Abstract

A highly dispersive dual core quasi-periodic photonic crystal fiber is proposed for chromatic dispersion compensation. The dispersion for the dual concentric core fiber is optimized to compensate the chromatic dispersion with a high negative dispersion, accomplishing the communication bandwidth from S-band (1460 nm) to L-band (1625 nm). By precise control of structural parameter we have achieved a maximum dispersion of −18,838 ps/nm-km with the phase matching wavelength centred around 1.55 μm. We also numerically investigate the influence of structural parameter and doping effects and its response on peak dispersion parameter.

1. Introduction

Photonic crystal fibers (PCFs) are a special class of optical fibers with a significant dielectric layout, which incorporates unique optical properties [1]. Guiding of light is accomplished by a highly regular array of air holes in a background of silica matrix running along the full length of the fiber. PCFs have gained significant interest in researchers due to exceptional optical properties such as wide band single mode operation, flexibility in controlling effective area, nonlinearity, and dispersion parameters. The manipulation of photonic cladding parameters allows the photonic crystal fibers to exhibit unique dispersive properties to be tailored easily for specific applications. These dispersion effects can be used to realize set of functionalities, including beam shaping such as optical pulse stretching [2], supercontinuum generation [3], harmonic generation [4], polarization mode dispersion [5], and dispersion compensation [6–9].

Recent advancement in optical communication networks has progressed towards higher transmission capacity and demand for huge bandwidth has compelled the optical network to adapt Dense Wavelength Division Multiplexing (DWDM) [10]. As the transmission bandwidth is fixed, allowable dispersion values are inversely proportional to the square of the optical pulse compression transmission bit rate speed. So, the compensation of accumulated chromatic dispersion over transmission bandwidth becomes crucial for optical networks and nonlinear applications. Single-mode fibers, used in high-speed optical networks, are subject to chromatic dispersion that causes pulse broadening depending on wavelength and polarization mode dispersion (PMD) depending on polarization states [5]. The signal degrades and limits the distance a digital signal can travel before needing regeneration or compensation. An optical network operated at 1550 nm using a standard ITU G.652 fiber having chromatic dispersion of 17 ps/(nm-km) curtails to a maximum transmission distance of 60 km. Penalties incurred by chromatic dispersion can be minimized using negative dispersion compensating fibers (DCF) [11]. The commercial dispersion compensation fibers for few tens of kilometers are employed for dispersion management usually having negative dispersion in the order of few hundred ps/(nm-km). But photonic crystal fibers (PCF) can speculate very high negative dispersion due to high index contrast between core and conformable cladding. PCF structures with high index inner core and a defected ring of reduced holes in the cladding comparable to dual core geometries have accomplished dispersion as high as −2200 ps/(nm-km) [12]. In this paper, we have proposed a quasi-periodic fiber structure which is self-similar lattice generated by inflation-deflation procedure of matching rules with long-range order with no periodicity. It has been evident that quasi-periodic structures can give rise to unusual phenomena and desired properties like large cutoff ratio for endlessly single mode operation, ultraflat dispersion, and so forth, not observed in periodic structures [8, 13, 14].

This research work targets the design and analysis of a novel type of dual core PQF. First, it is demonstrated by befitting structural and material parameters, and then the geometrically modified lattice structure may result in very high values of negative dispersion parameter within the spectral range of optical fiber communications windows. Next, a parametric investigation is carried out focusing on the impact of various structural [15] and material parameters [16] optimizing on the dispersion profile of the proposed PQF.

2. Theory and Design of a Dual-Concentric-Core PCF

We have illustrated the transverse cross section of 5-fold DC-PQF in Figure 1. Quasi-crystals are crystals in which they have long-range translational and orientational orders. However, the translational order is not periodic and the structure does not necessarily have crystallographic rotational point symmetry. These structures reveal more significant attributes than the stereotyped PCFs, due to the degree of freedom that has been concealed in aperiodic structures. The proposed PQF structure is formed by two types of rhombic tiles, thin tile with angles of 36° and 144°, and thick tile with angles of 72° and 108°. The resulting connected space-filling packing of unit cells is called Penrose lattice. The inner core and the surrounding air holes are constructed on the base of 2-dimensional Penrose lattice. In our analysis the refractive index of fused silica as a function is approximated using three-term Sellmeier equation [17]: where is the wavelength, is the refractive index as a function of , is the oscillator strength, and is the oscillator resonance frequency. In an index-guiding PCF, the core refractive index is greater than the average index of the cladding, since the air holes are interweaved in the silica matrix, and the fiber can guide the light by total internal reflection as a standard single mode fiber does. That is, the guided light has an effective index that satisfies the condition [18]. As per the theoretical aspects discussed the proposed PQF is designed such that inner core of PQF is with a diameter of 1.7 µm and () is doped with very low concentration of Germanium contributing an index difference of 2.75%. The outer defected core is a pure fused silica core formed by eliminating the second ring of 15 air holes. Inner cladding is formed between the two cores with hole diameter of 2.2 µm (). We have maintained 2.3 µm between cores to first cladding ring and thereby the lattice constant or pitch () was maintained to be 2.3 µm. In this design, we have designated outer cladding air holes with two different diameters 1.8 µm () and 0.7 µm (). The air hole in the cladding depresses the average index of the cladding region and confines light within the central core. The highest negative dispersion can be tailored with suitable design of these three parameters , , and and with careful doping concentration of core diameter the phase matching peak wavelength can be shifted to a commodious value. The air filling ratio of the lattice with , , and for inner-core and the outer-core is maximized by the quasi-lattice distribution.

Figure 1 

Cross section of the proposed 5-fold DC-PQF.

The calculation of the dispersion properties of PCF modes requires a highly efficient numerical method. At present, the modal solution approach based on the FEM is more flexible than most approaches as it matches well with the complex structural properties of PCFs such as different photonic-crystal lattice geometries, nonperfect lattices (PQF) and holes, asymmetries, and different materials. In this research work we employed finite element method (FEM) with anisotropic perfectly matched layers (PML) to assess the effective index of the core mode in PQF.

The PQF cross section shown in Figure 1 with a finite number of air holes is divided into homogeneous subspaces where Maxwell’s equations are solved by accounting for the adjacent subspaces. These subspaces are triangles that allow a good approximation of the circular structures. Using the anisotropic PML from the Maxwell equations the following vectorial equation is derived [19]:where is the free space wavenumber and is the electric field vector. The PML can have arbitrary thickness and is specified to be absorbing materials. The materials have anisotropic permittivity and permeability that match the physical medium outside the PML in such a way there are no reflections at the boundaries:where is a rank 2 tensor. For a PML which is parallel to one of the Cartesian coordinate planes, becomes diagonal, which is given by

The parameters , , and are the complex valued coordinate scaling parameters. By assigning suitable values, the PML can absorb the waves travelling in a particular direction. The real part of , , and affects how fast an evanescent wave decays in the PML region [19].

The concept of a dual concentric-core PCF is similar to that of a directional coupler which can be analyzed using the coupled mode theory. The guided modes in PCF get localized due to the defected lattices and their model fields are well localized by Hermitian-Gaussian function [18]. The central core and the outer core are defected lattices which behave as two parallel waveguides, and the high dispersion results from the coupling between the two waveguides. It is found that the effective refractive index of the inner-core mode and outer-core mode matches with each other at phase matching wavelength () (Figure 2(b)). Before the phase matching wavelength (Figure 2(a)) (), the field distribution of the inner core mode is confined within the central core and is a Gaussian shape. After the phase matching wavelength () (Figure 2(c)), the fundamental mode field distribution is in the outer core region. Due to the redistribution of modal fields, there is a rapid change in the slope of effective index around the phase matching wavelength, leading to a large negative dispersion [9, 20, 21].

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Figure 2 

Mode confinement in PQF (a) inner-core mode, (b) combined inner and outer cladding mode, (c) outer cladding mode, and (d) variation of effective index with wavelength for DC-PQF, a curve with circle corresponds to fundamental core mode and square symbol curve represents outer cladding mode.

The dispersion of the PQF can be expressed as the sum of material dispersion and waveguide dispersion approximately. As the effective refractive index () is estimated as a function of wavelength, then dispersion parameter can be computed from the following equation:

The dispersion value becomes maximum if the wavelength matches the phase matching wavelength [22]:

We can infer from the above equations that the peak dispersion totally depends on the coupling coefficient and the index slope between the inner-core mode and the cladding mode at phase matching wavelength (). From (6) it is evident that if the inner-core mode and the outer-core mode are easy to couple, a big coupling constant is obtained, leading to a low peak dispersion value and a broad FWHM. Instead, if there is a hard coupling between the two modes, is small, leading to a high peak dispersion value and a narrow FWHM [22]. It is observed from Figure 2(d) fundamental mode field distribution confined within the core and the second order mode trapped within the outer core twitch towards each other as the operating wavelength changes. It is indisputable that at a point of inflexion (Figure 2(d)) ( µm) slope of effective refractive index changes due to coupling of mode energy from inner to outer and contrariwise. At phase matching condition the effective mode field area of 3.4 µm² inflates to a very large value of 184.76 µm². The splicing loss with standard SMF28 is minimized to a large extent as the effective mode area is in agreement with single mode fiber. After the phase matching wavelength 1.55 µm the inner core fundamental mode totally relocates to outer core and vice versa. Even though the analysis is carried out for many phase matching wavelengths, for discussion purpose 1.55 µm is taken into account. The modes of single-material PCFs are inherently leaky because the core index is the same as the index of the outer cladding region without air holes. Since in our proposed design the core is doped with an index difference of 2.75% of Ge, the confinement loss is reduced as the index difference enhances the guiding modes. The confinement loss is deduced from the value of asin dB/m, where stands for the imaginary part of effective refractive index. The confinement loss was 3.6 × 10⁻⁶ dB for inner-core mode and increases to 1.02 × 10⁻³ dB for the combined mode but still the loss is computed to be on the lower side.

3. Analysis of Geometric Parameter Influences on Optical Property

It is noteworthy to disclose the fact that material dispersion strongly affects the performance of PCF-based devices designed to operate in a low-dispersion regime, with a significant effect on total device dispersion. The material dispersion also changes with the type of dopant used during glass fabrication. Therefore, it becomes quite crucial to investigate how different percentage of doped silica glasses affects the PCF response. In our analysis, we have investigated that the phase-matching wavelength shifts as a function of doping percentage, further the radius of first cladding ring is varied showing a very high deviation in the dispersion parameter. From Figure 3(a) it is evident that when  µm,  µm,  µm, and  µm, the phase matching wavelength is at 1.54 µm for an index difference of 2.71% with dispersion parameter reaching −17,312 ps/(nm-km). When index difference is increased, the phase matching value relocates towards higher wavelength of 1.55 µm for 2.75%. The dispersion value for the above index variation falls at −17,312 ps/(nm-km) to −18,838 ps/(nm-km), respectively, for index variation of 2.71% to 2.75%.

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Figure 3 

Variation in dispersion parameter due to (a) Core Doping Percentage and (b) core radius.

We have considered influence of core diameter on the shift in the dispersion property [23]. Keeping the doping percentage constant at 2.75% and  µm,  µm, and  µm the core diameter was varied from 0.8 µm to 0.9 µm in steps of 0.025 µm. From Figure 3(b), we can apprehend that the phase matching wavelength shifts to a greater extent with maximum dispersion of −21,619 ps/(nm-km) at 1.50 µm to −17,168 ps/(nm-km) at 1.595 µm. This result implies that PCF fabrication must be carefully controlled in order to keep the core radius as close as possible to the designed value at desired wavelength [24].

Eventually the structural variation of , , and also has influence on the peak dispersion and phase matching wavelength. Keeping the doping percentage constant at 2.75% and  µm,  µm, and  µm the diameter was varied from 2.1 µm to 2.3 µm in steps of 0.05 µm (Figure 4(a)), and the dispersion parameter takes high values of −24,356 ps/(nm-km) and decreases to −9,121 ps/(nm-km), but the phase matching wavelength increases from to 1.49 µm to 1.61 µm. Interestingly the phase matching wavelength gets perturbed even with variation of diameter. Preserving  µm,  µm, and  µm the diameter was varied from 1.9 µm to 2.1 µm in steps of 0.05 µm. It was recognized from Figure 4(b) that the shift in the phase matching wavelength was not pronounced as much as compared to the diameter variation of parameter. The dispersion was downsizing as the diameter increases, but a minimum dispersion of −15,818 ps/nm-km occurred for  µm.

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Figure 4 

Variation in dispersion parameter due to (a) only hole variation, (b) only hole variation, and (c) only hole variation.

Similarly, maintaining other parameters constant was altered from 0.7 µm to 1.1 µm. From the analysis shown in the Figure 4(c) maximum dispersion of −18,838 ps/(nm-km) is occurring at 0.7 µm and decreases as the progresses. In the present proposed PQF design, the numbers of holes with diameters , , and were 70, 50, and 5, respectively. The dispersion properties and phase matching wavelength of the PQF vary as a function of air filling fraction, contributed by different composition of air holes diameter. The optimized dispersion was found to be maximum at 1.55 µm with −18,838 ps/(nm-km) for  µm,  µm, and  µm. From the above analysis, we have to underline the fact that the bandwidth is narrow when dispersion parameter was at its highest value and increased as the dispersion decreased. There is generally a trade-off between the highest dispersion with bandwidth, which can be optimized by careful selection of holes diameter [22]. Geometrical imperfection of a PQF can depreciate its performance. The PQF can be fabricated by the complex fabrication method such as sol-gel methods [25, 26], not by prevailing stacking method, because the quasi-periodic orientation cannot be perfected by the stacking method. The sol-gel method naturally gives well-arranged air holes. As a casting method, the sol-gel technique can fabricate any structure, which can be integrated into a mold. The hole size, shape, and spacing may all be adjusted individually. By comparison, stack and draw methods are constrained to closest-packed design such as triangular or honeycomb lattices. Drilling methods allow adjustment of both the hole size and spacing but are generally bounded to a small number of holes and limited to circular shapes. On the contrary, drilling of preforms leaves roughened surfaces along the side walls of the air hole. Extrusion techniques confer design freedom but are often limited to soft glasses for which the material loss values are exceedingly high [27, 28].

4. Conclusion

In this paper, we have thoroughly explored the possibilities of various structural parameters and their influences on the peak dispersion parameter conjointly with shift in phase matching wavelength. By varying the sizes of air holes, we obtained a maximum negative dispersion of −24,356 ps/(nm-km) for our proposed PQF. The design was optimized for −18,838 ps/(nm-km) at phase matching wavelength of 1.55 µm. We conclude, with optimized structural parameters and with low confinement loss, that our proposed fivefold symmetric dual core PQF is envisaged as a dispersion compensating fiber.

Conflict of Interests

The authors declare that there is no conflict of interests regarding the publication of this paper.