Abstract:
A preform for making a vortex optical fiber comprises a glass cylinder formed substantially of silicone dioxide that defines a core portion along a longitudinal axis of the glass cylinder and a cladding portion surrounding the core portion. The glass cylinder further defines a plurality of holes running parallel to the longitudinal axis from a first end of the glass cylinder to a second end of the glass cylinder.

Description:
CROSS-REFERENCE TO RELATED APPLICATIONS 
       [0001]    The present invention claims priority from U.S. Provisional App. No. 62/295,183, entitled SYSTEM AND METHOD FOR PRODUCING VORTEX FIBER, filed on Feb. 15, 2016, which is incorporated herein by reference in its entirety. 
     
    
     TECHNICAL FIELD 
       [0002]    The present invention relates to optical fiber production, and more particularly, to the production of optical fiber having improved characteristics for the transmission of orbital angular momentum processed and orthogonal function processed optical signals. 
       BACKGROUND 
       [0003]    The transmission of optical signals within an optical transmission system utilize optical fiber for the transmission of the optical signals between an optical transmitter and an optical receiver. Optical fibers are created using processes that provide the optical fiber with certain known characteristics. These characteristics, such as the refractive index, are achieved using doping and other chemical techniques in order to imbibe the preforms used for creating the optical fiber with certain desired refractive index. The process for doping an optical fiber preform is a costly process and improved methods for generating optical fiber preforms that provide optical fibers having characteristics that better enable the transmission of, for example, orbital angular momentum processed and orthogonal function processed optical signals is desired. 
       SUMMARY 
       [0004]    The present invention, as disclosed and described herein, in one aspect thereof comprises a preform for making a vortex optical fiber comprises a glass cylinder formed substantially of silicone dioxide that defines a core portion along a longitudinal axis of the glass cylinder and a cladding portion surrounding the core portion. The glass cylinder further defines a plurality of holes running parallel to the longitudinal axis from a first end of the glass cylinder to a second end of the glass cylinder. 
     
    
     
       BRIEF DESCRIPTION OF THE DRAWINGS 
         [0005]    For a more complete understanding, reference is now made to the following description taken in conjunction with the accompanying Drawings in which: 
           [0006]      FIG. 1  illustrates the configuration of an optical fiber communication system; 
           [0007]      FIG. 2  illustrates a single mode fiber; 
           [0008]      FIG. 3  illustrates multi-core fibers; 
           [0009]      FIG. 4  illustrates multi-mode fibers; 
           [0010]      FIG. 5  illustrates a hollow core fiber; 
           [0011]      FIG. 6  illustrates an example of a system for drawing an optical fiber from a preform; 
           [0012]      FIG. 7  illustrates a flow diagram describing the generation of a preform; 
           [0013]      FIG. 8  illustrates a standard optical fiber; 
           [0014]      FIG. 9  illustrates the refractive index profile of the optical fiber of  FIG. 8 ; 
           [0015]      FIG. 10  illustrates a vortex optical fiber; 
           [0016]      FIG. 11  illustrates the refractive index profile of the vortex optical fiber of  FIG. 10 ; 
           [0017]      FIG. 12  illustrates a perspective view of a vortex fiber preform; 
           [0018]      FIG. 13  illustrates a cross-sectional view of a vortex fiber; 
           [0019]      FIG. 14  illustrates the process for drawing a vortex optical fiber preform; and 
           [0020]      FIG. 15  is a flow diagram illustrating the process for generating a vortex optical fiber. 
       
    
    
     DETAILED DESCRIPTION 
       [0021]    Referring now to the drawings, wherein like reference numbers are used herein to designate like elements throughout, the various views and embodiments of a system and method for producing vortex optical fiber are illustrated and described, and other possible embodiments are described. The figures are not necessarily drawn to scale, and in some instances the drawings have been exaggerated and/or simplified in places for illustrative purposes only. One of ordinary skill in the art will appreciate the many possible applications and variations based on the following examples of possible embodiments. 
         [0022]    Referring now to the drawings and more particularly to  FIG. 1  there is illustrated the general configuration of an optical fiber communication system. The optical fiber communication system  100  includes an optical transmitter  102  and an optical receiver  104 . The transmitter  102  and receiver  104  communicate over an optical fiber  106 . The transmitter  102  includes information within a light wavelength or wavelengths that is propagated over the optical fiber  106  to the optical receiver  104 . 
         [0023]    Optical communications network traffic has been steadily increasing by a factor of 100 every decade. The capacity of single mode optical fibers has increased 10,000 times within the last three decades. Historically, the growth in the bandwidth of optical fiber communications has been sustained by information multiplexing techniques using wavelength, amplitude, phase, and polarization of light as a means for encoding information. Several major discoveries within the fiber-optics domain have enabled today&#39;s optical networks. An additional discovery was led by Charles M. Kao&#39;s groundbreaking work that recognized glass impurities within an optical fiber as a major signal loss mechanism. Existing glass losses at the time of his discovery were approximately 200 dB per kilometer at 1 micrometer. 
         [0024]    These discoveries gave birth to optical fibers and led to the first commercial optical fibers in the 1970s, having an attenuation low enough for communication purposes in the range of approximately 20 dBs per kilometer. Referring now to  FIGS. 2-5 , there is more particularly illustrated the single mode fiber  202 , multicore fibers  308 , and multimode fibers  410  described herein below. The multicore fibers  308  consist of multiple cores  312  included within the cladding  313  of the fiber. As can be seen in  FIG. 3 , there are illustrated a three core fiber, seven core fiber, and nineteen core fiber. Multimode fibers  410  comprise fibers comprising a few mode fiber  420  or a multimode fiber  422 . Finally, there is illustrated a hollow core fiber  515  including a hollow core  514  within the center of the cladding  516  and sheathing  518 . 
         [0025]    The development of single mode fibers (SMF) such as that illustrated at  202  ( FIG. 2 ) in the early 1980s reduced pulse dispersion and led to the first fiber-optic based trans-Atlantic telephone cable. This single mode fiber included a single transmission core  204  within an outer sheathing  206 . Development of indium gallium arsenide photodiodes in the early 1990s shifted the focus to near-infrared wavelengths (1550 NM), were silica had the lowest loss, enabling extended reach of the optical fibers. At roughly the same time, the invention of erbium-doped fiber amplifiers resulted in one of the biggest leaps in fiber capacity within the history of communication, a thousand fold increase in capacity occurred over a 10 year period. The development was mainly due to the removed need for expensive repeaters for signal regeneration, as well as efficient amplification of many wavelengths at the same time, enabling wave division multiplexing (WDM). 
         [0026]    Throughout the 2000s, increases in bandwidth capacity came mainly from introduction of complex signal modulation formats and coherent detection, allowing information encoding using the phase of light. More recently, polarization division multiplexing (PDM) doubled channel capacity. Though fiber communication based on SMFs featured tremendous growth in the last three decades, recent research has indicated SMF limitations. Non-linear effects in silica play a significant role in long range transmission, mainly through the Kerr effect, where a presence of a channel at one wavelength can change the refractive index of a fiber, causing distortions of other wavelength channels. More recently, a spectral efficiency (SE) or bandwidth efficiency, referring to the transmitted information rate over a given bandwidth, has become theoretically analyzed assuming nonlinear effects in a noisy fiber channel. This research indicates a specific spectral efficiency limit that a fiber of a certain length can reach for any signal to noise (SNR). Recently achieved spectral efficiency results indeed show that the proximity to the spectral efficiency limit, indicating the need for new technologies to address the capacity issue in the future. 
         [0027]    Among several possible directions for optical communications in the future, the introduction of new optical fibers  106  other than single mode fibers  202  has shown promising results. In particular, researchers have focused on spatial dimensions in new fibers, leading to so-called space division multiplexing (SDM) where information is transmitted using cores of multi-core fibers (MCF)  308  ( FIG. 3 ) or mode division multiplexing (MDM) or information is transmitted using modes of multimode fibers (MMFs)  410  ( FIG. 4 ). The latest results show spectral efficiency of 91 bits/S/Hz using twelve core multicore fiber  308  for 52 kilometer long fibers and 12 bits/S/Hz using six mode multimode fiber  410  and 112 kilometer long fibers. Somewhat unconventional transmissions at 2.08 micrometers have also been demonstrated in two 90 meter long photonic crystal fibers, though these fibers had high losses of 4.5 decibels per kilometer. 
         [0028]    While offering promising results, these new types of fibers have their own limitations. Being noncircularly symmetric structures, multicore fibers are known to require more complex, expensive manufacturing. On the other hand, multimode fibers  410  are easily created using existing technologies. However, conventional multimode fibers  410  are known to suffer from mode coupling caused by both random perturbations in the fibers and in modal multiplexers/demultiplexers. 
         [0029]    Several techniques have been used for mitigating mode coupling. In a strong coupling regime, modal cross talk can be compensated using computationally intensive multi-input multi-output (MIMO) digital signal processing (DSP). While MIMO DSP leverages the technique&#39;s current success in wireless networks, the wireless network data rates are several orders of magnitude lower than the ones required for optical networks. Furthermore, MIMO DSP complexity inevitably increases with an increasing number of modes and no MIMO based data transmission demonstrations have been demonstrated in real time thus far. Furthermore, unlike wireless communication systems, optical systems are further complicated because of fiber&#39;s nonlinear effects. In a weak coupling regime, where cross talk is smaller, methods that also use computationally intensive adapted optics, feedback algorithms have been demonstrated. These methods reverse the effects of mode coupling by sending a desired superposition of modes at the input, so that desired output modes can be obtained. This approach is limited, however, since mode coupling is a random process that can change on the order of a millisecond in conventional fibers. 
         [0030]    Thus, the adaptation of multimode fibers  410  can be problematic in long haul systems where the round trip signal propagation delay can be tens of milliseconds. Though 2×56 GB/S transmission at 8 kilometers length has been demonstrated in the case of two higher order modes, none of the adaptive optics MDM methods to date have demonstrated for more than two modes. Optical fibers act as wave guides for the information carrying light signals that are transmitted over the fiber. Within an ideal case, optical fibers are 2D, cylindrical wave guides comprising one or several cores surrounded by a cladding having a slightly lower refractive index as illustrated in  FIGS. 2-5 . A fiber mode is a solution (an eigenstate) of a wave guide equation describing the field distribution that propagates within a fiber without changing except for the scaling factor. All fibers have a limit on the number of modes that they can propagate, and have both spatial and polarization degrees of freedom. 
         [0031]    Single mode fibers (SMFs)  202  are illustrated in  FIG. 2  and support propagation of two orthogonal polarizations of the fundamental mode only (N=2). For sufficiently large core radius and/or the core cladding difference, a fiber is multimoded for N&gt;2 as illustrated in  FIG. 4 . For optical signals having orbital angular momentums and multilayer modulation schemes applied thereto, multimode fibers  410  that are weakly guided may be used. Weakly guided fibers have a core cladding refractive index difference that is very small. Most glass fibers manufactured today are weakly guided, with the exception of some photonic crystal fibers and air-core fibers. Fiber guide modes of multimode fibers  410  may be associated in step indexed groups where, within each group, modes typically having similar effective indexes are grouped together. Within a group, the modes are degenerate. However, these degeneracies can be broken in a certain fiber profile design. 
         [0032]    We start by describing translationally invariant waveguide has a refractive index n=n(x, y), with n co  being maximum refractive index (“core” of a waveguide), and n cl  being refractive index of the uniform cladding, and ρ represents the maximum radius of the refractive index n. Due to translational invariance the solutions (or modes) for this waveguide can be written as: 
         [0000]        E   j ( x,y,z )= e   j ( x,y ) e   iβ     j     z , 
         [0000]        H   j ( x,y,z )= h   j ( x,y ) e   iβ     j     z , 
         [0000]    where β j  is the propagation constant of the j-th mode. Vector wave equation for source free Maxwell&#39;s equation can be written in this case as: 
         [0000]      (∇ 2   +n   2   k   2 β j   2 ) e   j =−(∇ t   +iβ   j   {circumflex over (z)} )( e   tj ·∇ t  ln( n   2 ))
 
         [0000]      (∇ 2   +n   2   k   2 β j   2 ) h   j =−(∇ t ln( n   2 ))×((∇ t   +iβ   j   {circumflex over ({circumflex over (z)})} )× h   j )
 
         [0000]    where k=2π/λ is the free-space wavenumber, λ is a free-space wavelength, e t =e x {circumflex over (x)}+e y ŷ is a transverse part of the electric field, ∇ 2  is a transverse Laplacian and ∇ t  transverse vector gradient operator. Waveguide polarization properties are built into the wave equation through the ∇ t  ln(n 2 ) terms and ignoring them would lead to the scalar wave equation, with linearly polarized modes. While previous equations satisfy arbitrary waveguide profile n(x, y), in most cases of interest, profile height parameter Δ can be considered small Δ&lt;&lt;1, in which case waveguide is said to be weakly guided, or that weakly guided approximation (WGA) holds. If this is the case, a perturbation theory can be applied to approximate the solutions as: 
         [0000]        E ( x,y,z )= e ( x,y ) e   i(β+{tilde over (β)})z =( e   t   +{circumflex over (z)}e   z ) e   i(β+{tilde over (β)})z    
         [0000]        H ( x,y,z )= h ( x,y ) e   i(β+{tilde over (β)})z =( h   t   +{circumflex over (z)}h   z ) e   i(β+{tilde over (β)})z    
         [0000]    where subscripts t and z denote transverse and longitudinal components respectively. Longitudinal components can be considered much smaller in WGA and we can approximate (but not neglect) them as: 
         [0000]    
       
         
           
             
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         [0033]    Where Δ and V are profile height and fiber parameters and transversal components satisfy the simplified wave equation. 
         [0000]      (∇ 2   +n   2   k   2 −β j   2 ) e   j =0
 
         [0000]      (∇ 2   +n   2   k   2 −β j   2 ) e   j =0
 
         [0000]    Though WGA simplified the waveguide equation, further simplification can be obtained by assuming circularly symmetric waveguide (such as ideal fiber). If this is the case refractive index that can be written as: 
         [0000]        n ( r )= n   2   co (1−2 f ( R )Δ)
 
         [0000]    where f(R)≧0 is a small arbitrary profile variation. 
         [0034]    For a circularly symmetric waveguide, we would have propagation constants β lm  that are classified using azimuthal (l) and radial (m) numbers. Another classification uses effective indices n lm  (sometimes noted as n eff   lm  or simply n eff , that are related to propagation constant as: β lm =kn eff ). For the case of l=0, the solutions can be separated into two classes that have either transverse electric (TE 0m ) or transverse magnetic (TM 0m ) fields (called meridional modes). In the case of l≠0, both electric and magnetic field have z-component, and depending on which one is more dominant, so-called hybrid modes are denoted as: HE lm  and EH lm . 
         [0035]    Polarization correction δβ has different values within the same group of modes with the same orbital number (l), even in the circularly symmetric fiber. This is an important observation that led to development of a special type of fiber. 
         [0036]    In case of a step refractive index, solutions are the Bessel functions of the first kind, J l (r), in the core region, and modified Bessel functions of the second kind, K l (r), in the cladding region. 
         [0037]    In the case of step-index fiber the groups of modes are almost degenerate, also meaning that the polarization correction δβ can be considered very small. Unlike HE 11  modes, higher order modes (HOMs) can have elaborate polarizations. In the case of circularly symmetric fiber, the odd and even modes (for example HE odd  and HE even  modes) are always degenerate (i.e. have equal n eff ), regardless of the index profile. These modes will be non-degenerate only in the case of circularly asymmetric index profiles. 
         [0038]    The optical fibers, making up the optical fiber connection  106  may be fabricated using a wide range of methods. These methods can be divided into so-called preform methods and methods of direct fiber production. Preform-based methods are most important at least in the context of glass fibers, whereas direct methods, e.g. based on extrusion, are common for plastic fibers. 
         [0039]    Referring now to  FIG. 6 , there is illustrated the manner in which a preform  602  is turned in to a fiber. Most glass fibers are fabricated by pulling from a preform  602  in a fiber drawing tower  604 . The fiber drawing tower  604  is typically several meters high. The preform  602  is a glass rod with a diameter between 1 and 10 cm and having a length of roughly 1 m. Along its central axis, the preform  602  contains a region with an increased refractive index which will form the fiber core. When the preform  602  is heated close to its melting point in a furnace (oven)  606  at the top of the drawing tower  604 , a thin fiber  608  can be pulled out of the bottom of the preform  602 . The fiber  608  produced from a single preform  602  can be many kms long. During the pulling process, the fiber diameter is held constant by automatically adjusting the pulling speed using a pulling system  614  and also by possibly adjusting the furnace temperature with an automatic feedback system  612  that receives input from a diameter monitor  616  below the furnace  606 . 
         [0040]    Fiber pulling works well for silica fibers, since silica has a rather broad glass transition, i.e., a large range of temperatures in which the viscosity is in a suitable range. Other materials, e.g. fluoride fibers, have a much smaller temperature range suitable for pulling and the method is accordingly more delicate. 
         [0041]    Before the fiber  608  is wound up using a winder  620 , the fiber receives a polymer coating within a coating system  622  to provide mechanical and chemical protection. Such coating can consist of two or more different layers for optimum suppression of micro-bends. Typical coating materials used are acrylate, silicone and polyimide. Additional PVC (polyvinyl chloride) or similar protective coatings can be made by extrusion after the drawing process. 
         [0042]    Several methods are used to manufacture preforms. Many fiber preforms are fabricated with a process called modified chemical vapor deposition (MCVD or just CVD) in which a highly controlled mixture of chemicals are carried to the inside of a rotating glass tube made of pure synthetic silicon dioxide. This method was developed for silica telecom fibers with contributions from University of Southampton (UK), Bell laboratories and Corning. A pure silica tube is mounted on a lathe equipped with a special heat torch. 
         [0043]    Referring now to  FIG. 7  this process is more fully described, a mixture of oxygen, silicon tetrachloride (SiCl 4 ) and possibly other substances (e.g. germanium tetrachloride (GeCl 4 ) and rare earth dopants which may be used within the fiber core) is passed at step  702  through a rotating silica glass tube, which is heated at step  704  from the outside to approximately 1600° C. with a flame from the heat torch. Chemical reactions in the gas form a fine sort of silica (and possibly other substances) which coat the inner surface of the glass near the burner at step  706  and is sintered into a clear glass layer at step  708  in a process called vitrification. The particles are solid submicron particles, called soot. The material deposited in the tube will form the core region of the optical fiber. The burner is continuously moved back and forth along the tube. For every sweep of the burner, the manufacturer can modify the composition, viscosity and thickness of the deposited layer to produce specific fiber designs. This, in conjunction with the ability to change the speed at which the burner moves and the temperature of the flame, provides the ability to manufacture a wide range of ultrapure optical fiber types. Precise delivery of chemicals is insured by using equipment that performs accurately and consistently. The process is repeated for many hours to lay down subsequent core layers. Toward the end of the process, the gas mixture is modified at step  710  to form a layer with a higher refractive index, the precursor of the fiber core. Finally, at step  712 , the chemical flow is shut off, the speed of the torch is decreased and the temperature of the flame increased so that the tube is collapsed into a solid rod by heating it to approximately 2000° C. 
         [0044]    Various alternative vapor deposition methods have also been developed. These include outside vapor deposition (OVD); vapor phase axial deposition (VAD or AVD); plasma chemical vapor deposition (PCVD); plasma impulse chemical vapor deposition (PICVD); plasma enhanced chemical vapor deposition (PECVD); and plasma outside deposition (POD). 
         [0045]    Outside vapor deposition (OVD) is a process where the silica soot is deposited on the surface of a target rod (e.g. a glass mandrel) rather than inside a tube as with MCVD. Together with the material precursor such as SiCl 4 , a fuel gas such as hydrogen or methane is applied to a burner which is again moved along the rotating rod. After the deposition, the target rod is removed, and the preform is consolidated in a furnace, where it is also purged with a drying gas for lowering the hydroxyl content. 
         [0046]    Vapor phase axial deposition (VAD) is similar to OVD, but uses a modified geometry where the deposition occurs at the end of the target rod. The rod is continuously pulled away from the burner, and very long preforms can be made. Consolidation of the material can be done in a separate zone melting process. An important difference between OVD and CVD is that the doping profile is determined only by the burner geometry rather than by a variation of the gas mixture over time. 
         [0047]    Plasma chemical vapor deposition (PCVD) uses deposition inside a tube, similar to MCVD. However, microwaves instead of a burner are used for heating the deposition region. The deposition is slow but very precise. A modified method with particularly high precision is plasma impulse chemical vapor deposition (PICVD) where short microwave pulses are used. There is also plasma enhanced chemical vapor deposition (PECVD) operating at atmospheric pressure with a fairly high deposition rate. 
         [0048]    The preforms for multimode fibers, particularly for large core fibers, are often fabricated using plasma outside deposition (POD) where an outer fluorine doped layer with depressed refractive index. The fiber cladding is made with a plasma torch. The core can then be made of pure silica without any dopant. 
         [0049]    The general advantage of vapor deposition methods is that extremely low propagation losses down to below 0.2 DB dB/km can be achieved, because very high purity materials can be used and contamination is avoided. In particular, SiCl 4  and GeCl 4  are easily purified by distillation, as they are liquid at room temperature. Particularly when no hydrogen is present (e.g. as fuel gas), the water content of such preforms is very low, avoiding a strong loss peak at 1.4 μm, which would also affect the telecom bands in optical fiber communications. 
         [0050]    The different vapor deposition methods differ in many respects, e.g. concerning the possible material purity, the degree, precision and flexibility of refractive index control, the mechanical strength of the fabricated fibers, and the deposition efficiency and speed. For materials were vapor deposition cannot be applied, the rod-in-tube technique is another option. Here, a rod of glass with a higher refractive index is inserted into a glass tube with a lower refractive index. Both can be reasonably well connected by heating, but great care is required to avoid bubbles and other disturbances. There are also casting methods where the molten core glass is poured into the cladding tube, or sucked into the tube using a vacuum pump. 
         [0051]    Preforms for photonic crystal fibers containing small holes throughout out are usually fabricated by stacking capillary tubes and/or rods, in most cases made of pure fused silica. It is possible to introduce rare-earth-doped rods for active fiber devices. 
         [0052]    For active fiber devices such as fiber lasers and fiber amplifiers, rare-earth-doped fibers are required. The fiber core is doped with rare earth ions, e.g. of erbium, neodymium, ytterbium or thulium. Additional dopants can modify the refractive index, improve the solubility for rare earth ions or modify the photosensitivity. 
         [0053]    Not all dopants can be easily incorporated with vapor deposition methods, requiring convective material transport. In particular, precursors for rare earth dopants usually have a too low vapor pressure. One possibility to overcome this problem is to expose the source of rare earth ions to a higher temperature. For example, a glass tube is used for MCVD may contain an additional doping chamber or a porous silica part soap with a rare earth salt, which is heated with an additional burner. 
         [0054]    Another common technique is a solution doping, where a porous silica frit (not yet containing rare earth ions) is deposited on the inner side of a hollow silica tube. This frit is soaked with a solution containing a rare earth salt (e.g. a chloride). The preform later needs to be further processed to form a dry and compact rare earth oxide layer. 
         [0055]    Another alternative technique is direct nano particle depositions using an aerosol. This method allows for high doping concentrations with homogeneity and accurate control of the doping profile. 
         [0056]      FIG. 8  illustrates a fiber  802  which propagates an optical beam therethrough. The fiber  802  includes a core  806  surrounded by a cladding  108 . The index of refraction for the cladding  108  is represented by n L  and the index of refraction for the core  106  is represented by n H . Referring now also to  FIG. 9 , there is illustrated the profile  904  for the index of refraction between the core  806  and the cladding  808  for the fiber  802 . The index of refraction has a peak along the centerline axis  904  associated with the central axis of the core  806 . 
         [0057]    A vortex optical fiber  1002 , such as that illustrated in  FIG. 10 , further provides the ability to propagate optical signals including orbital angular momentum or other orthogonal functions of therethrough in a more efficient manner. The orbital angular momentum functions and orthogonal functions that can be transmitted with the fiber  1002  are more fully described with respect to U.S. patent application Ser. No. 15/357,808, entitled SYSTEM AND METHOD FOR COMMUNICATION USING ORBITAL ANGULAR MOMENTUM WITH MULTIPLE LAYER OVERLAY MODULATION and filed on Nov. 21, 2016, which is incorporated herein by reference in its entirety. The index of refraction for the core  1006  is represented by n H  and the index of refraction for the cladding  1008  is represented by n L . As shown in  FIG. 11 , the vortex fiber  1002  provides a profile  1102  of the index of refraction between the core  1006  and the cladding  1008  for the fiber  1002  as illustrated generally at  1102 . The index of refraction includes a valley  1104  along the central axis  1105  of the core  1006  and a pair of peaks  1106  on each of the edge axis  1108  of the core. 
         [0058]    Current methods for the production of vortex fibers  1002  that produce the index of refraction  1102  as illustrated with respect to  FIG. 11  involve the use of costly doping processes as described hereinabove in order to achieve the index of refraction that best supports OAM or orthogonal function processed optical signals. Optical fibers are primarily composed of silicon dioxide (SiO 2 ) and minute amounts of other chemicals are added thereto. Other chemical compounds such as germanium tetrachloride (GeCl 4 ) and phosphorus oxychloride (POCl 3 ) can also be used to produce core fibers and outer shells or cladding with a function specific optical properties. 
         [0059]    The cores of all standard communication fibers are primarily silica with varying amounts of germanium added to increase the fibers refractive index to the desired level. Single mode fibers typically include only small amounts of germanium and have a uniform composition within the cores. Multimode fibers usually have a much higher refractive index and therefore require much higher germanium content. Also the core composition and refractive index of multimode fibers may change across the core of the fiber to give the refractive index a parabolic shape. Because the refractive index changes across a cross-section of the core, these multimode products are called graded index fibers. 
         [0060]    In order to achieve a vortex profile having an index of refractive profile  1102  similar to that illustrated in  FIG. 11 , a preform  1202  such as that illustrated in  FIG. 12  is provided. The preform  1202  has a number of holes drilled therethrough prior to the drawing of the preform  1202 . The holes comprise a central hole  1204  that is drilled through the central axis  1205  and the core of the preform  1202 , and a series of periphery holes  1206  that are drilled between the center hole  1204  and the outer circumference of the preform  1202  through the cladding  1208  of the fiber preform  1202 . The holes are drilled completely through the preform  1202 . Drilling of the holes maybe achieved using lasers or other appropriate drilling technologies. While the preferred embodiment envisions the drilling of the holes  1204  and  1206 , other methods or techniques for creating holes within the cross-section of the preform  1202  may also be used. 
         [0061]    Referring now to  FIG. 13 , there is illustrated a cross-section of the vortex fiber  1302  after completion of the fiber forming process which will be described herein below. As can be seen, the fiber  1302  includes the holes  1304  that were originally drilled within the preform surrounding a core  1305 . The fiber  1302  provides the index of refraction  1306  of the fiber that is conducive to the propagation of OAM processed signals or orthogonal function processed signals. The one drawback associated with a fiber  1302  produced as described herein below is a loss of tensile strength. Fibers produced according to previous technologies will have a tensile resistance of 100,000 pounds per square inch. A vortex fiber produced according to the process described herein have a lower tensile resistance than this and thus may have limited utility in particular types of applications. The preform  1202  will have a cross-section such as that illustrated in  FIG. 13 , wherein the core  1302  is included within the center of the preform  1202  and the series of holes  1206  are located between the core  1302  and the circumference of the glass preform  1202 . 
         [0062]    Referring now to  FIG. 14  there is illustrated the components for performing a vortex fiber preform draw and in  FIG. 15  a flow diagram more particularly describing the process. Once the glass preform  1402  has been drilled to include the holes to enable generation of the vortex optical fiber that better transmits orbital angular momentum and orthogonal function signals, the glass preform may be applied to a fiber forming process. In order to convert the preform  1402  into a fiber, a fiber draw operation is utilized. The drilled preform  1402  has its tip lowered into a high purity graphite furnace  1404 . Pure gases are injected into the furnace  1404  to provide a clean and conductive atmosphere. Within the furnace  1404 , tightly controlled temperatures approaching 1900° C. softened the tip of the preform  1402 . The preform is heated to the optimum temperature to achieve an ideal drawing process. The temperature is under the control of the furnace  1404 . Once the tip of the preform is heated, soft gravity begins to pull a molten glob until it is been stretched into a thin strand. The operator threads the thin strand through a series of devices and the drawing process may begin. 
         [0063]    The fiber  1405  is pulled by a tractor belt  1407  at the bottom of the draw tower through several components and wound onto a take-up spool  1406  during the drawing process. Draw speeds of 10 to 20 m/s are not uncommon in the industry and may be controlled using a feedback control  1409  that controls the speed of the take-up spool  1406  and a tension roller  1408 . During the draw process, the diameter of the fiber is controlled to a predetermined size using laser micrometers  1410 . The laser micrometers  1410  are used as the fiber exits the furnace  1404  and prior to being taken up on the take-up spool  1406  to consistently control fiber diameter. The laser micrometers  1410  provide control signals of the measured diameter to the feedback control system  1409  which provides speed control signals to the tractor belt  1407 , tension roller  1408  and take-up spool  1406 . The laser micrometers  1410  can sample the diameter of the fiber at over 750 times per second. The actual value of the diameter is compared to a predetermined target, and slight deviations from targets are converted to changes in draw speed by the take-up spool  1406  and are fed to the tractor belt mechanism for correction. If the diameter of the fiber  1405  increases above target, the draw speed is increased. If the detected fiber diameter falls below the target, the draw speed is decreased. 
         [0064]    Protective coatings are applied to the fiber  1405  via a coating application  1412 . One or more different coating types may be applied to the fiber as it passes through the coating application  1412 . The applied coating is UV cured using ultraviolet lamp  1414 . The protective coating protects the surface of the fiber  1402  from harsh environments. 
         [0065]    Referring now to  FIG. 15 , there is illustrated a flow diagram describing the process for creating a vortex fiber that better transmits orbital angular momentum processed and orthogonal function processed signals as described hereinabove. The preform is created at step  1502  using the process as described hereinabove to create the glass cylinder. A core having a desired refractive index is generated at step  1504 . The holes disclosed herein above with respect to  FIG. 13  are drilled at step  1506  within the preform between the core and the periphery of the preform and within the core. While one embodiment describes the drilling of the holes, as described above, other manners for creating the holes within the preform may be utilized. The preform is lowered into the furnace at step  1508  to begin heating the preform. The heating process is controlled by the injection of gases at step  1510  into the furnace in order to achieve the desired temperature. Once the preform is heated to the desired temperature, this will enable the creation of a strand at step  1512  based upon gravity acting upon the melting preform. The generated strand is threaded at step  1514  through the system components and on to a take-up spool. The fiber is drawn from the preform using a feedback control drawing process  1518  as illustrated within the dashed box. The generated fiber may be coated with various protective materials at step  1520  and cured, using for example UV technologies, at step  1522 . The created and coated fiber is spooled at step  1524  until it is needed for use. 
         [0066]    Referring now back to the feedback control step  1518 , the drawn fiber has its diameter measured at one or more locations at step  1526 . These diameter measurements are compared to target values at step  1528 . The target value may be established prior to the drawing process by a user based upon the particular type of fiber that is being created. Inquiry step  1530  determines whether the measured fiber diameter is above, below or equal to the designated target value. If the diameter is above the target value control passes to step  1532  in order to increase the speed of the drawing process. This will cause a thinning of the fiber and control passes back to step  1526  to again measure the current fiber diameter. If inquiry step  1530  determines that the fiber diameter is below the target value, control passes to step  1534  wherein the speed of the drawing process is decreased in order to increase the size of the fiber. Control passes back to step  1526  to further measure the fiber diameter. If the fiber is at the designated target value, control passes on to step  1522  and continues the fiber drawing process. It will be realized that the fiber drawing speed control step  1528  will occur continuously throughout the fiber drawing process and its illustration between the drawing encoding fiber steps is for purposes of illustration only. The diameter of the fiber will be continuously monitored and adjusted throughout the creation of the fiber using a fiber draw process to maintain a substantially constant diameter. 
         [0067]    It will be appreciated by those skilled in the art having the benefit of this disclosure that this system and method for producing a vortex optical fiber provides an optical fiber providing better transmission characteristics for orbital angular momentum processed and orthogonal function processed optical signals. It should be understood that the drawings and detailed description herein are to be regarded in an illustrative rather than a restrictive manner, and are not intended to be limiting to the particular forms and examples disclosed. On the contrary, included are any further modifications, changes, rearrangements, substitutions, alternatives, design choices, and embodiments apparent to those of ordinary skill in the art, without departing from the spirit and scope hereof, as defined by the following claims. Thus, it is intended that the following claims be interpreted to embrace all such further modifications, changes, rearrangements, substitutions, alternatives, design choices, and embodiments.