The embodiments of the invention described herein are generally directed to optical waveguides, and more particularly to optical fibers.
Fiber laser systems have rapidly increased in power output due to progress in high-brightness semiconductor diode pumps and the emergence of large-mode area fibers. Large-mode area fibers facilitate the achievement of high powers by reducing the detrimental effects of non-linear interactions in a fiber core, by reducing fiber susceptibility to optical damage, and by allowing larger cladding sizes of double-clad fibers.
As a result, fiber lasers have become the most powerful solid-state laser technology to date, capable of providing diffraction-limited powers nearly two orders of magnitude larger are available from the conventional solid-state lasers. The rise of fiber laser technology is even more significant due to the practical nature of fiber lasers. Indeed, fiber lasers offer a technological platform for monolithic, compact and very efficient lasers, which may be produced in a fashion similar to building electronic instruments, and very different from complex and skill-demanding assembly processes typically required for conventional open-cavity lasers. Therefore, there exists the potential of replacing the majority of currently used conventional solid-state lasers with much more compact, reliable, efficient and cost effective fiber lasers, thus significantly advancing the majority of laser applications.
Currently there are three techniques that enable use of large-mode-area (LMA) fibers: (i) single-mode excitation of a multimode core, (ii) distributed mode filtering in a properly coiled fiber and (iii) photonic-crystal large-mode fibers. All three techniques have approximately similar limits for the maximum allowable mode size, despite the fact that techniques (i) and (ii) both use multimode-core fibers while (iii) is distinctly different in that it uses a single-mode core fiber.
However, the current methods of mode-size scaling are very limited in many important practical aspects. First, mode size is limited, thus restricting further power and energy scaling. Second, use of large-core fibers is practically limited by their multimode nature. Third, direct fiber splicing is not achievable and conventional fused single-mode devices are not possible. Thus, further practical advances of fiber laser technology are hindered because fiber laser fabrication is significantly more complicated when compared to single-mode telecom-style devices.
Accordingly, there is a need for a fiber design that significantly increases the mode sizes and provides large-mode fibers with an effectively single-mode core. Preferably, such a fiber design would also permit the use of standard single-mode fiber splicing techniques. Additionally, such a fiber design would preferably be applicable to index-guiding fibers and photonic-crystal fibers. Further, the fiber design preferably would not be sensitive to bending effects for large-mode field diameters. This would enable the modal properties of the fiber to be determined by the structure rather than by the coiling. Finally, such a fiber design preferably would not require complicated mode filtering and excitation techniques so that the fiber might be used for both passive fibers and amplifying fibers.
The features and inventive aspects of the present invention will become more apparent upon reading the following detailed description and claims in conjunction with the drawings, of which the following is a brief description:
Referring now to the drawings, illustrative embodiments are shown in detail. Although the drawings represent the embodiments, the drawings are not necessarily to scale and certain features may be exaggerated to better illustrate and explain an innovative aspect of an embodiment. Further, the embodiments described herein are not intended to be exhaustive or otherwise limit or restrict the invention to the precise form and configuration shown in the drawings and disclosed in the following detailed description.
Referring now to
By design, all higher-order modes of central core 22 have large loss, while the fundamental mode of central core 22 has negligible loss. The composite structure of central core 22 and helical side core 24 provides efficient and highly selective coupling between higher-order modes in the central core 22 and helical side core 24. Further, the composite structure provides high loss for modes propagating in helical side core 24 and imparts high loss onto the coupled higher-order modes of central core 22. Thus, central core 22 of HCC fiber 20 is effectively single-mode.
The optical proximity of central core 22 and helical side core 24 is determined so that the mode fields of neighboring cores 22, 24 overlap. To provide optical proximity, neighboring cores 22, 24 are separated by a distance “D” that is comparable to the length-scale of the optical wavelength at which modal fields in the neighboring cores 22, 24 have significant mode field overlap. Central core 22 and helical side core 24 are coupled by way of modal symmetry. That is to say, neighboring cores 22, 24 may be configured to be coupled by the difference between azimuth-profiles and radial-profiles of the different modes.
The configuration and coupling of central core 22 and helical side core 24 or HCC fiber 20 is explained in detail below with respect to
To reveal additional phase-matching mechanism one needs to consider azimuth structure of the central-core modes. In a cylindrical coordinate system (r,φ,z) associated with HCC fiber 20 according to
This term may be described as quasi-phase matching (QPM) between the modes of central core 22 and helical side core 24. Because the fundamental central core 22 mode l=0, there is no azimuth or radial phase dependence and the quasi-phase matching is absent. Even if propagation constants of, for example, fundamental LP01 and next LP11 central core 22 modes are arbitrarily close (that happens at very large core sizes) proper use of quasi-phase matching may provide that only LP11 will be strongly interacting with the helically propagating modes and, thus, only LP11 becomes lossy. Note that selection by the radial symmetry difference (radial phase dependence) can also occur in HCC fiber 20, permitting suppression of high-order modes with l=0.
The difference between exactly phase-matched and quasi-phase-matched mode coupling is revealed in
As illustrated, fifty percent coupling provides that on average half of the total power is in each of cores 22, 24. The qualitative difference between phase-matched LP01 30 and quasi-phase-matched LP11 modes 32, 34 is that LP01 coupling exhibits a single narrow peak, while LP11 coupling exhibits two peaks; the second peak being much broader and far apart from the LP01 mode peak.
An alternative embodiment of HCC fiber 20′ is illustrated in
In comparison to the single-helix structure of
This is further illustrated in
It is important to note that such high losses for higher order modes make HCC fiber 20, 20′ effectively single-mode, since even inter-modal scattering in an LMA core becomes suppressed to a large degree.
Further alternative embodiments of HCC fiber 20 are illustrated in
The preceding examples of alternative embodiments shown in
Turning now to
In comparing the illustrations in
Although the above examples of HCC fiber 20 structures are based on step-index fiber profiles, other individual-core profiles (such as graded-index, ring-core, M-core, etc.) are also possible. Furthermore, some of the non-step-profile structures are even advantageous for implementing HCC fiber 20 structures.
Turning now to
Due to the resonant nature of the HCC fiber 20 concept, optimization is highly desirable to maximize coupling strength of central core 22 to helical side core 24, broaden the resonance width (as a function of core NA and/or helix period) of this coupling, and to maximize helical side core 24 loss. Such an optimization provides a wider range of fabrication tolerances and higher practically-achievable higher-order mode losses. One of the primary benefits of implementing optimization is to increase the mode penetration (modal tail) depth into the cladding. Longer tails of the neighbor-core modes ensure improvement of all three of the optimization parameters providing: (i) stronger modal overlap between different cores leads to both stronger inter-core coupling and wider resonances, where (ii) longer modal tails generally lead to higher radiation loss from the helically-coiled cores.
For example,
Table III illustrates how optimization of the ring-core structure parameters (shown in
The helical side core 24 may function to provide high loss for the modes coupled from the central LMA core 22 due to mode radiation from a curved fiber core. Generally, core curvature increases with a decrease in the helix period and with the increase in the distance between the side core 24 and the axis of the HCC fiber 20 (off-axis distance). When designing HCC fibers 20, helix period and side core 24 parameters may provide so that both efficient higher-order mode coupling from central core 22 and side core 24 loss can be ensured simultaneously. It is advantageous to extend the helix-period range for which high helix-side losses occur. One method could be to introduce a structural defect to the outer side of the side-helix, thus facilitating additional modal loss from this core. For example, this can be achieved in micro-structured fibers. Such micro-structures are generally fabricated using capillary stacking techniques. Alternatively, side core 24 may be treated with dopants, providing high loss at the desired signal wavelength.
Turning now to fiber birefringence, HCC fiber 20 is compatible with existing highly-birefringent fiber designs.
Using screw fiber techniques, the right- or left-circular modes are the eigenmodes of a screw HCC fiber 96. Thus, the launched circular state of polarization is invariant along the transmission direction. Additionally, if the fiber is excited by a circular light (either right or left) the light propagating along the fiber will be this, and only this, circular polarization along the entire length of the fiber. In practical use, the splicing of segments of screw HCC fiber 96 uses conventional methods. The helical stress filaments in the successive segments need not to be continuous at a joint, because an off-set of these filaments will result in a phase shift of the traveling light at a joint, but will not change its circular state of polarization. Furthermore, screw HCC fiber 96 tolerates bending of comparatively small radius of curvature without disturbing the circular polarization of the transmitted eigenmode.
In sum, the HCC fiber 20 concept may be utilized to design screw HCC fiber 96 composite waveguides to implement high-circular-birefringence fibers. Furthermore, high-circular-birefringence provides that the fundamental LP01 mode in the central LMA core 22 of HCC fiber 20 is split into two orthogonal-polarization (Right-hand circularly polarized (RCP) and Left-hand circularly polarized (LCP)) modes, each characterized by a different phase velocity. By selecting a suitable helical side core 24 period, it is possible to achieve phase-matching and, consequently, power coupling from one of these two polarization modes into side core 24. Thus, high loss is induced for the fundamental-mode polarization. Consequently, a large-mode HCC fiber 20 may be constructed that supports only a single polarization in a single spatial mode (single-polarization fiber). Such a fiber is highly desirable for a number of important applications (coherent or spectral beam combining, for example). Current single-polarization fibers, however, are only available with very small core sizes (much smaller mode sizes compared to typical LMA fiber mode sizes).
Alternatively, it is possible to design a single-polarization HCC fiber without using a high-birefringence method (i.e., without using above described screw fiber). Due to the geometry of a helical optical path, a helically-coiled core possesses circular birefringence, i.e., LCP and RCP polarizations of the same spatial helix-core mode constitute two normal modes of propagation (which propagate without change in their polarization state) with different phase velocities. Furthermore, since only the fields of identical polarizations interact, the LCP-polarized side-helix mode only interacts with the LCP-polarized central core 22 mode, and, likewise, only RCP modes of the central core 22 and helical side cores 24, 24′ mutually interact. Consequently, helix-periods for phase-matching RCP and LCP interactions between center and helix-side modes are different, permitting selection of such HCC fiber designs which, in addition to higher-order mode suppression, allow suppressing one of the circularly-polarized fundamental central-core modes as well.
Yet another application of HCC fiber 20 includes wavelength conversion using four-wave mixing (FWM) nonlinear interactions. Existing fiber lasers use rare-earth dopants in a glass matrix to provide optical gain at the wavelengths determined by the spectroscopic properties of the dopants. However, a very limited spectral range can be covered with existing rare-earth doped fiber lasers and amplifiers. Therefore, it is highly desirable to extend the laser operation to any desirable optical wavelength.
In principle this can be achieved by using nonlinear wavelength conversion through nonlinear interactions in an optical fiber, such as four-wave-mixing (parametric amplification). A practical limitation is that efficient wavelength conversion can only be achieved through phase-matching of interacting waves. In terms of propagation constants of fiber modes this phase-matching condition can be expressed as βsignal+βidler=2βpump. Here, optical frequencies of signal, idler and pump waves should obey the energy conservation relation: ωsignal+ωidler=2ωpump. Due to the phase-matching requirement, efficient FWM parametric wavelength conversion in single-mode fibers has only been achieved so far in spectrally limited ranges using FWM interaction in the vicinity of zero-dispersion wavelength, using fiber birefringence, or exploiting accidental fulfillment of the phase-matching condition.
However, HCC fiber 20 power exchange between central-core mode and helix-side can occur due to quasi-phase matching, i.e. when phase velocities of modes exchanging power are not equal. For example, one can consider interaction between LP01 mode in central core 22 and LP11 mode in helical side core 24. Due to this inter-core power exchange, the phase-velocity of the LP01 mode should increase compared to the phase velocity in the uncoupled core. Because the optical field circulates between “slow” central-core LP01 and “fast” helix-side LP11 modes, the effective phase velocity should acquire value somewhere between these “slow” and “fast” phase velocities. The exact value of the resulting phase velocity may be determined by the degree of coupling between cores 22, 24. This allows controlling LP01 mode phase velocity by controlling HCC fiber 20 structure parameters that determine the degree of coupling between the modes. Wavelength range where this phase-velocity control occurs is selected by choosing an appropriate side-helix period.
Phase-velocity matching may be achieved for any set of signal, idler and pump wavelengths within transparency range of an optical fiber. The only constraint is the energy conservation law. As a result, this technique enables all-fiber based wavelength conversion devices. There are a variety of possible implementations of wavelength-conversion schemes using such HCC fibers 20. One approach is to use a passive HCC fiber 20, which would be pumped with an external laser operating at ωpump. Alternatively, one may integrate HCC fiber 20 structures for wavelength conversion with an active rare-earth doped central core 20. In this case, doped central core 22 would provide optical gain at ωpump, which could be determined by the spectrally-selective components (such as fiber Bragg grating) inside the laser cavity. HCC fiber 20 design for phase-matched FWM then provides parametric gain at the required wavelengths corresponding to ωsignal and ωidler. Such a laser would produce a multi-wavelength output (at wavelengths corresponding to ωsignal. ωidler and ωpump). Additionally, the laser may be optimized to produce most of the output power at ωsignal Thus, the laser operates at a wavelength outside the gain band of rare-earth ions. Although wavelength-conversion advantageously utilizes small single-mode central cores 22 to maximize nonlinear interaction, for very high powers (in the range between 1-10 kW, for example) larger central cores could be chosen. Furthermore, controlling the modal phase-velocity in HCC fiber 20 structures also allows control of modal dispersion (wavelength-dependence of a phase velocity). This capability is important for HCC fiber use in ultrashort-pulse fiber laser systems.
Now turning to stimulated Raman scattering (SRS), the limitation in achievable peak and average powers in optical fiber amplifiers and lasers will be discussed. SRS is a nonlinear optical phenomenon having a well defined intensity threshold. Above this threshold optical signal in the fiber starts amplifying long-wavelength optical signal. This Raman gain can become so large (>50 dB) that it can produce a strong signal starting from only a few spontaneous photons that always exist in the Raman-gain spectral band. As a result, a very strong optical signal shifted from the pump by >10 THz towards long-wavelength side is generated. In many practical cases this is highly undesirable for a fiber laser or amplifier and, therefore, limits achievable peak or average signal power in a fiber to below SRS threshold.
This SRS threshold can be suppressed in HCC fibers 20 by exploiting its narrow-band nature. Modal coupling between central core 20 and helical side core 24 modes occurs only over a limited wavelength range and is centered at a phase-matching or quasi-phase matching condition. The spectral width (and spectral-peak position) strongly depends on the implementation of the helical side core 24 and central core 22 designs. Therefore, HCC fiber 20 structures may be configured such that it would support optical single-mode signal propagation in central core 22 only at the signal wavelength, and would prohibit propagation of all modes at the wavelengths corresponding to Raman-gain band with respect to this signal. Since modal losses in the Raman band can be made very large (>>100 dB/m), SRS threshold can be significantly increased, thus providing an additional avenue for peak and average-power scaling.
We turn now to rare-earth ion gain band engineering for HCC fibers 20. The spectrally-resonant nature of HCC fibers 20 can be further exploited to modify gain bandwidth of a rare-earth doped fiber. For example, an HCC fiber 20 structure may be configured to completely suppress optical gain in the “conventional” 1030 nm to >1100 nm spectral range of Yb-doped fibers. Thus, optical gain may be achieved at 980 nm. Such gain at this wavelength has currently been demonstrated only using small-core single-mode fibers. The importance of large-core HCC fibers 20 operating at 980 nm is that it would allow very efficient (>80%) brightness conversion from 914 nm and 940 nm multimode laser diodes operating with transversely multimode output into diffraction-limited 980 nm wavelength. Achieving this in a large-core fiber provides very high average powers (potentially >1 kW) in a single-transverse mode at 980 nm. This enables high-power fiber laser designs, which can be an in-core pumped system instead of cladding-pumping systems.
Also, this spectrally-depending coupling in the HCC fiber 20 structure may be exploited to re-shape the Yb-doped fiber gain profile itself. Yb-fiber typically has a strong gain peak at approximately 1030 nm that rapidly rolls off towards long wavelengths. Although the optical gain of Yb-doped fiber extends significantly beyond 1100 nm, this broad bandwidth cannot be directly used for broad-band (>100 nm FWHM) optical signal amplification because the significant gain slope inevitably narrows the amplified spectrum to around 1030 nm. Use of HCC fiber 20 structures with high loss for all modes at 1030 nm would offset the gain slope and would effectively produce very broad amplification band in Yb-doped fibers.
In industry, HCC fibers 20, 20′ facilitate high-power fiber power scaling by reducing susceptibility to nonlinear effects and by improving high-power pumping conditions. Uniquely large mode areas offered by HCC fibers 20, 20′ are particularly advantageous to applications requiring high energy pulse generation. It is a significant advantage of HCC fibers 20, 20′ that they eliminate difficulties associated with splicing currently-existing LMA fibers. Because no coiling is required, even short leads of HCC fibers 20, 20′, spliced to a fiber system (such as monolithic pump combiner or fiber-coupled optical isolator) permit effective higher-mode suppression. Consequently, inaccuracy in mode-matching between different fibers only results in additional splice loss, not mode-quality degradation as is currently the case with existing LMA fibers. Also, an important advantage of HCC fibers 20, 20′ is that the configuration does not require low-NA of the fiber core. This permits LMA designs for Er and Tm doped fibers, operating at technologically important eye-safe wavelength of approximately 1550 nm and 1800 nm to 2000 nm, where achieving low-NA is a significant technical obstacle. Further, HCC fibers 20, 20′ are generally applicable to conventional index-guiding fibers as well as to micro-structured and photonic-crystal fibers.
Now turning to the manufacture of HCC fibers 20, 20′, the compound fiber structure consisting of central core 22 and helically-wound side core 24 or cores 24′, 40, 42 (described above), may be manufactured using existing fiber drawing techniques. An embodiment of the manufacturing technique for fabricating HCC fiber 20 begins by making a fiber preform 100 having a central rotation axis 102 and containing a central core 122 and a helically-wound side core 124 placed off-center relative to central rotation axis 102 (illustrated in
Alternatively, general photonic-crystal fiber fabrication procedures may be utilized. In this case, multiple glass capillaries are stacked together. The overall structure may be selected by choosing missing capillaries in certain locations or, alternatively, by inserting doped capillaries. The stacked structure is then heated and collapsed to provide a solid structure.
HCC fibers 20, 20′ may then be manufactured by drawing or pulling fiber from preform 100 while preform 100 is rotating (illustrated in
Alternatively, the oven rotation speed can be varied during the draw, thus producing variable helical periods. Also, the rotation may change direction as well as rate, thus producing both variable helix period and alternating helix handedness along the fiber. Such methods are useful for producing more complicated compound waveguide structures.
The preceding description has been presented only to illustrate and describe exemplary embodiments of the methods and systems of the present invention. It is not intended to be exhaustive or to limit the invention to any precise form disclosed. It will be understood by those skilled in the art that various changes may be made and equivalents may be substituted for elements thereof without departing from the scope of the invention. In addition, many modifications may be made to adapt a particular situation or material to the teachings of the invention without departing from its essential scope. Therefore, it is intended that the invention not be limited to any particular embodiment disclosed as the best mode contemplated for carrying out this invention, but that the invention will include all embodiments falling within the scope of the claims. The invention may be practiced otherwise than is specifically explained and illustrated without departing from its spirit or scope. The scope of the invention is limited solely by the following claims.
This application is a continuation application of U.S. Ser. No. 11/180,224 filed Jul. 13, 2005, which claims the benefit of U.S. Provisional Application Ser. No. 60/587,988 filed Jul. 14, 2004, which applications are hereby incorporated by reference in their entirety.
Number | Date | Country | |
---|---|---|---|
60587988 | Jul 2004 | US |
Number | Date | Country | |
---|---|---|---|
Parent | 11180224 | Jul 2005 | US |
Child | 12205078 | US |