2.1.

Motorized Badal Optometer

Optometers are used for measuring the refractive errors of the eye.²⁸ Where the myopic or hyperopic eye cannot see an object clearly, optometers compensate defocus by introducing a conjugate wavefront to the aberrant eye, thereby removing aberrations and improving vision. A schematic of a Badal optometer is shown in Fig. 1.

Fig. 1

Badal optometer, where $p$ is the position of the focus, f5 is the focal length of fixed lens, $d$ is the distance between the subject and the fixed lens. E is the eye. Defocus is induced by moving the lens L4.

The theoretical defocus introduced by the optometer is²⁸

Defocus is linearly dependent on the distance $\mathrm{\Delta }Z$ and can be controlled by changing the position of the lens L4. In the present work, we mounted lens L4 on a motorized stage and controlled it with the help of a program developed in LabVIEW. This motorized Badal optometer can generate a defocus ranging from $-4.3\mathrm{D}$ to $+4.3\mathrm{D}$. By adjusting the reference arm length and the distance between the subject’s eye and fixed ophthalmic lens (30 D, Volk Optical Inc., Mentor, Ohio), the galvanometer raster scanning mirror was conjugated with the eye’s pupil. Since the pupil was not artificially dilated and the images were not vignetted, pupil wander was kept to a practical minimum.

2.2.

Liquid Crystal Module

Hashimoto²⁹ and Tanabe et al.^30,31 showed the potential of LC devices for dynamic compensation of optical aberrations. In the present work, we used a transmissive LC device fabricated by Citizen Technology Center Co., Ltd., to correct for astigmatism.³¹ This LC module consists of four LC cells (A, B, C, D). Cells A and C were used for oblique astigmatism correction. As these devices are sensitive to the polarization state of the light, one cell was used to correct the horizontal polarization state, while the other corrected the vertical polarization state of the beam. Similarly, cells B and D were used for vertical astigmatism correction. The dimensions of the LC device are $9\mathrm{mm}\times 30\mathrm{mm}\times 38\mathrm{mm}$ ($\text{length}\times \text{width}\times \text{height}$). The optical loss of the four LC cells was $\sim 38\%$ at 840 nm, quantified with an Ophir broadband power meter. The thickness of the cell is 0.6 mm, and its flatness is $\sim \lambda /10$. Its aperture size is about 4.0 mm, and it can be operated in temperatures ranging from $-20°\mathrm{C}$ to 75°C.²⁹ Each of these LC cells was connected with a transparent electrode, to supply a specific driving voltage to each cell. These driving voltages are rectangular waveforms without an offset at 1-kHz frequency, and the magnitude of the waveform is proportional to the induced astigmatism. The required operating voltages for the LCs ranged between $1.5{\mathrm{V}}_{\mathrm{rms}}$ (root mean square) and $2.5{\mathrm{V}}_{\mathrm{rms}}$, which is less than 5 V, meaning that it can be run by the power supply of a personal computer without the need for an expensive high-voltage amplifier.

2.3.

Optimization Algorithm

In passive-auto-focusing technology, image quality parameters such as sharpness or contrast are used to optimize focusing instead of an external light source and sensor for distance measurements.³² Liu et al.³³ and Sun et al.³⁴ discussed several optimization algorithms and metrics for autofocusing. The present work is based on passive autofocusing technology, and we have coined it “image-based optimization.” We used two separate aberration-correction modules that both performed relatively slowly compared with high-speed DMs. We centered our approach on a sequential/coordinate search with a hill climbing algorithm.^{17–19,21,22,35–37} While this algorithm is not likely to perform as well and as efficiently as AO-dedicated algorithms such as the DONE algorithm,²⁵ the hill-climbing algorithm is easily implemented and can provide decent correction within a few iterations.³⁶ We combined the hill-climbing algorithm with a merit function that used the normalized variance (NV) of a B-scan as an image-quality-judgment metric. These NV values were fit with a Gaussian to determine the optimum correction. The NV of a B-scan can be defined as

The NV of a B-scan is resistive to noise fluctuations and generates a negligible number of local maximums, thereby avoiding the convergence to local maximums; it improves the convergence accuracy and speed of convergence.^33,34

Since the aberrations are treated here as independent Zernike modes, the correction was done in a sequential manner. In the initial step of aberration correction, defocus was corrected by using the OCT B-scan images for feedback and optimization, followed by vertical and oblique astigmatism correction.

2.4.

Experimental Setup

The experimental setup used in this work is shown in Fig. 2, where LS is a broadband light source (super luminescent diode SLD-371 from Superlum), with a central wavelength of 840 nm and an optical bandwidth of 51.5 nm [full width at half maximum (FWHM)], which can give a theoretical axial resolution of about $6.1\mu \mathrm{m}$ (in the air with $n=1$).

Fig. 2

Schematic of the developed OCT system with a 2.8-mm beam and defocus and astigmatism correction. The light source (LS) is connected to an optical isolator (AC Photonics), which prevents damage to the source by backreflection from the interferometer. After passing the isolator (IS), the light was fed into an $80:20$ coupler (CO, Gould Fiber Optics). 80% of the light was directed to the reference arm, and 20% was directed to the sample arm. The reference arm consisted of a 25-mm (L1) focal length lens for collimation and a 25-mm (L2) lens to focus the beam on the reference mirror (RM). The sample arm consisted of a collimator lens with a focal length of 13.86 mm (L3). The collimated beam was fed into the LC device (LC, Citizen Holdings), which was driven by four driving waves generated with two NI PCIe-6353 input-output (IO) boards, each connected to a BNC-2110 breakout box (both National Instruments). The output beam from the LC was raster scanned by the dual axis single mirror galvanometer scanner (GS, T.E.M. Japan), operated through LabVIEW. The output beam from the galvanometer scanner was directed toward the dichroic mirror (D). From there, the light was reflected toward the Badal optometer, which comprises a lens (L4) with focal length 30 mm mounted on a motorized translation stage and a fixed lens (L5) with 30 D optical power (Volk Optical Inc., Mentor, Ohio). The pupil-tracking camera (PTC) was used to position the beam onto the sample. The backreflected light from the sample and reference arm combined at the coupler and generated an interference signal. This signal was spectrally dispersed by the grating in the spectrometer and detected with the line-scan camera (Basler SPL2048). The detected signal was grabbed with a frame grabber (NI PCIe-1433, National Instruments). When the aberration correction module was switched on, the LabVIEW program controlled the motorized linear translation stage (Z812B-MT1/M-Z8, Thorlabs) through a translation stage motor driver (TSMD). Defocus was introduced by changing the position of lens L4. The image-based optimization algorithm searched for the highest NV values. After correcting defocus, the LC was used to correct vertical and oblique astigmatisms.

2.5.

Measurement Procedure on Humans

A protocol for measurements on human subjects was approved by the Institutional Review Board of Utsunomiya University, and it adhered to the tenets of the declaration of Helsinki. Measurements were performed on one human subject. The eyes of the subject were not dilated. The power of the light incident on the eye was at all times lower than $600\mu \mathrm{W}$, a power that is considered safe according to the safety standards up to a time period of 8 h or more.

3.1.

Calibration of the Wavefront Aberration Correctors

To generate conjugate defocus and astigmatism values, we need to know the aberrations that can be compensated with the Badal optometer and the LC device. The Badal optometer and LC device were calibrated with the help of an SH wavefront sensor (WFS150-5C, Thorlabs). For calibration, the SH wavefront sensor was mounted in the sample arm in close proximity to the ophthalmic lens (L5) (see setup in Fig. 2). The dual-axis single mirror galvanometer scanner was kept stationary. When the Badal optometer was calibrated, the LC device was not used and vice versa.

By changing the position of lens (L4) (see setup in Fig. 2), we measured the defocus values with help of the SH wavefront sensor. The traveling length of the translation stage is about 12 mm, and at 6 mm the defocus was set to 0 D. The measured defocus values were plotted as a function of lens position, as shown in Fig. 3. The compensation range of the Badal optometer was $-4.3\mathrm{D}$ to $+4.3\mathrm{D}$. One can enhance this range by choosing a translation stage with a wider range. Similarly, the compensation range of the LC device for vertical astigmatism and oblique astigmatism was tested with various voltages (Fig. 4).

Fig. 3

The induced defocus as a function of the position of the Badal lens in the Badal optometer. The Badal lens position is shown on the horizontal axis, and the vertical axis shows the defocus values. The Badal optometer covered a defocus range from $-4.3\mathrm{D}$ to $+4.3\mathrm{D}$.

Fig. 4

(a) Vertical astigmatism and (b) oblique astigmatism measured with an SH wavefront sensor as a function of input voltage. The LC device could generate vertical astigmatism ranging from $-2.5\mathrm{D}$ to $+2.5\mathrm{D}$ and an oblique astigmatism ranging from $-2.5\mathrm{D}$ to $+2.5\mathrm{D}$.

Figures 4(a) and 4(b) show the graphs of vertical and oblique astigmatism values generated by the LC device as a function of the ${\mathrm{V}}_{\mathrm{rms}}$ voltage, respectively. The LC can generate $-2.5\mathrm{D}$ to $+2.5\mathrm{D}$ of correction for both the vertical and oblique astigmatism channels. These values were later used to optimize correction of astigmatism in sensorless mode and when the instrument was used on a human subject with a prescription.

The time response of the LC device was measured with the SH wavefront sensor as well, and it took more than 20 s to achieve a stable correction for a correction of 2 D (Fig. 5).

3.2.

Resolution and Contrast Improvement Quantification

The diffraction-limited performance of the imaging system was tested with a US Air Force resolution test chart. In the sample arm, we introduced $-1\mathrm{D}$ of defocus and $+1\mathrm{D}$ of vertical astigmatism and $-1\mathrm{D}$ of oblique astigmatism. These aberrations were corrected automatically with the sensorless correction, maximizing the NV value. It took 1 min 9 s to finish the aberration correction, but since the amount of correction per step was smaller than the correction shown in Fig. 5, it was not necessary to wait for 20 s for each astigmatism correction step.

Fig. 5

The induced astigmatism power as a function of LC device response time. Most of the correction is achieved over the first 10 s, but it took more than 20 s to achieve a stable correction.

Figure 6 shows the en face images generated before and after correction of each aberration correction. These en-face images were generated by summing the backreflected intensity data. The theoretical diffraction-limited lateral resolution of the present system is $10\mu \mathrm{m}$. At this resolution, the fifth group fifth element of the Air Force target should be resolvable.

Fig. 6

(a) En-face image of the Air Force target before aberration correction. (b) The same image after defocus correction, (c) after vertical astigmatism correction, and (d) after oblique astigmatism correction.

After correction of every aberration, the lateral resolution of the system increases and ultimately reaches the diffraction-limited resolution (Fig. 7). Figure 7(b) shows the intensity profile of the fifth group fifth element of a USAF resolution test target data that is segmented along the vertical direction marked with a red color line in Fig. 7(a) and normalized with their corresponding mean value.

Fig. 7

(a) En-face image of the Air Force target’s fifth group fifth element profile before aberration correction, after defocus correction, after vertical astigmatism correction, and after oblique astigmatism correction. (b) Intensity profiles across the fifth group fifth element before aberration correction, after defocus correction, after vertical astigmatism correction, and after oblique astigmatism correction.

In an ideal system, when the diffraction-limited resolution condition is met, the intensity profile across these line bars should generate a square wave shape. In Fig. 7(b), one can observe that these lines are difficult to resolve before correction, but after aberration correction these lines are easily resolvable, demonstrating a near-diffraction-limited performance.

The intensity improvement and contrast improvement before and after aberration correction were quantified for different spatial frequencies, using the resolution test chart. Measurements were plotted in Fig. 8. In these plots, the maximum intensity across the fifth group first element to fifth group fifth element [these elements were shown in Figs. 6(a) and 6(d)] are plotted in Fig. 8(a). In Fig. 8(a), the vertical axis represents the maximum intensity (in arbitrary units) and the horizontal axis represents the spatial frequency in terms line pairs per mm ($\mathrm{lp}/\mathrm{mm}$), similar to Fig. 8(b). At the cut-off (diffraction-limited) resolution/spatial frequency after aberration correction, the maximum intensity improvement is 1.78 times. This shows that the intensity is good after the aberration correction, which helps to generate brighter OCT images. In Fig. 8(b), the vertical axis represents the contrast, and the horizontal axis represents the spatial frequency in terms line pairs per mm ($\mathrm{lp}/\mathrm{mm}$). At the cut-off (diffraction-limited) resolution, the contrast after final aberration is higher than the contrast before aberration correction. This is marked in the figure with a pink color arrow mark. The contrast values at a cut-off resolution of $10\mu \mathrm{m}$ or 50.2 line pairs per mm ($\mathrm{lp}/\mathrm{mm}$) are 0.05 before correction and 0.33 after correction, resulting in a contrast improvement of 6.9 times. This demonstrates that the visibility is better after the aberration correction, which helps to distinguish small features in OCT images.

Fig. 8

(a) Maximum intensity across the spatial frequencies for before and after aberration correction. The vertical axis represents the maximum intensity (in arbitrary units) and horizontal axis represents the spatial frequency in terms line pair per mm. (b) Contrast across the different spatial frequencies before and after final aberration correction. The vertical axis represents the contrast (in arbitrary units), and the horizontal axis represents the spatial frequency in terms line pair per mm. The pink color arrow line marks the cut-off resolution to show the separation of contrasts before and after correction of aberrations.

3.3.

Dynamic Range Quantification

A model eye with a defocus of $-1\mathrm{D}$ was used for quantification of the dynamic range. A thin black paper sheet, supported by a flat aluminum plate, was used at the position of the retina in the model eye. B-scan images of the model eye with the 1.3-mm beam and 2.8-mm beam diameter systems are presented in Fig. 9, which shows the results before and after correction of relevant aberrations. The measured SNR gain that is achieved with the 2.8-mm beam diameter system compared with the 1.3-mm beam diameter system is 3.7 dB.

Fig. 9

(a) B-scan image of the model eye taken with 1.3-mm beam diameter OCT system ($\mathrm{SNR}=48.6\mathrm{dB}$). B-scan image of the model eye taken with the 2.8-mm beam diameter system (b) before aberration correction and (c) after aberrations correction ($\mathrm{SNR}=52.3\mathrm{dB}$).

3.4.

Human Eye Imaging

The present system is equipped for sensorless correction, but due to the slow response time of the LC device (Fig. 5), the correction time is too long for the imaging of human subjects. Even if the subject has a good fixation and does not blink often, the quality of the retinal images can drop significantly over 1 min, which can affect the NV in the images. However, the 2.8-mm system can also be used without sensorless operation if the refractive error values of the human eye are known. Once we set these values in the system, the desired conjugate aberration values can be generated to compensate for aberrations. In this section, OCT images taken with the 2.8-mm system of the human retina are compared with OCT images taken with the 1.3-mm beam diameter OCT system.

The right eye of the human subject was checked by a licensed optometrist, resulting in a prescription of $-1.5\mathrm{D}$ defocus and $-1.5\mathrm{D}$ cylinder (vertical astigmatism at 180 deg). The retina was imaged with a conventional system with a 1.3-mm beam diameter ($1/{\mathrm{e}}^2$) with defocus correction and the new system with a 2.8-mm beam ($1/{\mathrm{e}}^2$). Here, the prescribed defocus and vertical astigmatism values were converted using data from Figs. 3 and 4. The lens position and liquid crystal lens voltage values were set with the help of the LabVIEW program. In Fig. 10, aberration-corrected B-scan images obtained over 5 deg (a) and 10 deg (b) are shown. The left sides of these images were generated with the 1.3-mm beam diameter, while the right sides were made with a 2.8-mm beam diameter. The inserts on the right show the 2.8-mm beam diameter B-scan images before aberration correction. Due to the prescription of this subject, the images are faint without correction. Since speckle analysis requires a signal that is well above the noise floor for autocorrelation,³⁸ speckle analysis was only performed on the B-scan images of the human eye taken after correction with the new 2.8-mm system and a conventional 1.3-mm beam diameter OCT system. The areas that were used for comparison are highlighted with yellow (1) and red color (2) boxes [Fig. 10(a)]. The speckle profiles are plotted in Fig. 11 and show an improvement in speckle width of approximately two times for the 2.8-mm system. Ten B-scans were analyzed to measure the mean speckle diameter and its standard deviation. The average FWHM of the speckle diameter with the 1.3-mm beam diameter OCT system is $22.3\pm 4.3\mu \mathrm{m}$. For the 2.8-mm beam diameter system, it is $11.5\pm 1.2\mu \mathrm{m}$ (Table 2).

Fig. 10

B-scan images of the human retina. The left side of each image was taken with a standard OCT system with a 1.3-mm beam diameter, and the right side image was taken with the new system and a 2.8-mm beam diameter after correction of the aberrations (the inserts show images before aberration correction with the 2.8-mm system). Half of the image of 5-deg-wide scans (a) and 10-deg-wide scans (b) are shown. In (a), the yellow (1) and red (2) color highlighted areas are used for speckle analysis, to determine the width of the speckle pattern Moreover, areas enclosed by dotted boxes [1.3-mm beam diameter, green (3); 2.8-mm system, blue (4,5)] were used for quantification of the retinal layer intensities. More light seems to return from some of the nuclear layers, in comparison to the images taken with the 1.3-mm system. This may be due to collecting light over a larger angle.

Fig. 11

The autocorrelation plot of the 1.3-mm beam diameter OCT system with an FWHM speckle width of $22.3\mu \mathrm{m}$ and the plot of the 2.8-mm beam diameter system after aberration correction with an FWHM speckle width of $11.5\mu \mathrm{m}$.

The theoretical diffraction limited airy discs have a diameter of $21.6\mu \mathrm{m}$ (FWHM) for a 1.3-mm beam ($1/{\mathrm{e}}^2$) and $10\mu \mathrm{m}$ (FWHM) for a 2.8-mm beam ($1/{\mathrm{e}}^2$). The measured values are consistent with the theoretical values. The measured speckle sizes show that the speckle FWHM diameter with the presented system is $\sim 2$ times smaller than the 1.3-mm beam diameter system, giving a better image quality (Fig. 10).

The mean of the intensity occurring in the layers obtained with both the 1.3-mm and 2.8-mm systems was quantified and presented in Table 3. All B-scan images were generated with the same imaging parameters. The areas of interest are shown in Fig. 10 with dotted boxes colored green (3) for the 1.3-mm beam size system and blue (4, 5) for the 2.8-mm beam size system. Here, the maximum intensity would be represented by a value of 256, while the noise floor would be close to a value of 0. An overview of the measurements is given in Table 3.

Table 2

Theoretical and measured speckle diameters.

Table 3

Reflected intensity for different beam sizes and scanning widths.

These measurements confirm that the 2.8-mm system collects more photons from the sample, which results in a higher intensity than the intensity obtained with the 1.3-mm system.