Mid-infrared (mid-IR) signals can be converted to near-infrared (near-IR) wavelengths in As 2S 3-on-LiNbO 3 waveguides by high efficiency four-wave mixing. It provided us a solution to detect mid-IR signals indirectly by state-of-the-art near-IR detectors. High efficiency four-wave mixing was demonstrated and electrical signal-to-noise ratio (eSNR) improvement was also investigated. Compared to direct detection by PbSe and HgCdTe (MCT) mid-IR detectors, the calculation indicated that, at room temperature, the indirect detection to mid-IR signals increased the electrical signal-to-noise ratio up to 67 dB.
There is a wide variety of mid-IR applications in different fields, including environment, medicine and military. Mid-IR detectors are extremely limited in terms of operation condition, noise performance and speed [
Four-wave mixing (FWM) is a third-order nonlinear process. In degenerate FWM, if the phase-matching condition is met, two pump photons and a signal photon will generate an idler photon. Previously, we successfully fabricated low-loss As2S3-on-LiNbO3 for mid-IR at 4.8 µm [
In this paper, we demonstrated high efficiency FWM design in As2S3-on-LiNbO3 waveguides with thin MgF2 cladding on top. Under 0.1 GW/cm2 pump power intensity at 2.05 µm, mid-IR signals at 4.6 µm can be converted to 1.32 µm near-IR signals with −10.5 dB parametric conversion efficiency. In order to analyze the eSNR improvement in indirect detection, we calculated the noise performance in detection of 4.6 μm mid-IR signals by using PbSe and MCT mid-IR detectors and In GaAs near-IR detector after an As2S3-on-LiNbO3 wavelength converter. Our calculation showed that the indirect detection to mid-IR signals can increase the eSNR up to 67 dB, which is 17 dB higher than the results in silicon waveguides in [
In order to achieve high efficiency FWM, phase-matching condition has to be satisfied.
The parametric conversion efficiency Gi is described by Equation (1) as below:
where g is parametric gain, γ is propagation constant and Leff is the As2S3-on-LiNbO3 waveguide length for nonlinear process. They can be expressed by Equation (2)
where Δκ is phase mismatch. The parametric conversion efficiency Gi is shown in
Basically, there are two major types of noises in indirect detection associated with wavelength conversion, including pump transferred noise and quantum noise. Since the noise transfer from pump is considered to be detrimental for large signal powers [
where h is Planck constant and c is speed of light. R is responsivity and Be is the electrical bandwidth of In GaAs photodetector in the specification sheet. Pin is incident mid-IR signal power and Gi is parametric conversion efficiency in Equation (1). Since weak mid-IR signal is considered, we use Pin = 1 μW with 1 GW/cm2 pump power.
Furthermore, there are some intrinsic noises from the detector itself, including thermal noise and shot noise. Thermal noise results from random thermal motion of electrons in a resistor manifests as a fluctuating current, which is described by Equation (4).
where k is Boltzmann constant, T is operating temperature, RL is load resistance and Fn is circuitry noise figure. Shot noise is a manifestation of the fact that an electric current consists of a stream of electrons that are generated at random times, shown is Equation (5)
where q is elementary charge and id is dark current. Since the noise components are characterized, we can simply calculate the noises for indirect detection of mid-IR signals. The parameters used in our calculation are shown in
λ (μm) | T (K) | R | RL (Ω) | id (pA) | |
---|---|---|---|---|---|
InGaAs | 1.55 | 300 | 0.95 A/W | 8 M | 80 |
PbSe | 4.6 | 300 | 3 × 103 V/W | 0.3 M | NA |
MCT | 4.6 | 300 | 3 × 103 V/W | 1.5 k | NA |
Since the noise performance of the near-IR detector is well demonstrated, in order to make comparison for eSNR, it is essential to characterize the mid-IR detectors. There are three types of commercial mid-IR detectors: thermal detectors, photovoltaic (PV) and photoconductive (PC) detectors. Thermal detectors are based on the resistance change by incident mid-IR signals. They have low sensitivity and are also too slow for real-time detection. The operational principle of PV detectors is generating current by absorption of photons with energy beyond their bandgap. Due to the narrow bandgap of mid-IR photons, the excess thermal generation during the detection will lead to considerable dark current and then large shot noise. It is necessary to operate them at low temperature (~70 K) to reduce dark current. In other words, PV detectors are limited by its shot noise level at room temperature. Therefore, only PC detectors are characterized here.
In terms of PC detectors, the voltage change is measured, which results from the conductivity change of the medium by photo-induced carriers. The major noise components of PC detectors include thermal noise, background noise, generation-recombination (G-R) noise and flicker noise. Since a low-pass filter can be used in the system to eliminate flicker noise, the total noise will consist of thermal noise, background noise and G-R noise. As above, Thermal noise is described in Equation (4). Background noise is shown in Equation (6)
where η is quantum efficiency and A is active detector area. Photon flux density EB is described in Equation (7)
where ελ is emissivity for the medium material and λc is cut-off wavelength.
Currently, there are two kinds of commercial PC detectors: PbSe and MCT detectors. In view of relative slow response of mid-IR detectors, a 0.1 MHz electrical bandwidth is used. Based on the calculations, thermal noise is dominant in PbSe and MCT detectors. For the same 1 μW incident power at mid-IR, the total noise of PbSe and MCT detectors are 0.01 pA2/Hz and 16.73 pA2/Hz, respectively.
The eSNR improvement is defined by comparing the eSNR of InGaAs photodetector to those of PbSe and MCT mid-IR photodetectors, as described by Equation (8)
In order to analyze eSNR enhancement by indirect detection to weak mid-IR signals, we used different input power levels at 0.1 μW, 1 μW and 10 μW in calculations to estimate the detection limit, as presented in
It is obvious that the eSNR enhancement increases with the increasing pump power intensity until it reaches 1 GW/cm2, at which eSNR enhancement saturates resulting from the limit of quantum noise to FWM process. The phenomenon indicates that although the parametric conversion efficiency increases with the increasing pump power intensity, it is cancelled out by the increasing quantum noise. Furthermore, if we don’t use TEC system, power radiation will increase thermal noise by heating the medium material. In this case, the pump power is supposed to be controlled in a proper range. Therefore, the maximized eSNR enhancement can be achieved.
In summary, we demonstrate phase-matched As2S3-on-LiNbO3 waveguide design, which is able to convert 4.6 μm mid-IR signals to 1.32 μm near-IR light for indirect detection. We analyze and compare noise performance for PbSe and MCT mid-IR detectors and InGaAs near-IR detector. Our calculations show that the eSNR improvement by indirect detection of mid-IR signals is 17 dB larger than the results in silicon waveguides in [
This material is based upon work supported by the National Science Foundation under grant No. EEC-0540832.
Qi Chen,Christi Madsen, (2016) Electrical Signal-to-Noise Ratio Enhancement in Detection of Mid-IR Signals by Four-Wave Mixing in As2S3-on-LiNbO3 Waveguides. Optics and Photonics Journal,06,69-74. doi: 10.4236/opj.2016.65010