Abstract:
A compact interrogator for the simultaneous interrogation of multi wavelength-modulated fiber optical sensors, includes a planar waveguide based demultiplexer receiving input signals from the sensors. An array of detectors is coupled to output waveguides of the demultiplexer corresponding to different nominal wavelengths. A tuning element matches the nominal wavelengths of the output waveguide to the input signals from the respective sensors to find the wavelengths of the individual sensors to be interrogated.

Description:
FIELD OF THE INVENTION  
       [0001]     This invention relates to the field of photonics, and in particular to an interrogation technique for applications in wavelength measurement, in particular monitoring distributed wavelength-modulated fiber optical sensors or multi wavelength-modulated fiber optical sensor arrays.  
       BACKGROUND OF THE INVENTION  
       [0002]     Wavelength modulated fiber optic sensors, in particular fiber Bragg grating (FBG) sensors, have been applied to many sensing applications. See, for example, A. Othonos, “Bragg Gratings in Optical Fibers: Fundamentals and Applications”, in Optical Fiber Sensor Technology, K. T. V. Grattan and B. T. Meggitt, eds. pp.79-188, Kluwer Academic Publishers, Boston, 2000. The most important advantage of this type of sensor is that wavelength is an absolute parameter and not affected by the losses in the system or fluctuations in the source power.  
         [0003]     For field applications, the wavelength interrogator (which is a key component of the sensor system) is required to have the characteristics of portability, ruggedness, low cost, high measurement accuracy, high speed and multiplexing capability. However, none of the traditional methods is enough satisfactory for those requirements. In recent years, arrayed waveguide gratings (AWO) based interrogation systems have shown great potential for fulfilling all those requirements. One technique described by Y. Sano and T. Yoshino, entitled “Fast optical wavelength interrogator employing arrayed waveguide grating for distributed fiber Bragg grating sensors”, J. Lightwave Techno. Vol. 21, pp. 132-139, 2003, involves taking the ratio of the intensities in adjacent AWG channels when the fiber Bragg grating (FBG) wavelength lies between the two channels. This simple approach yielded good performance but suffers from a limited usable range (less than the channel spacing) and a reduced sensitivity near the extremes of the range.  
         [0004]     D. C. C. Norman, D. J. Webb and R. D. Pechstedt, “Extended range interrogation of wavelength division multiplexed fibre Bragg grating sensors using arrayed waveguide grating”, Electro. Lett. Vol. 39, pp. 1714-1715, 2003 overcame those drawbacks by using a heterodyne approach based on interferometric wavelength shift detection. Nevertheless, it makes the interrogation system much more complicated.  
         [0005]     We have proposed another interrogation approach using an AWG based demultiplexer. This approach is based on the idea that by changing the temperature of an AWG, the transmission wavelength of one of its channels can be tuned to the sensor wavelength. Thus we are able to correlate the sensor wavelength to the AWG temperature.  
       SUMMARY OF THE INVENTION  
       [0006]     The present invention expands the above approach and provides several ways to make hand-held, high performance interrogators for multi wavelength-modulated fiber optical sensor applications. By electrically modulating an arrayed waveguide gratings (AWG) based demultiplexer, the wavelengths of wavelength-modulated fiber optical sensors can be precisely measured. Based on this principle, a hand-held interrogator can be designed, which consists of an arrayed waveguide grating (AWG) based demultiplexer, a heater or electrodes, a detector array and a controller.  
         [0007]     According to the present invention there is provided a compact interrogator for the simultaneous interrogation of multi wavelength-modulated fiber optical sensors, comprising a planar waveguide based demultiplexer receiving input signals from the sensors; an array of detectors coupled to output waveguides of the demultiplexer corresponding to different nominal wavelengths; and means for tuning the demultiplexer to match the nominal wavelengths of the output waveguide to the input signals from the respective sensors.  
         [0008]     The tuning means may be a heater for varying the temperature of the demultiplexer or an electrode for applying a voltage or current.  
         [0009]     The waveguide materials of the demultiplexer can, for example, be silica, semi-conductor, polymers. The sensors interrogated by the inventive device can be fiber Bragg grating sensors, long period grating sensors, fabry-perot sensors etc. 
     
    
     BRIEF DESCRIPTION OF THE DRAWINGS  
       [0010]      FIG. 1  is a schematic illustration of an AWG based demultiplexer;  
         [0011]      FIG. 2  is part of the transmission spectra of a typical Gaussian type AWG based demultiplexer;  
         [0012]      FIG. 3  is a schematic illustration of an example of the proposed interrogator system;  
         [0013]      FIG. 4  is an illustration of the relationship between AWG transmission wavelengths and the temperature of the arrayed waveguides;  
         [0014]      FIG. 5  is an illustration of the response spectra of typical distributed FBG sensors;  
         [0015]      FIG. 6  is an illustration of the application variation of the interrogator system shown in  FIG. 3 ;  
         [0016]      FIG. 7  is an illustration of the simultaneous interrogation results of two FBG based temperature sensors by using the interrogator example shown in  FIG. 3 ;  
         [0017]      FIG. 8  illustrates a first embodiment of an AWG array with a heater and temperature sensor; and  
         [0018]      FIG. 9  illustrates a second embodiment of an AWG array with a heater and temperature sensor. 
     
    
     DETAILED DESCRIPTION OF THE INVENTION  
       [0019]     The operational principles of an AWG have been studied in detail and reported in the literature. See, for example, M. K. Smit and C. V. Dan, “PHASAR-based WDM devices: principles, design and applications”, IEEE J. Topics Quantum Electron. Vol. 2, pp. 236-250, 1996.  
         [0020]     An AWG, as shown in  FIG. 1 , consists of two slab waveguides  1 ,  2 , providing free propagation regions (FPR) connected by an array of waveguides  3  with a set length difference between the neighboring waveguides. When used as a demultiplexer, light enters the first slab waveguide  1  and diverges into the waveguide array  3 , then arrives at the second slab waveguide  2  with different relative phases. This results in the different wavelengths of light being focused into the different output waveguides  4 .  FIG. 1  illustrates a 1×n channel AWG multiplexer. For a typical AWG multiplexer, the values of n are 4, 8, 16, 32 or 40 channels, but in theory there can be any number of channels.  
         [0021]      FIG. 2  illustrates the typical transmission spectra of a Gaussian type AWG demultiplexer measured by an Ando AQ6317B optical spectrum analyzer (OSA). As it shows, those peaks are Gaussian (as designed) and can be described mathematically as:  
                 I   An     ⁡     (   λ   )       =         A   n     ⁢     exp   ⁡     [       -   4     ⁢     (     ln   ⁢           ⁢   2     )     ⁢         (     λ   -     λ   An       )     2       Δλ   An   2         ]         +     A   n0               (   1   )               
 where A n , λ An  and Δλ An  are the peak transmittance, center wavelength and FWHM of the Gaussian profile of the n th  channel of the AWG. A n0  is the noise level. It is very low (as shown in  FIG. 2 ) and can be neglected. 
 
         [0022]     For the sake of the simplicity of the mathematic analyses, we assume that the spectra of the wavelength-modulated sensors are Gaussian (which are close to majority practical cases), i.e.  
                 I   Si     ⁡     (   λ   )       =       S   i     ⁢     exp   ⁡     [       -   4     ⁢     (     ln   ⁢           ⁢   2     )     ⁢         (     λ   -     λ   Si       )     2       Δλ   Si   2         ]                 (   2   )             
 
 where S i , λ Si  and Δλ Si  are the peak transmittance, center wavelength and FWHM of the Gaussian profile of the i th  sensor in a multi-sensor network. 
 
         [0023]     We further assume that the signal collected by the n th  AWG channel is mainly from the i th  sensor while the contributions from other sensors are very small and can be neglected. This assumption can be easily satisfied by properly design the sensor&#39;s working wavelength range. Hence, the power detected by the n th  AWG channel can be described as:  
                 I   ni     ⁡     (     λ   An     )       ≈       k   n     ⁢     A   n     ⁢     S   i     ⁢     Δλ   An     ⁢     Δλ   Si     ×       n       (       Δλ   An   2     +     Δ   Si   2       )     ⁢   4   ⁢   ln   ⁢           ⁢   2         ×     exp   ⁡     [       -   4     ⁢     (     ln   ⁢           ⁢   2     )     ⁢         (       λ   An     -     λ   Si       )     2         Δλ   An   2     +     Δλ   Si   2           ]                 (   3   )             
 
 where k n  is a constant representing the source power, detector sensitivity etc. It will be apparent from this equation that the I ni (λ An )˜λ An  curve is a Gaussian with the FWHM equaling √{square root over ((Δλ An   2 +Δλ Si   2 ))} and the peak value K n  as  
               K   n     =       k   n     ⁢     A   n     ⁢     S   i     ⁢     Δλ   An     ⁢     Δλ   Si     ×       π       (       Δλ   An   2     +     Δλ   Si   2       )     ⁢   4   ⁢   ln   ⁢           ⁢   2                   (   4   )             
 
 The peak value is achieved when λ An =λ Si . Therefore, if we can tune the AWG transmission wavelength by a simple and linear manner, we will be able to measure the sensor wavelength by finding the λ An  value corresponding to the peak of the I ni (λ An )˜λ An  curve, i.e. 
 
λ An ( X )= B*X+C    (5) 
 
 where B and C are constants respectively and X is the tuning mechanism, be it the temperature of arrayed waveguides, or the current or voltage applied on the arrayed waveguides. 
 
         [0024]     Combining equation (3), (4) and (5), we have:  
                 I   ni     ⁡     (   X   )       =       K   n     ⁢     exp   ⁡     [       -   4     ⁢     (     ln   ⁢           ⁢   2     )     ⁢         (       B   *   X     +   C   -     λ   Si       )     2         Δλ   An   2     +     Δλ   SI   2           ]                 (   6   )             
 
 Equation (6) shows that the I ni (X)˜X curve is also a Gaussian with the FWHM as √{square root over ((Δλ An   2 +Δλ Si   2 ))} and the peak value as K n , which is reached when λ Si =B*X+C. Hence by finding the tuning parameter corresponding to the peak of the I i (X)˜X curve, we can obtain the sensor wavelength λ Si . 
 
         [0025]      FIG. 3  illustrates an example of a proposed interrogator system. It consists of an AWG based interrogator chip, a photo detector array  11  and an electronic controller  12 , which is used to do thermal scan (or electrical scan) of the AWG chip and collect, manage and display the data. For illustration purposes, a broadband light source  13 , an optical circulator  14 , and a distributed sensor array  15  is also shown in the illustration. All the optical components can be connected by optical fiber or directly coupled together by butter coupling in order to miniaturize the dimension of the interrogator.  
         [0026]     The first method of constructing an AWG based interrogator chip shown in  FIG. 8  is to bond a film heater  80  (or thermal electric cooler) to the back of the AWG die, and bond a temperature sensor  81 , such as a themistor or RTD (resistive temperature detector), to the arrayed waveguides  81 .  
         [0027]     The transmission wavelength of AWG based demultiplexer changes linearly with the temperature of the arrayed waveguides  3 , i.e. 
 
λ An ( T )= B*T+C    (7) 
 
 where B and C are constants respectively and T is the temperature of arrayed waveguides. 
 
         [0028]      FIG. 4  shows the temperature effect on the wavelengths of six selected channels of an AWG based demultiplexer. The wavelengths were measured by an Agilent Optical Dispersion Analyzer 86038A, which has a resolution of better than 1 pm. The results show that λ An  changes linearly with the temperature at a rate of 0.61 1 nm/° C. (Value of B). The value of C is depending on the AWG channel number. Therefore, based on the analysis above, we can measure the sensor wavelength by tuning the temperature of the arrayed waveguides.  
         [0029]     In practice, it is a waste of energy to heat the whole AWG chip as we are only interested in the temperature of the arrayed waveguide area of the AWG chip. A better way, shown in  FIG. 9 , to construct an AWG based interrogator chip (the second example) shown in  FIG. 3  is to employ standard thin film heater deposition and patterning techniques to fabricate thin film heaters  90  on the surface of arrayed waveguides, which would significantly decrease the power consumption as the heating area is greatly reduced. In addition, the thin film heater offers an added advantage. Its response time is only around 2 ms, which is much short than that needed for heating up the whole device. The 2 ms response rate would make it feasible for the applications of the technique to most dynamic measurement. To help the heat dissipation from the AWG chip and to maintain a good measuring reproducibility, it would be recommended to use a thermal electric cooler (TEC) to maintain the bottom of AWG chip at a constant temperature. To further increase the measuring reproducibility and reduce the effect of ambient temperature, athermal packaging of AWG based demultiplexer is recommended.  
         [0030]     As an AWG chip is very small, a typical one is about 30 mm×55 mm, and the detector array can be made smaller than 10 mm×30 mm, it is obvious that we will be able to design and package the interrogator example shown in  FIG. 3  into a hand-held, all solid device.  
         [0031]     In this second example, if the materials of the arrayed waveguides are electro-optic materials, the AWG based demultiplexer can also be used as the interrogator, but instead of heater, thin film electrodes are deposited on the arrayed waveguides. By modulating the current or voltage applied on the electrode, we can satisfy equation (5), thus making it feasible to interrogate the sensor wavelengths. The response of this type of interrogator can be very fast and to the nano-second scale.  
         [0032]     The interrogator chip shown in  FIG. 3  (the third example) can be an echelle grating based demultiplexer with film heater or TEC attached to the back of the chip as the transmission wavelength of this type of demultiplexer also has the temperature behavior shown in Equation (7).  
         [0033]     Though in the analysis we assume that the sensor spectra are Gaussian, but it is not an absolute requirement.  FIG. 5  shows the reflection spectra of a distributed six fiber Bragg grating sensors. The spectra were measured by the OSA mentioned above. As it can be seen from the Figure, the spectra of the sensors are not truly Gaussian but close to Gaussian. The mathematic description of those spectra is complicated. However, since we are employing an interrogation technique based on a similar principle to the reflective-matched fiber Bragg grating sensing interrogation scheme, the interrogation error induced by the Gaussian assumption is quite small and can be neglected according to the analysis give by A. B. L. Ribeiro, L. A. Ferreira, J. L. Santos, and D. A. Jackson, “Analysis of the reflective-matched fiber Bragg grating sensing interrogation scheme,” Appl. Opt., vol. 36, pp. 934-939, 1997  
         [0034]     Table 1 shows the experimental results of using the first interrogator example illustrated in  FIG. 3  to interrogate the distributed sensors (whose response spectra are shown in  FIG. 5 ). The temperatures corresponding to the maximum output of the corresponding detectors of the interrogator are listed in Table 1. Using the equations shown in  FIG. 4 , we are able to calculate the wavelengths of the six FBG sensors being interrogated. The calculation results are listed in Table 1. For comparison reason, we also list the sensor wavelengths supplied by the manufacturer in this Table. As it shows, the measured results are in a very good agreement with the data supplied by the manufacturer. The small variation between the data measured and the manufacturer&#39;s numbers is believed to be due to the differences in measurement environments such as temperature and strain. It is well known that Bragg wavelength shifts with temperature at a rate of 10 pm/° C. and strain at a rate of ˜1 pm/με around 1550 nm. Table 1 Comparison between the Bragg wavelengths of the FBG sensors measured by the proposed interrogator and the data supplied by the manufacturer (measured by an optical spectrum analyzer)  
                                                       Sensor Wavelength           Peak Temperature   Sensor Wavelength   Supplied by The       Sensors   (° C.)   (nm)   Manufacturer (nm)                   1   86.42   1542.661   1542.65       2   94.81   1543.534   1543.52       3   93.79   1544.315   1544.30       4   92.94   1545.096   1545.06       5   96.49   1545.913   1545.90       6   93.18   1546.659   1546.66                  
 
         [0035]     In the above table we show the interrogation results of six distributed fiber Bragg grating sensors, the number of the wavelength-modulated sensors can be monitored by a single AWG demultiplexer, as discussed in ref.  6 , depends on the channel numbers and the channel spacing of the AWG device. For example, for a 40 channel, 100 GHz (0.8 nm) spacing AWG based demultiplexer, if the wavelength drifting range of the sensors is less than 0.8 nm, then 40 sensors can be interrogated at the same time. But if the wavelength drifting range is between 0.8 nm and 1.6 nm, then only 20 sensors can be interrogated simultaneously. In addition, the interrogator shown in  FIG. 3  can be also used for the monitoring of other wavelength-modulated fiber optical sensors, such as Fabry-Perot type sensors, Long Period Grating fiber optical sensors and etc.  
         [0036]     In  FIG. 3 , the reflection signals are monitored. If we want to monitor the transmission signals of the sensors, we then do not need the circulator. We only need to attach the interrogator directly to the end of the sensors, as illustrated in  FIG. 6 .  
         [0037]     A variation of the interrogator system shown in  FIG. 3  is to integrate the broad-band source and the circulator with the interrogator. While a similar variation of the interrogator system shown in  FIG. 6  is to integrate the broad-band source with the interrogator. The broad-band source is preferably a semiconductor chip based, but other type of broad-band sources will also serve the purpose. The circulator can also be a waveguide based or any other types.  
         [0038]      FIG. 7  shows the results of using the first example illustrated in  FIG. 3  for the simultaneously monitoring of two fiber Bragg grating based temperature sensors. As it shows, by monitoring the temperature of the arrayed waveguides corresponding to the maximum output of the AWG based demultiplexer, the temperature sensors can be precisely interrogated.  
         [0039]     Though not described, one skilled in the art will realize that the proposed interrogator described in this invention can be used as part of a spectrometer for applications in chemical and physical analyses. In addition, one skilled in the art-will also realize that the proposed interrogator described in this invention can be used as an optical performance monitor for applications in optical networks for the monitoring of optical signal wavelength, signal power and signal noise ratio.