Abstract
Recently, microstructured optical fibers have become the subject of extensive research as they can be employed in many civilian and military applications. One of the recent areas of research is to enhance the normalized responsivity (NR) to acoustic pressure of the optical fiber hydrophones by replacing the conventional single mode fibers (SMFs) with hollow-core photonic bandgap fibers (HC-PBFs). However, this needs further investigation. In order to fully understand the feasibility of using HC-PBFs as acoustic pressure sensors and in underwater communication systems, it is important to study their modal properties in this environment. In this paper, the finite element solver (FES) COMSOL Multiphysics is used to study the effect of underwater acoustic pressure on the effective refractive index of the fundamental mode and discuss its contribution to NR. Besides, we investigate, for the first time to our knowledge, the effect of underwater acoustic pressure on the effective area and the numerical aperture (NA) of the HC-PBF.
1. Introduction
Optical fiber hydrophone is a significant area of research. For many years, researchers have shown the prospects of using the conventional SMF interferometric hydrophones as alternatives to the conventional sound navigation and ranging (SONAR) systems [1]. However, the conventional SMF is made of glass that has high Young’s modulus (); in addition, its change of effective refractive index of the fundamental mode () due to applied acoustic pressure has opposite sign with respect to length change, and hence both affect NR [2]. As a result, researchers began to search for alternatives to enhance NR. One possible solution is to test the microstructured optical fibers that can be classified into two classes: solid-core PCF (SC-PCF) and HC-PBF. It was shown experimentally that SC-PCF has about the same phase sensitivity to axial strain as SMF [3]. As a result, using SC-PCF as alternatives to SMF is infeasible. However, because SC-PCFs are bend-insensitive, they can be used to reduce the hydrophone size [4]. It was reported that HC-PBFs have many advantages over SMFs that provide better responsivity to measurands and eligibility for many sensing applications [2, 5–7]. Some of these advantages are as follows. The design and manufacturing flexibility of HC-PBFs reduces the effective Young’s modulus of the fiber and enhances the NR of the HC-PBF to acoustic pressure [2], matching between the mode indexes of the HC-PBF with the ambient air helps to reduce the back-reflected light at the fiber end faces which is useful for many applications [7], holes of the HC-PBF can be filled with a substance with opposite thermal expansion to make the material insensitive to temperature [5], in the HC-PBF, because the optical mode propagates in air, it has smaller Faraday, Kerr, and thermal constants than solid-silica cores, and this reduces the dependencies on temperature, magnetic field, and power fluctuations [5], and HC-PBFs are almost entirely bend-insensitive and can be bent to very small diameters (<1 cm) with minimal loss, and this makes it suitable for small-size hydrophone systems [6, 8]. However, using HC-PBFs as underwater acoustic sensors needs further investigation to be feasible alternatives to their counterparts of SMFs. Effective mode area () is a key factor in designing PCFs [9]. It determines how tightly the mode is confined to the core of the fiber. The effective area can be used to study the nonlinearities, mode-field diameter (MFD), confinement losses, bending losses, splicing losses, and numerical aperture (NA) of the optical fiber [9, 10]. For this reason, studying the effect of acoustic pressure on allows getting information and important relations about how the acoustic pressure affects other important quantities. For accurate results, it is important to accurately model of the HC-PBF. It was proposed in [11] that the electrical field distribution of the PCFs is non-Gaussian and cannot be determined by assuming a conventional step-index distribution. Also, it was found that the ITU-T Petermann II definition is the most suitable for describing and MFD of PCFs with non-Gaussian distribution; as a result, it is adopted in this paper. ITU-T stands for the International Telecommunication Union-Telecommunication Standardization Sector [12]. To our knowledge, the effect of underwater acoustic pressure on of HC-PBF has not been studied. In this paper, we study the interferometric optical fiber hydrophone, which is based on acoustic pressure to phase transduction mechanism, in which the investigated HC-PBF represents its measuring arm. The effect of underwater acoustic pressure on the fundamental mode of hollow-core photonic bandgap fibers is investigated by coupling between the acoustic-solid interaction (ASI) and the electromagnetic waves (EMW) modules in the FES COMSOL Multiphysics. The ASI module is used to apply acoustic pressures of different amplitudes and frequencies that cause structural deformation and the induced stresses and strains for the investigated HC-PBF are calculated. The EMW module in the FES is used to calculate for undeformed HC-PBF; then the coupled ASI and EMW modules are used to calculate for the deformed fiber. This enables us to study and analyse the effect of acoustic pressure on , , the MFD, and NA of the investigated HC-PBF. The investigated HC-PBF is the commercial HC-1550 with air-filling ratio (η) of 92% that represents the ratio of the air hole diameter () in the microstructured cladding to the pitch () which is the central distance between two adjacent air holes. The used parameters of the investigated fiber are listed in Table 1.
2. Mathematical Model
The cross-section of the investigated HC-PBF is shown in Figure 1. The HC-PBF is modeled as four circular regions, an air-core, an air-silica microstructured inner cladding consisting of array of cylindrical air holes, a solid silica outer cladding, and an acrylate layer. The parameters of each region of the HC-PBF are denoted by a superscript (, and 4). The HC-PBF is with 8 rings of arrays of air holes arranged in a triangular lattice with μm and %. The air-core of diameter () is formed by removing seven central air holes.
The equations that describe the sound propagation in fluids are derived from the governing equations of fluid flow such as the mass conservation described by the continuity equation; the conservation of momentum, which is known as the Navier-Stokes equation; an energy conservation equation; the constitutive equations; and an equation of state that describes the relation between thermodynamic variables [13]. The acoustic pressure () is governed by the wave equation and is given bywhere is the time, is the density of the fluid, and are the acoustic dipole and monopole source, respectively, and is the velocity of the acoustic wave in the medium. The wave equation can be solved in the frequency domain to expand the acoustic signal into harmonic components via its Fourier series. A harmonic solution has the formwhere is the angular frequency and the actual physical value of the acoustic pressure is the real part of (2); consequently, the time-dependent wave equation reduces to the Helmholtz equation given byIn the homogenous case where the two source terms and are zero, the solution to the Helmholtz equation is the plane wave given bywhere is the amplitude of the wave and it is moving in the direction with angular frequency and wave number . The acoustic pressure acting on the microstructured fiber induces a stress distribution in the fiber’s cross-section and structural deformation. Both factors affect the phase represented by a change in the fiber length and the effective refractive index and is given bywhere is the wavelength of the propagating light, and is the length of the fiber. The applied acoustic pressure induces stress distribution in the optical fiber material. As a result of the stress-optic effect, stress induces anisotropic change of the index of refraction within the optical fiber. In this study, this process is achieved by coupling between the ASI and the EMW module in COMSOL Multiphysics. Acoustic pressures with different amplitudes and frequencies are applied by the ASI to obtain the induced strain and stress vectors and finally the index of refraction due to the stress-optic effect is calculated by the general linear stress-optical relation as follows [14, 15]. The general linear stress-optical relation is given by the tensor notation aswhere , is the index of refraction tensor, is the index of refraction for a stress-free material, is the identity tensor, is the stress-optical tensor, and is the stress tensor. The number of independent parameters in the stress-optical tensor that characterizes this relation is reduced by symmetry. Because and are both symmetric matrices, and . For the fiber material, the number of independent parameters is reduced to two independent parameters, m2/N and m2/N, that represent the first and second stress-optical coefficients, respectively [15]. In this case, the stress-optical relation simplifies towhere , , and are the refractive indices along the -, -, and -axis, respectively, and , , and are the principal components of the induced stresses in the three directions. Using the two parameters and , the model assumes that the nondiagonal parts of are negligible. As a result, the used general linear stress-optical relation, which describes the relation between the induced refractive indices and the principle stresses in , , and directions, is reduced toFor accurate calculations of modal characteristics of the investigated optical fiber, the full vectorial wave equations need to be solved. The FES COMSOL Multiphysics is used to solve the vectorial electric field wave equation as an eigenvalue problem and is given by [14, 16] in which is the electric field vector, is the relative permeability, and is the eigenvalue given byin which is the free-space wave number and is the relative permittivity. In this model the electromagnetic wave, frequency domain interface, in the FES COMSOL Multiphysics is used for the mode analysis. The simulation is set up with the electric field components , , and which are the dependent variables. The EMW can be described by the form [17]where the parameter is the complex propagation constant, represents the attenuation along the propagation direction, and is the propagation constant. The effective mode index of a confined mode is given byThe acoustic pressure primarily affects the and terms in (5). The normalized responsivity (NR) is a figure of merit independent of wavelength and optical fiber dimensions are commonly used to compare between different hydrophone designs. NR of the HC-PBF is given bywhere is the axial strain of the microstructured region of the HC-PBF, and the superscript (2) is used to denote the microstructured region of the HC-PBF. In this paper, we are interested in calculating the index term of (13).
We investigate another area of research which is the effect of the acoustic pressure on the effective area , MFD, and NA of the HC-PBF. depends on fiber’s index of refraction and the propagating wavelength, and accurate description of is based on ITU-T Petermann II definition and is given by [12, 17]where is the modal field distribution inside the fiber. A general relation between the MFD and is given bywhere is wavelength dependent mapping value. If the electrical field distribution were Gaussian as in the case of conventional SMFs, the factor would be equal to one [11]. Furthermore, as becomes larger, the correction factor approaches 1.2 for PCFs [11]. In this paper, is considered.
The NA of the SC-PCFs is investigated in [18]. However, the calculation of NA in HC-PBF is different where the refractive index of the cladding is larger than that in the core [19]. A formula for the NA of HC-PBF was proposed in [11] and is given by where is the propagation constant of the upper edge of the bandgap and is related to the effective refractive index by , where is the wavelength corresponding to the upper edge of the bandgap. The NA of the PBF is wavelength dependent [11]. In this study, the effect of the acoustic pressure on the NA is calculated using (16) where the calculations are based on the calculated bandgaps of HC-1550 proposed in [7] and the propagation wavelength nm and nm.
As a conclusion, these calculations are performed by coupling between the ASI and the EMW frequency domain interface modules in the FES as follows: in the simulation setup of the EMW module, , , and are inserted as the main diagonal elements of the anisotropic index of refraction tensor. Acoustic pressures with different amplitudes and frequencies that act on the investigated optical fiber are applied by the ASI. Once the induced stress distribution in the optical fiber is calculated, the anisotropic refractive index elements are calculated using (8), and the EMW module is used for mode analysis. Mode analysis study allows us to calculate , , MFD, and NA. By this way it is easy to obtain the relation between the applied acoustic pressure and the investigated parameters, and the contribution of the acoustic pressure induced change on and NR is calculated.
3. Simulation Results and Analysis
In this section, simulation results are introduced. The material’s physical parameters of the investigated HC-PBF shown in Table 1 are imported into the FES. The microstructured region of the HC-PBF is modeled as anisotropic material while the silica outer cladding and the acrylate regions are modeled as isotropic materials [2]. The investigated HC-PBF is based on two-dimensional triangular structure with the air-core being formed by removing seven central holes. The index of refraction of silica cladding is 1.444, and the number of the air hole rings is eight. Perfectly matched layer (PML) is used to remove spurious reflections. We study the response of the HC-PBF to acoustic pressure by coupling between the ASI and the EMW modules in the FES. This allows easy transfer of the required data between the acoustics and electromagnetic waves modules and provides accurate calculations. After setting up the model geometry and inserting the required equations and data to the FES, the first step of calculations is to perform mode analysis for undeformed fiber. The calculated fundamental mode’s intensity profile of the undeformed HC-PBF is shown in Figure 2, where . The second step is to use the acoustics module to apply acoustic pressure of different amplitudes and frequencies that cause structural deformation and the induced stresses and strains of the investigated fiber are calculated. The EMW module exchanges data with the ASI module by coupling between them and then by performing mode analysis; and corresponding to the deformed structure are calculated. This allows calculating the phase change and NR given by (5) and (13), respectively.
Figure 3 shows of the investigated HC-PBF as a function of the acoustic pressure at acoustic frequency 10 kHz. Due to applied acoustic pressure, the propagation constant changes because of two factors: the geometrical deformation and the change of the refractive index due to the stress-optic effect. From this figure, it can be seen that the calculated for the undeformed HC-PBF is 0.996128 and it increases as the acoustic pressure increases, where is Pa−1, where the acoustic pressure is swept from 0 to 100 MPa at frequency 10 kHz. Figure 4 shows the calculated NR of the HC-1550 and SMF as a function of acoustic frequency obtained from a previous study [20]. It can be seen that the calculated NR of the investigated HC-PBF is Pa−1; consequently, from (13) the acoustic pressure-induced HC-PBF length change is Pa−1. Simulation results showed that the contribution of the index change term to the total sensitivity of the HC-PBFs to acoustic pressure is minor with respect to the fiber length change. However, generally, for accurate design and simulations of the HC-PBFs, the index change term should be taken into account.
Figures 5 and 6 show the calculated effective area and MFD of the investigated HC-PBF as a function of the acoustic pressure at acoustic frequency 10 kHz. The calculated for undeformed fiber is 57.1 μm2 while the MFD is μm. It can be seen that the change in is inversely proportional to the acoustic pressure, where is μm2 Pa−1, while the calculated MFD change with pressure is μm Pa−1.
Figure 7 shows the fundamental mode index corresponding to wavelengths 1550 nm and 1650 nm used to calculate NA of HC-PBF as a function of the acoustic pressure at acoustic frequency 10 kHz obtained by coupling the ASI and EMW modules in the FES, where the pressure is swept from 0 to 1 GPa. It can be seen that for the undeformed fiber of nm and nm is 0.996128 and 0.995313, respectively. Using (16) and the calculations proposed in this figure, we can preliminarily investigate the effect of acoustic pressure on the NA of the investigated HC-PBF. The calculated NA of the investigated HC-PBF as a function of the acoustic pressure at acoustic frequency 10 kHz is shown in Figure 8. It can be seen that NA for undeformed fiber is 0.3449383, and it is inversely proportional to the acoustic pressure where the change of NA with the acoustic pressure is Pa−1.
4. Conclusion
In this paper, the FES COMSOL Multiphysics is used to study the effect of acoustic pressure on the fundamental mode of a HC-PBF, mainly on , , MFD, and NA. The proposed simulation results showed that the acoustic pressure-induced change of is Pa−1, where the acoustic pressure is swept from 0 to 100 MPa at frequency 10 kHz. Our previous study showed that the calculated NR of the investigated HC-PBF is Pa−1; consequently, the acoustic pressure-induced HC-PBF length change is Pa−1. It can be concluded that the contribution of the index change term to the total sensitivity of the HC-PBFs to acoustic pressure is minor with respect to the fiber length change but it should be taken into account for accurate design and simulations of the HC-PBFs. Another area of research which is the effect of the acoustic pressure on the effective area , MFD, and NA of the HC-PBF is investigated. It is shown that the change in is inversely proportional to the pressure, where is μm2 Pa−1, while the calculated MFD change with pressure is μm Pa−1. Finally, we preliminarily investigated the effect of acoustic pressure on the NA of the investigated HC-PBF. It is shown that NA for undeformed fiber is 0.3449383, and it is inversely proportional to the acoustic pressure, where the change of NA with the acoustic pressure is Pa−1.
Conflict of Interests
The authors declare that there is no conflict of interests regarding the publication of this paper.
Acknowledgments
This work is supported by National Natural Science Foundation of China (61102004) and Fundamental Research Funds for the Central Universities.