direction (positive or negative). To get an error signal that gives both the vector's linear length and its direction, coherent detection is necessary. To obtain the vector direction, the resultant vector from the coupler 350 is optically coupled with the local oscillator signal Elo(π/2) using coupler 380, which in some embodiments may be a 50:50 optical coupler.
The current at the output of the photodetectors 365 is given by:
I(t)=√{square root over (2IsIlo)} sin [φ(t)−θ(t)]
I(t) is amplified by a transimpedance amplifier 370, which both amplifies it and converts it into a voltage. This voltage is used to drive the electro-optic phase tracking modulator 335 that shifts the phase of the incoming signal Es (or that of the local oscillator Elo(π/2)) by angle θ. The high gain of the negative feedback created by this loop 340 drives the error signal, which is proportional to φ−θ, to a vanishingly-small value. The finiteness of this value determines the ultimate value of the SFDR achievable with this approach.
The current I(t) is a factor of √{square root over (2)} smaller than the signal one would achieve if all of the energy of the incoming lightwave were directed into a standard dual-balanced receiver. To get the same SNR and SFDR of a signal beam having a detector-equivalent power of Is, one must transmit a power of 2 Is. The price paid for using this scheme is therefore additional power: additional power in the transmit beam, and the power needed to supply the anti-parallel lightwave at the receiver.
The requirement that the summed optical fields Es and Elo(π/2) have equal magnitudes is not a stringent one. This is because the coherent receiver (photodiodes 365 and amplifier 370) of
The carrier suppression technique discussed herein can be used in receivers employing conventional homodyne detection. It provides significant benefit, however, when used with receivers that employ negative feedback to track the phase because the combination of phase tracking and carrier suppression can yield an optical communication link with ultra-high linearity.
Turning to
The local oscillator arm 430 has an asymmetric splitter 437, which splits the signal in the local oscillator arm 430 providing a portion of the signal in the local oscillator arm 430 to the coupler 450. Thus, the phase lock loop modulated signal of the signal arm 420 and the local oscillator signal of the local oscillator arm 430 are optically coupled with an optical coupler 450, such as with a 50:50 optical coupler. The optical coupler 450 provides the carrier suppressed sideband signal to the optical coupler 480 where it is optically coupled with a small portion of a signal from the local oscillator arm 430. The local oscillator signal is split with an asymmetric splitter 437 and supplied to the optical coupler 480 via an optical phase trimmer 439. The asymmetric splitter 437 may be a 100:1 splitter, for example, and the phase trimmer 439 can be a static phase shifter for shifting the phase of the local oscillator signal to compensate for any differences between the path length of the signal arm 420 and the local oscillator arm 430. Additional phase trimmers and/or different locations are possible to compensate for varying path lengths in the signal arm 420 and local oscillator arm 430.
The output of the optical coupler 480 is supplied to the photodetectors 465. As with the other embodiments discussed herein, the optical coupler 480 along with the photodetectors 465 are a dual balanced detection system that couples the photonic signals of the local oscillator arm 430 with those of the signal arm 420 and provides a differential output signal to the amplifier 470. Thus, the photodetected signals are supplied to an amplifier 470, which provides the RF Output Vout(t). The return path 440r of the phase lock loop 440 couples the RF Output signal Vout(t) to the phase tracking modulator 435.
Turning to
As such, various embodiments allow determination of the phase angle φ as accurately as desired, while simultaneously suppressing the carrier at the detector. When combined with negative feedback, some embodiments could allow SFDR values approaching 150 dBm Hz2/3, a value which is 25 dB higher than conventional analog optical links. The use of negative feedback without this type of carrier suppression would reduce the achievable SFDR value by approximately 7-10 dB. Thus, carrier suppression can make an important contribution to the net SFDR of such an RF photonic link.
In some embodiments discussed above, components such as the phase-tracking modulator, the coupler for combining the signal arm and LO-arm, i.e. a multimode interference (MMI), the photodetectors, i.e. waveguide-coupled PIN photodiodes, and the OpAmp may be all integrated on an InP substrate. According to simulations by the present inventors, the phase-tracking modulator can be realized with thin films (such as BaTiO3) that can demonstrate (Vπ×length) product of 1 to 2. For the above (Vπ×length) product, it is possible to fabricate modulators as short as 200-400 μm and still obtain a (Vπ)θ of ˜50 V. This will allow us to satisfy the loop-stability requirement for a phase-tracking loop with a time-delay constraint of 13.3 psec (or a physical length constraint of 1.14 mm in InP), for an SFDR enhancement (ΔSFDR) of 23 dB.
Various embodiments and implementations described herein may be embodied and/or implemented with down conversion disclosed in the above referenced invention entitled DOWN CONVERSION FOR DISTORTION FREE RECOVERY OF A PHASE MODULATED OPTICAL SIGNAL, by Robert Hayes, incorporated by reference. Thus, down conversion may be utilized in the receivers 102, 202, 402, and 502, of the various embodiments and implementations disclosed herein. In the embodiments discussed above, the amplifiers 170, 270, 370, 470, and 570 may be replaced with the quadrature circuit 270.
Having described this invention in connection with a number of embodiments, modification will now certainly suggest itself to those skilled in the art. As such, the invention is not to be limited to the disclosed embodiments except as required by the appended claims.
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