Test procedures 1 of Measurement methods and test procedures Numerical aperture Scope This part of document establishes uniform requirements for measuring the numerical aperture of optical fibre thereby assisting in the inspection of fibres and cables for commercial purposes The numerical aperture( NA) of category Al graded-index multimode fibre is an important parameter tha describes a fibre's light-gathering ability. It is used to predict launching efficiency, joint loss at splices and micro/macrobending performance Overview of method This test procedure describes a method for measuring the angular radiant intensity( far-field) distribution from an optical fibre. The numerical aperture of a category A1 graded-index multimode optical fibre can calculated from the results of this measurement using equation(11) for NA in the far field, NAff, as described in 8.1 The maximum theoretical NA of a graded index multimode fibre is defined as follows: NAth= sin em (1) where NAth is the maximum theoretical numerical aperture em is the largest incident meridional ray angle that will be guided by the fibre In terms of the fibre index profile here n, is the maximum refractive index of the core, and n2 is the refractive index of the cladding NA 2△ n for△<<1 here n NA can be determined from a far-field radiation pattern measurement on a short length of fibre or from a measurement of a fibre s refractive index profile. Using the far-field method, the intensity pattern, 1(0), of a fibre is acquired, and the NAff (numerical aperture in the far field)is defined as the sine of the half- angle where the intensity has decreased to 5 % of its maximum value 3 Apparatus 3.1 Input system 3.1.1 Light source Use an incoherent light source capable of producing an area of substantially constant radiance (variations of less than 10 in intensity) on the endface of the specimen. It shall be stable in intensity and position over a time interval sufficient to perform the measurement 3.1.2 Input optics Use a system of optical components to create a monochromatic(<100 nm full width half maximum substantially constant radiance spot larger in diameter than the endface of the specimen and with a numerical aperture greater than that of the specimen Unless otherwise specified, the centre wavelength shall be 850 nm t 25 nm. Provide a means of verifying the alignment of the endface. Optical filters may be used to limit the spectral width of the source 3.1.3 Fibre input end support and alignment Provide a means of supporting the input end of the specimen to allow stable and repeatable positioning vithout introducing significant fibre deformation. Provide suitable means to align the input endface wit respect to the launch radiation. 3.1.4 Cladding mode stripper Provide means to remove cladding light from the specimen. Often the fibre coating is sufficient to perform this function. Otherwise, it will be necessary to use cladding mode strippers near both ends of the test specimen
Test procedures Page: 1 of 5 Subject: Originated by: Wu Jia Measurement methods and test procedures – Numerical aperture 1 Scope This part of document establishes uniform requirements for measuring the numerical aperture of optical fibre, thereby assisting in the inspection of fibres and cables for commercial purposes. The numerical aperture (NA) of category A1 graded-index multimode fibre is an important parameter that describes a fibre's light-gathering ability. It is used to predict launching efficiency, joint loss at splices, and micro/macrobending performance. 2 Overview of method This test procedure describes a method for measuring the angular radiant intensity (far-field) distribution from an optical fibre. The numerical aperture of a category A1 graded-index multimode optical fibre can be calculated from the results of this measurement using equation (11) for NA in the far field, NAff, as described in 8.1. The maximum theoretical NA of a graded index multimode fibre is defined as follows: NAth = sin θm (1) where NAth is the maximum theoretical numerical aperture; θm is the largest incident meridional ray angle that will be guided by the fibre. In terms of the fibre index profile: (2) where n1 is the maximum refractive index of the core, and n2 is the refractive index of the cladding or (3) where (4) NA can be determined from a far-field radiation pattern measurement on a short length of fibre or from a measurement of a fibre's refractive index profile. Using the far-field method, the intensity pattern, I(θ), of a fibre is acquired, and the NAff (numerical aperture in the far field) is defined as the sine of the halfangle where the intensity has decreased to 5 % of its maximum value. 3 Apparatus 3.1 Input system 3.1.1 Light source Use an incoherent light source capable of producing an area of substantially constant radiance (variations of less than 10 % in intensity) on the endface of the specimen. It shall be stable in intensity and position over a time interval sufficient to perform the measurement. 3.1.2 Input optics Use a system of optical components to create a monochromatic (<100 nm full width half maximum), substantially constant radiance spot larger in diameter than the endface of the specimen and with a numerical aperture greater than that of the specimen. Unless otherwise specified, the centre wavelength shall be 850 nm ± 25 nm. Provide a means of verifying the alignment of the endface. Optical filters may be used to limit the spectral width of the source. 3.1.3 Fibre input end support and alignment Provide a means of supporting the input end of the specimen to allow stable and repeatable positioning without introducing significant fibre deformation. Provide suitable means to align the input endface with respect to the launch radiation. 3.1.4 Cladding mode stripper Provide means to remove cladding light from the specimen. Often the fibre coating is sufficient to perform this function. Otherwise, it will be necessary to use cladding mode strippers near both ends of the test specimen
Test procedures 2 of Measurement methods and test procedures Numerical aperture 3.2 Output system and detection Three equivalent techniques may be used to detect the angular radiant intensity( far field) distribution om the specimen. Techniques 1 and 2 are angular scans of the far-field pattern Technique 3 is a scan of the spatial transform of the angular intensity pattern(a small or large area scanning detector may be used. 3.2.1 Technique 1- Angular scan(see figure 1) 3.2.1.1 Fibre output end support and alignment Use a means of supporting and aligning the output end of the specimen that allows alignment of the endface normal to and coincident with the axis of rotation of th e optical detector and coincident with the plane of rotation of the optical detector For example, a vacuum chuck mounted on X-Y-Z micropositioners with a microscope fixture for the fibre end would be suitable. Examples include a goniometer or stepper-motor driven rotation 3.2.1.2 Detection system mechanics Use a suitable means for rotation of the optical detector that allows the detector to scan an arc sufficient to cover essentially the full radiation cone from the specimen(for example, a calibrated goniometer) . The to the specimen axis, and the rotation plane of this mechanism shall be coincident with the axis of the specimen Provide means for recording the relative angular position of the detector with respect to the specimen output aXis 七z0 Clamp Top view Detector Finished output end Movable arm Side view AEc676/01 Figure 1- Technique 1- Angular scan 3.2.2 Technique 2- Angular scan(see figure 2) Use a means of supporting the specimen such that the output endface is perpendicular to, and coincident with, the axis of rotation of the specimen. This mechanism( e.g. a goniometer or precision rotating stage) shall rotate sufficiently to allow the full radiation cone in the plane of rotation to sweep past the fixed detector. That is, the rotation shall be greater than the total angle of the specimen output radiation. Provide means to record the included angle formed by the specimen axis and the imaginary line between the detector and specimen endface 一zer Movable arm ■■ Figure 2- Technique 2- Angular scan IEC 577/0
Test procedures Page: 2 of 5 Subject: Originated by: Wu Jia Measurement methods and test procedures – Numerical aperture 3.2 Output system and detection Three equivalent techniques may be used to detect the angular radiant intensity (far field) distribution from the specimen. Techniques 1 and 2 are angular scans of the far-field pattern. Technique 3 is a scan of the spatial transform of the angular intensity pattern (a small or large area scanning detector may be used.) 3.2.1 Technique 1 – Angular scan (see figure 1) 3.2.1.1 Fibre output end support and alignment Use a means of supporting and aligning the output end of the specimen that allows alignment of the endface normal to and coincident with the axis of rotation of the optical detector and coincident with the plane of rotation of the optical detector. For example, a vacuum chuck mounted on X-Y-Z micropositioners with a microscope fixture for aligning the fibre end would be suitable. Examples include a goniometer or stepper-motor driven rotational stage. 3.2.1.2 Detection system mechanics Use a suitable means for rotation of the optical detector that allows the detector to scan an arc sufficient to cover essentially the full radiation cone from the specimen (for example, a calibrated goniometer). The axis of rotation of the mechanism shall intercept the endface of the specimen and shall be perpendicular to the specimen axis, and the rotation plane of this mechanism shall be coincident with the axis of the specimen. Provide means for recording the relative angular position of the detector with respect to the specimen output axis. 3.2.2 Technique 2 – Angular scan (see figure 2) Use a means of supporting the specimen such that the output endface is perpendicular to, and coincident with, the axis of rotation of the specimen. This mechanism (e.g. a goniometer or precision rotating stage) shall rotate sufficiently to allow the full radiation cone in the plane of rotation to sweep past the fixed detector. That is, the rotation shall be greater than the total angle of the specimen output radiation. Provide means to record the included angle formed by the specimen axis and the imaginary line between the detector and specimen endface
Test procedures Measurement methods and test procedures Numerical aperture 3.2.3 Technique 3-Scan of the spatial field pattern(see figure 3) 3.2.3.1 Fibre output end support apparatus Provide a means of supporting and aligning the specimen output end that allows stable and repeatable positioning 3.2.3.2 Far-field transformation and projection Create a spatial representation of the far field of the specimen by suitable means(for example, by usi a microscope objective or other well corrected lens to obtain the Fourier transform of the fibre output ear-field pattern Scan this pattern or its image using a pinhole aperture as to enable the far-field intensity to be recorded The size of the pinhole aperture shall be less than, or equal to one-half the diffraction limit of the system 1.22 2 f 2D the d is the diameter of the pinhole, in um M is the magnification from the back focal plane of the transforming lens to the scanning plane A is the spectral wavelength emitted from the fibre in nm f is the focal length of the transform lens, in mm D is the fibre core diameter, in um The numerical aperture of the lens, L1, should be large enough so as not to limit the numerical aperture of the fibre specimen Where the far-field pattern is represented by a lens, care should be taken that, especially with high apertures, the diameter of the relay lens, L2, is sufficiently large so as to avoid darkening the periphery: 12>2f tan c (6) D12 is the diameter of the relay lens, in mm f is the focal length of the transform lens, in mm; sin is the numerical aperture NA Far field Lens L1 Lens L2 Figure 3- Technique 3- Scan of the spatial field pattern 3.2.3.3 Scanning system Provide a method of scanning the far-field pattern with respect to the pinhole aperture and detector 3.2. 3 4 System calibration Perform a calibration to measure the conversion factor that relates the distance of movement of the canning system to the actual distance scanned in the back focal plane of the far-field transforming lens In addition, determine the factor that relates scan position in the field pattern transformation plane(the o A pattern of known dimensions, carefully placed in the back focal plane, L1, can be used for this purpos back focal plane of Li in figure 3 to emission angle, 0, with respect to the specimen output end axis is the distance from the axis to the spatial field pattern; f is the focal length of the transform lens, L1 e is the angle with respect to the optical axis
Test procedures Page: 3 of 5 Subject: Originated by: Wu Jia Measurement methods and test procedures – Numerical aperture 3.2.3 Technique 3 – Scan of the spatial field pattern (see figure 3) 3.2.3.1 Fibre output end support apparatus Provide a means of supporting and aligning the specimen output end that allows stable and repeatable positioning. 3.2.3.2 Far-field transformation and projection Create a spatial representation of the far field of the specimen by suitable means (for example, by using a microscope objective or other well corrected lens to obtain the Fourier transform of the fibre output near-field pattern). Scan this pattern or its image using a pinhole aperture as to enable the far-field intensity to be recorded. The size of the pinhole aperture shall be less than, or equal to, one-half the diffraction limit of the system: where d is the diameter of the pinhole, in µm; M is the magnification from the back focal plane of the transforming lens to the scanning plane; λ is the spectral wavelength emitted from the fibre, in nm; f is the focal length of the transform lens, in mm; D is the fibre core diameter, in µm. The numerical aperture of the lens, L1, should be large enough so as not to limit the numerical aperture of the fibre specimen. Where the far-field pattern is represented by a lens, care should be taken that, especially with high apertures, the diameter of the relay lens, L2, is sufficiently large so as to avoid darkening the periphery: where D12 is the diameter of the relay lens, in mm; f is the focal length of the transform lens, in mm; sin Φ is the numerical aperture, NA. 3.2.3.3 Scanning system Provide a method of scanning the far-field pattern with respect to the pinhole aperture and detector. 3.2.3.4 System calibration Perform a calibration to measure the conversion factor that relates the distance of movement of the scanning system to the actual distance scanned in the back focal plane of the far-field transforming lens. A pattern of known dimensions, carefully placed in the back focal plane, L1, can be used for this purpose. In addition, determine the factor that relates scan position in the field pattern transformation plane (the back focal plane of L1 in figure 3) to emission angle, θ, with respect to the specimen output end axis as y = f sin θ (7) where y is the distance from the axis to the spatial field pattern; f is the focal length of the transform lens, L1; θ is the angle with respect to the optical axis
Test procedures of Measurement methods and test procedures Numerical aperture 3.2.3. 5 Recording system Provide means to record El), the detected intensity as a function of the scan position, y, and to correct the detected intensity as follows: (0)=E cos 8 where r(0) is the angular intensity distribution as detected by the angular scan lens El is the radiance at distance y from the axis of the spatial pattern y is the distance from the axis to the spatial field pattern; a is the angle with respect to the axis of the specimen output 3.2.4 Optical detector Use a detector that is linear within 5 % over the range of intensity encountered A pinhole aperture ma be used to restrict the effective size of the detector in order to achieve increased resolution the detector or aperture size can be determined according to the angular resolution that is desired for the apparatus according to the formul BR (9) where D is the detector aperture diameter, in um; e is the desired angular resolution, in degrees o R is the distance from the sample output endface to the detector or aperture, in mm. A resolution of +0, 5 is typically used. R shall also meet the far-field requiremen R≥ R is the distance from the sample output endface to the detector or aperture in mm d is the diameter of the emitting region of the specimen, in_m n is the centre wavelength of the optical source, in nm Equation(5) gives the appropriate detector or aperture size for technique 3 Sampling and specimens 4. 1 Specimen length 4. specimen shall be a representative sample of fibre 2, 0 m +0, 2 m in length Prepare a flat end face orthogonal to the fibre axis, at the input and output ends of each specimen. The accuracy of these measurements is affected by a non-perpendicular endface End angles less than 2 are recommended Procedure 5.1 Place the specimen ends in the support devices. The input end shall be approximately at the centre of the input place of the focused image of the constant radiance spot 5.2 Set the optical source to the desired wavelength and spectral width 5.3 Scan the far-field radiation pattern along a diameter and record intensity versus angular position Calculations 6.1 Far field versus maximum theoretical value The relationship between the far-field numerical aperture and the maximum theoretical numerical aperture is dependent upon the measurement wavelength of the far-field and profile measurements Most far-field measurements are made at 850 nm, whereas profile measurements are commonly made at 540 nm or 633 nm. For these wavelengths, the relationshipbetween NAff and NAth is given by NAff= k NAth (11) where NAff is the na in the far field k=0, 95 when the profile measurement is made at 540 nm, and k=0, 96 when the measurement is made at 633 nm:
Test procedures Page: 4 of 5 Subject: Originated by: Wu Jia Measurement methods and test procedures – Numerical aperture 3.2.3.5 Recording system Provide means to record E(y), the detected intensity as a function of the scan position, y, and to correct the detected intensity as follows: I (θ) = E(y) cos θ (8) where I(θ) is the angular intensity distribution as detected by the angular scan lens; E(y) is the radiance at distance y from the axis of the spatial pattern; y is the distance from the axis to the spatial field pattern; θ is the angle with respect to the axis of the specimen output. 3.2.4 Optical detector Use a detector that is linear within 5 % over the range of intensity encountered. A pinhole aperture may be used to restrict the effective size of the detector in order to achieve increased resolution. The detector or aperture size can be determined according to the angular resolution that is desired for the apparatus according to the formula: where D is the detector aperture diameter, in µm; θ is the desired angular resolution, in degrees (°); R is the distance from the sample output endface to the detector or aperture, in mm. A resolution of ±0,5° is typically used. R shall also meet the far-field requirement: where R is the distance from the sample output endface to the detector or aperture, in mm; d is the diameter of the emitting region of the specimen, in _m; λ is the centre wavelength of the optical source, in nm. Equation (5) gives the appropriate detector or aperture size for technique 3. 4 Sampling and specimens 4.1 Specimen length The specimen shall be a representative sample of fibre 2,0 m ± 0,2 m in length. 4.2 Specimen end face Prepare a flat end face, orthogonal to the fibre axis, at the input and output ends of each specimen. The accuracy of these measurements is affected by a non-perpendicular endface. End angles less than 2° are recommended. 5 Procedure 5.1 Place the specimen ends in the support devices. The input end shall be approximately at the centre of the input place of the focused image of the constant radiance spot. 5.2 Set the optical source to the desired wavelength and spectral width. 5.3 Scan the far-field radiation pattern along a diameter and record intensity versus angular position. 6 Calculations 6.1 Far field versus maximum theoretical value The relationship between the far-field numerical aperture and the maximum theoretical numerical aperture is dependent upon the measurement wavelength of the far-field and profile measurements. Most far-field measurements are made at 850 nm, whereas profile measurements are commonly made at 540 nm or 633 nm. For these wavelengths, the relationshipbetween NAff and NAth is given by NAff = k NAth (11) where NAff is the NA in the far field; k = 0,95 when the profile measurement is made at 540 nm, and k = 0,96 when the measurement is made at 633 nm;
Test procedures of Measurement methods and test procedures Numerical aperture NAth is the maximum theoretical na. Report NAff at 850 nm as the fibre numerical aperture. This value may be obtained directly from a far- field measurement at 850 nm or using equation(11), indirectly from a profile measurement 6.2 Five per cent intensity angle, 0s Normalize the scanned pattern to the peak intensity Make note of the points on the pattern at which the intensity is 5 %of the maximum Record half the angle between these points as ee 6.3 Numerical aperture, NAff Calculate the far-field numerical aperture using the following formula NAf=sinθs (12) where NAff is the far-field numerical aperture; As is the 5 intensity angle Results 7. 1 Information to be provided with each measurement Report the following information with each measurement date and title of measurement identification of optical source wavelength, if other than 850 nm measurement results obtained from clause 8 7. 2 Information available upon request The following information shall be available upon request centre wavelength and spectral width of interference filters, if used detection system calibration and angular resolution erture of launch spot technique used to strip cladding modes
Test procedures Page: 5 of 5 Subject: Originated by: Wu Jia Measurement methods and test procedures – Numerical aperture NAth is the maximum theoretical NA. Report NAff at 850 nm as the fibre numerical aperture. This value may be obtained directly from a farfield measurement at 850 nm or using equation (11), indirectly from a profile measurement. 6.2 Five per cent intensity angle, θ5 Normalize the scanned pattern to the peak intensity. Make note of the points on the pattern at which the intensity is 5 % of the maximum. Record half the angle between these points as θ5. 6.3 Numerical aperture, NAff Calculate the far-field numerical aperture using the following formula: NAff = sin θ5 (12) where NAff is the far-field numerical aperture; θ5 is the 5 % intensity angle. 7 Results 7.1 Information to be provided with each measurement Report the following information with each measurement: – date and title of measurement; – identification of specimen; – optical source wavelength, if other than 850 nm; – measurement results obtained from clause 8. 7.2 Information available upon request The following information shall be available upon request: – centre wavelength and spectral width of interference filters, if used; – detection system technique used in 5.2; – detection system calibration and angular resolution; – size and numerical aperture of launch spot; – technique used to strip cladding modes. -END-
