The 2D flow data were acquired through the 93 pressure taps, connected to the pressure scanner through four adapters. The pressure measurements at the leading and trailing edges were split into two channels for redundancy. The pressure scanner was also used to acquire the total and static pressure in the wind tunnel. In static cases, a wake rake is used to quantify the loss of momentum in the wake. This comprises 67 pressure tubes and 16 static tubes over a length of 504 mm. The pressure rake automatically centers the wake and traverses along the spanwise direction for each acquisition to average potential 3D flow effects. When the rake can no longer capture the airfoil's turbulent wake, pressure drag is used instead. Data are sampled at a frequency of 5 Hz. A 2 mm gap is found between the wind tunnel walls and the wing on each side. The gaps were sealed with tape during the static measurements in order to minimize the loss of momentum from the lower aperture, through which the pressure tubes exit, and the 3D finite wing effects.

The airfoil section is rotated using the wind tunnel turntable for the static polar acquisition around its quarter-chord line. The static polars are acquired for angles of attack of -20°<α<20°. Local refinements are carried out to characterize the stall region and the design lift-to-drag ratio. The static experiment is carried out for 5×105<Rec<3.5×106. Therefore, the equivalent Mach number for the highest Reynolds number case is evaluated as M=0.25, and compressibility effects can be assumed negligible in the analysis. To avoid any impurities on the airfoil's surface, which may lead to early boundary layer transition, the model was regularly cleaned to guarantee a clean, dust-free surface.

The lower pressure distribution Cp,l and upper pressure distributions Cp,u, obtained from the pressure taps on the airfoil's surface, are integrated to determine the normal coefficient (Eq. ), where the prime indicates, here and in the following, uncorrected values. c is the airfoil chord. 1Cn′=∫01Cp,l-Cp,udxc The drag coefficient is obtained through the wake rake pressure readings according to Eq. (), where Cp,t is the total pressure and Cp,s refers to the static pressure 2Cd′=2c∫wake Cp,t-Cp,s1-Cp,tdy The normal and drag coefficients and the angle of attack (α) are used to quantify the 2D lift in Eq. (). 3Cn′=Cl′cos⁡(α)+Cdsin⁡(α)Cl′=Cn′cos⁡(α)-Cd′tan⁡(α)

The wing model's shaft was connected to a UniMotion PNCE 40 BS 1610 linear actuator for dynamic testing purposes. The actuator's extrusion is connected to the airfoil's steel shaft to couple the linear and pitching motions, and its extrusion is controlled through a LabVIEW script. An angular encoder is coupled to the airfoil's shaft, providing the real-time angle of attack reading. More details regarding the setup can be found in . Data are sampled from the wing's pressure taps with the same methodology described in the previous section, with a frequency of 300 Hz. The dynamic polars were acquired by pitching the airfoil section around its quarter-chord line. Due to the aerodynamic loads acting on the airfoil model, airfoil pitching system and its connection, the setup experienced some aeroelastic response. To cope with this, the actuator calibration (linking the actuator motion to the airfoil angle of attack) was performed independently for different Reynolds numbers to guarantee accurate angles of attack.

A representative yet simplified oscillation case for a wind turbine airfoil is defined by a simple sinusoidal motion, described in Eq. () as 4α(t)=α0+Asin⁡(2πft), where α0 is the initial mean angle of attack, A is the oscillating amplitude and f is the oscillating frequency in hertz. The actuator was controlled through a LabVIEW program.

The frequency from Eq. () also sets the reduced frequency, k, which is defined here as 5k=πcfU∞, where c is the airfoil's chord, and U∞ is the free-stream velocity. This non-dimensional parameter describes the degree of unsteadiness in oscillation. Three separate unsteady regimes are identified in . The flow field can be considered unsteady for 0.05≤k≤0.2 and highly unsteady for k≥0.2. Below 0.05, the unsteady effects may be assumed negligible, and, therefore, the corresponding flow regime is commonly referred to as quasi-steady. To capture the three unsteady flow regimes, a comprehensive span of Reynolds numbers and reduced frequencies is acquired around the negative and positive stall regions and the linear region of the polars. Together with the local pressure on the airfoil, the atmospheric and operational conditions were recorded through the wind tunnel measurement devices, highlighting a variation in the instantaneous free-stream readings due to the changing blockage in the wind tunnel. Data were acquired for 50 sinusoidal cycles.

The static raw pressure data are corrected using the wall-effect correction approach defined in . This approach corrects for lift interference, wake blockage, solid blockage, and streamline curvature. Here, the uncorrected drag is used to correct for wake blockage, directly affecting the corrected lift coefficient. The wake blockage is defined in Eq. () as 6wb=CD0.25hc1+0.4M2β2, where M is the Mach number, and the compressibility factor is defined as β=1-M′2. The wind tunnel blockage factor, σ, is defined as 7σ=π248ch2. The angle of attack is corrected using Eq. (): 8α=α′+57.3σ2πβ(Cl′+4Cm′).

Due to the dynamic oscillations, retrieving drag readings from the wake rake became unreliable. As the drag coefficient is used to obtain the lift coefficient, it is not possible to convert normal and tangential coefficients to the lift coefficient.

An initial delay and amplitude loss are found between the pressure sampled at the skin of the airfoil and at the end of the pressure tubes. Considering the pressure tube length, width and testing conditions, the pressure lag and attenuation are handled in the post-processing using the correction method from . The method was coded in the software tool PreMeSys v2.0, which was validated in for dynamic airfoil testing. The corrected pressure values are then translated into instantaneous forces on the airfoil by means of integration.

While a methodology concerning aerodynamic (static) corrections for the presence of the wind tunnel walls had been validated, evidence of dynamic wall corrections are yet to be found in the literature. Therefore, previous literature, such as and , displayed the dynamic polars in an uncorrected manner. To quantify the potential effect of reporting uncorrected dynamic data rather than corrected dynamic data, Fig.  is provided. This figure shows the differences between the corrected, uncorrected and a partially corrected static lift polar for Rec=106. There is good agreement between the fully and partially corrected data regarding the location and value of CLmax and pre-stall slope. However, after the stall angle is reached, the effects of wake blockage become predominant in the corrections, with the partially corrected data diverging from the fully corrected data as the angle of attack increases and accounting for almost 50 % at α=20°. However, as the correction approach is not proven, it was decided not to correct the data for wall effects and report uncorrected data only.

When testing the tape sealing dynamically, the 2 mm gap between the airfoil walls and the wind tunnel was removed. This introduces 3D finite wing effects and allows flow to exit the tunnel through the (small) gap on the lower side of the wind tunnel. At low angles of attack, the airfoil cross-section fully or partially covers the gap, limiting the loss of momentum. However, as the angle of attack increases, the gap is more exposed to the free-stream flow. The loss of momentum through the wind tunnel aperture was determined for the linear region of polars. The effect of the sealing tape was quantified for three static cases, for Rec=5×105, 1.5×106 and 2.5×106, of which one is shown for clarity in Fig. . To quantify the effect, the linear slope (defined between -6°<α<6°) is reported in Table . The results show minor effects, with the difference in the pre-stall slope decreasing with increasing Reynolds numbers. This is due to the higher flow inertia that, for higher free-stream velocities, allows the suction of the wind tunnel cavity to be overcome. As the static stall angles are approached, the loss of momentum becomes more evident for low Reynolds numbers while still showing similar stall trends across all cases. While the differences are within a reasonable range, it is believed that no additional correction is needed.

The results shown in Fig. a–c show the isolated Reynolds number effects on the dynamic normal coefficient for the same reduced frequency. To obtain a constant value of k for the tested Reynolds numbers, a representative oscillating frequency is selected. Three mean angles are chosen as the center of the sinusoidal oscillation in the linear, positive and negative regions of the polars. It was only possible to test one reduced frequency for all Reynolds numbers due to setup limitations, corresponding to a value of k=0.091, as seen in Table . The negative region of the polars is shown in Fig. a, where the Reynolds number is found to affect the negative stall behavior, following the same trend as the positive region of the polars in Fig. c. The trends align with the static data results, where the lowest Reynolds number corresponds to the highest forces. Unlike Fig. a, the reattachment behavior is found to be mostly independent of the Reynolds number for the negative region of the polars.

In the linear region, the Reynolds number barely affects the slope and force magnitude, with all cases showing similar values in both the nose-up and the nose-down motions. The hysteresis loop displays the same difference in nose-up and nose-down behavior.

In the positive regime, higher loads are observed for the lowest Reynolds number, in line with the static results shown in Fig. . The flow reattachment behavior during the nose-down motion is found to exhibit significant differences, where for Rec=5×105 and 2×106, the behavior appears smooth and gradual. For Rec=106, strong reattachment is observed in the data, with an accelerated reattachment behavior as the airfoil oscillates back into the linear region. As for the static case, for the FFA-W3-211 airfoil, dynamic experiments of Rec=2×106 or above are recommended to better capture the physical trends relevant for larger wind turbine blades.

Together with the Reynolds number, the reduced frequency directly affects the airfoil performance. Given the low Mach number, it is possible to combine the effects of k by varying the oscillating frequency, described in Eq. (), and Reynolds number. This value falls in the unsteady regime according to .

The results are shown in Fig. . Firstly, reattachment in the downstroke movement in Fig. c exhibits different magnitudes and behaviors as a result of different reduced frequencies. Figure a–c showcase the isolated effects of the Reynolds number, which only affected the dynamic polars in the negative and positive stall and reattachment behavior. Therefore, the significant stall delay and higher magnitude shown in Fig. a–c can be attributed to changing values of k.

For the lowest Reynolds number and frequency, the reattachment is quite linear. As both parameters double, the initial reattachment is faster, with a strong and sudden decrease in loads. In the negative region of the polars, the unsteady effects are visible in the lower minimum normal coefficient attained at higher Reynolds numbers, where higher reduced frequencies are responsible for larger force differences in the nose-down and nose-up motions. The mechanisms that describe the boundary layer attachment are a function of the variation in leading-edge suction peak and trailing-edge stall evolution. This is due to the higher inertia introduced in the system, at which the reduced frequency decreases with decreasing free-stream velocity. The normal coefficient magnitude decreases with increasing Reynolds numbers and reduced frequencies to the point where, for highly unsteady reduced frequencies, separation does not take place for angles of attack as high as α=16.6°. The linear region of the polars shows minor differences in magnitude. A difference in slope is found as both parameters are varied, in agreement with previous literature . The linear-region slope is found to increase with decreasing reduced frequencies, independently of the Reynolds number, as shown in the previous section of the paper. Lastly, the negative region of the polars showcases two different reattachment regimes. Here, similarly to the positive region, the highest reduced frequencies keep the boundary layer attached at lower angles of attack. At the end of the oscillation, dynamic stall occurs abruptly, leading to a drastic increase in normal coefficient and a rapid reattachment mechanism, significantly faster than the equivalent at lower reduced frequencies.

The effects of varying the oscillating frequency are shown in Figs. , and , divided by the same mean angle and Reynolds number. The lowest frequency displays a significantly faster reattachment behavior for all cases tested. For the lowest reduced frequency of k=0.023, the flow can be considered quasi-steady , implying that the flow remains attached for slightly more than its static equivalent case. The peak normal coefficient for the positive mean angles is delayed by a few degrees and displays a higher magnitude than the static equivalent, with the value increasing with k for all Reynolds numbers. At the highest reduced frequencies, registered for Rec=5×105, the difference in maximum normal coefficient decreases as the boundary layer remains attached for longer during the upstroke motion. For k=0.182,0.273 and 0.365, no boundary layer separation is observed in the upstroke motion, which reaches α=17.6°. The only case to display separation is at k=0.091, where dynamic stall is observed at α≈15°.

Reattachment behavior for the mean positive angle shows good consistency within the same Reynolds number sweep. Both Rec=106 and Rec=2×106 display the same trend where reattachment is fastest at the lowest reduced frequencies. As the reduced frequency increases, the flow remains detached from the airfoil for longer, leading to a higher loss of normal coefficient. Here, for the highest-reduced-frequency case, the shape of the hysteresis loop almost resembles the one found in the linear region, where the upstroke and downstroke motions showcase greatly different force magnitudes. In general, all reduced frequencies do not converge back to the original linear-region slope found at the beginning of the upstroke oscillation, unlike other cases shown in Figs.  and . Due to the higher reduced frequencies obtained from the same oscillating frequency value combined with a lower free stream, Rec=5×105 displays a more unsteady reattachment behavior.

Finally, the oscillating frequency is found to influence the linear-region slope. Here, a Reynolds number dependency is also observed, for which the upstroke and downstroke difference in the time-averaged normal coefficient exhibits fewer differences as the Reynolds number increases. Following the conclusions of some high-Reynolds-number literature , it is expected that the thinner boundary layer will progressively reduce the upstroke and downstroke difference in pressure distribution.

The results in Fig.  display the effects of the oscillating amplitude for a Reynolds number of Rec=106. While pitching the airfoil around the same mean angle, it is immediately visible how, for the positive and negative regions of the polars, the dynamic loop shape is similar between all cases and changes linearly with the angle of attack. For the linear-region case, the highest oscillations can already capture the effects of dynamic stall in the lower regime, showing a difference in normal coefficient for the same angle of attack. This is particularly visible for the A=11° case, where the oscillation is large enough to capture the dynamic stall cycle. As expected, there are differences between the positive and negative regions of the polars due to the airfoil's camber. Due to the cambered nature of the FFA-W3-211 airfoil, a larger dynamic stall loop is associated with the negative region of the polars where the convergence to the linear region is slow and displays greater discrepancies in the force magnitude. One example is the flow reattachment behavior, which is observed to be linear in the negative region, while this exhibits a force increase in the positive region.