2.1. Actuation unit and sensing

The low-power actuation unit includes a compact 30 W brushless motor (EC45 flat, Maxon Motor®) equipped with an incremental encoder (2048 cpr, MILE) and followed by a 30:1 Harmonic Drive® (HFUC-11-2A-30). An overrunning clutch has been embedded in the reducer output shaft to allow free rotation in only one direction. A 1:1 nylon gear coupling transfers the motion from the motor shaft to the camshaft (link $ {\mathrm{O}}_1A $ in Figure 3), delivering up to 4.5 Nm peak torque to the camshaft neglecting the efficiency losses introduced by the gears. The angular position of the camshaft $ {\theta}_{cam} $ is measured by a 13-bit absolute encoder (RMB20 OnAxis™, RLS-Renishaw®). The actuator is interfaced with the forefoot and the pyramid adapter’s housing. A monoaxial load cell assembly in the upper constraint (8417-6001, Burster®) measures the force exchange in the sagittal plane between the leaf spring of the ESAR foot and the actuator (Figure 2(b)). The load transmitted to the load cell is reduced by a factor of 1.93. An under-constrained differential mechanism connecting the actuation unit to the ESAR foot (Figure 2(c)) ensures the prosthesis’ safety and essential mobility functions when the motor is turned off. The differential system is designed to (i) compensate for the horizontal misalignment between the motion of the end-effector and the shape of the forefoot when the structure of the ESAR foot is deformed, (ii) to even the interaction forces between the two sides of the bottom plate of the prosthetic foot to improve lateral stability, and thanks to the self-folding feature of the differential mechanism (iii) to avoid overloading the actuator end-effector when compression forces are applied during stance.

Figure 3. Mechanical assembly of the WRL TTP. (a) Segments of the four-bar linkage O₁-A-C-B. (b) Camshaft trajectory with the two instability points of the mechanism I1 and I2. (c) End-effector trajectory. Bold letters correspond to fixed points.

The WRL TTP can monitor the orientation of the limb segments using three Inertial Measurement Units (IMUs). One IMU is embedded in the main electronic board, monitoring the orientation of the shank (iNemo, LSM9DS1, STMicroelectronics), and the other two are wired and placed on the rear of the foot and the thigh of the user (MPU9250, TDK/InvenSense Inc.). The bottom plate of the foot is equipped with 16 wired pressure-sensitive elements based on optoelectronic technology (Fiumalbi et al., Reference Fiumalbi, Martini, Papapicco, Agnello, Mazzarini, Baldoni, Gruppioni, Crea and Vitiello2022), embedded in scalable sets of PCB matrices. The placement of the sensors follows the most stressed plantar areas, namely the heel and forefoot regions, to improve the detection of gait events such as foot contact and foot off. Threshold-based algorithms use the information from the pressure-sensitive elements to provide online estimates of the center of pressure ( $ \mathrm{CoP} $ ) progression and the vertical ground reaction force ( $ \mathrm{vGRF} $ ). Detailed information can be found in Fiumalbi et al. (Reference Fiumalbi, Martini, Papapicco, Agnello, Mazzarini, Baldoni, Gruppioni, Crea and Vitiello2022). Signals from pressure-sensitive elements are collected by the sensorized foot control board that interfaces with the main electronic board. The WRL TTP system weighs 2745 g: 665 g for the commercial ESAR prosthesis (foot cosmesis included), 630 g for the actuation unit, 550 g for the electronics and the sensory system, 500 g for the carter and the covers, and 400 g for the battery.

2.2. Parallel elastic actuation principle

In this implementation, the parallel elastic actuation paradigm (Fantozzi et al., Reference Fantozzi, Baldoni, Crea and Vitiello2018) allows both the user and the motor to compress the elastic structure of the passive foot. Hence, whenever the user loads the prosthesis, the leaf spring structure of the foot is bent. The actuator is designed to further compress the ESAR foot to increase its load and dorsiflexion, augmenting its energy storage capability. The elastic energy stored in the ESAR foot is retained by a four-bar linkage, defined by the points $ {O}_1 $ - $ \mathrm{A} $ - $ \mathrm{C} $ - $ \mathrm{B} $ (Figure 3(a)). The base of the four-bar linkage is the link $ {O}_1B $ , fixed to the frame. By moving the link $ AC $ , the linkage provides a cyclic approximate linear motion of the end-effector $ D $ (Figure 3(c)), connected to the forefoot portion of the prosthesis, leading its vertical displacement along a complete cycle of the camshaft (Hoeckens linkage (Lu et al., Reference Lu, Zlatanov, Ding and Molfino2014)). The linkage shows two instability points, $ I1 $ and $ I2 $ (Figure 3(b)), which divide the motion of the end effector $ D $ of the four-bar mechanism into two regions: from $ I^{\prime }1 $ to $ I^{\prime }2 $ (corresponding to the points $ I1 $ and $ I2 $ in the camshaft trajectory) the mechanism stores and retains the energy, whereas from $ I^{\prime }2 $ to $ I^{\prime }1 $ the energy is rapidly returned. This behaviour is ensured by the overrunning clutch positioned in the motor shaft. The camshaft angle ( $ {\theta}_{cam} $ ) is set to 0 when the camshaft coincides with the instability point $ I1 $ . The instability point $ I2 $ is reached when the camshaft angle is between 200 and 215 deg. Whenever the instability point $ I2 $ of the linkage is crossed (flipover event), the overrunning clutch allows the mechanism to move freely up to the instability point $ I1 $ , thus enabling the release of the stored energy. Alternatively, if $ I2 $ is not reached, the motor unloads the structure by bringing back the linkage at a controlled velocity up to the instability point $ I1 $ (blue arrow in Figure 3(b)). The linkage is brought back by driving the motor at negative velocities (motor shaft rotating counterclockwise and camshaft in the opposite direction).

A kinematic model was developed to estimate (i) the dorsiflexion angle ( $ {\unicode{x03B8}}_{\mathrm{ankle}} $ in Figure 3) and (ii) the displacement $ \delta $ of the end-effector $ D $ from its lowest position $ {D}_0 $ . These variables are used as input to a kinetic model to provide an estimate of the energy stored in the prosthesis. Additional information can be found in the Supplementary Material.

For any given force applied at the end-effector $ D $ , the resulting torque magnitude and direction at the camshaft $ {O}_1A $ depends on the four-bar linkage geometrical configuration provided by the camshaft angle. In particular, the torque direction reverses at every flipover (Figure 4). The motor’s active deformation is meant to work in synergy with the loading action exerted by the user. Moreover, if the motor is driven at constant maximum velocity, the amount of deformation that the actuator can provide to the elastic structure of the foot depends on the time interval in which the motor can effectively engage the clutch to inject energy into the foot. This time window spans between the foot-flat and the push-off phases (loading phase), lasting about 40% of the stride phase. During this time window, the motor injects into the system the energy required to move the camshaft over $ I2 $ , starting from the position in which the camshaft is brought by the sole loading action of the user (red arrow in Figure 3(b)).

Figure 4. The assistive actuation concept is shown during stance. The arrows indicate the inversion of torque during the energy release at push-off. The yellow arrows are relative to the amputee’s loading action, while the light grey arrows are relative to the actuation’s loading action.

Since the actuator is meant to be engaged only in a small time window of the gait cycle, the motor shaft rotational velocity was the main specification that has been considered in the choice of the motor and the reducer. Thanks to the free motion of the overrunning clutch during the energy return phase at push-off, it is possible to avoid high-velocity requirements of the motor. The energy return is in fact unhindered from the actuator action due to the decoupling between the clutch and the motor shaft. Therefore, the maximum rotational velocity of the motor is a constraint only during the loading phase. Indeed, the motor must rotate the camshaft $ {O}_1A $ of about 205 degrees in 40% of the gait cycle duration ( $ {\tau}_{stride} $ ), to allow the end-effector $ D $ to span the range from $ I1 $ to $ I2 $ . By considering a $ {\tau}_{stride} $ of one second, the velocity limit for the actuator in the loading phase was computed as:

(1) $$ {\dot{\theta}}_{O_1A}\ge \frac{205\;\deg }{0.4\cdotp {\unicode{x03C4}}_{\mathrm{stride}}}=512.5\hskip1.5pt \deg /\mathrm{s}\cong 85\;\mathrm{rpm}. $$

The system is designed to comply with different users and stiffnesses of the embedded ESAR foot. Notably, the geometry of the linkage can be manually regulated to adapt to the deformation profiles: the position of point $ B $ of the linkage can be adjusted between $ {B}_{min} $ and $ {B}_{max} $ along a circular arc guide (yellow arc in Figure 3) by a screw mechanism, hence changing the stroke of the $ {O}_1B $ link. The implemented regulation (hereafter called stroke regulation) modifies the maximum vertical displacement of the end-effector trajectory while keeping approximatively at a fixed position the lowest point ( $ {D}_0 $ ), similarly to how a variable-stroke engine operates.

The actuation assembly allows the substitution of the camshaft gear to reduce the length $ {O}_1A $ and therefore to shift the position of $ I2 $ . In this case, the modified geometry of the transmission reduces the maximum vertical displacement of the end-effector, and it can be used to adapt the actuation unit to reduced deformation profiles, as in the case of high-stiffness ESAR feet or lightweight subjects (Sawers and Hahn, Reference Sawers and Hahn2011). Hence, the presented system shows the possibility to be conveniently modified since the geometry of the actuator can be changed functionally to the available mechanical power and stiffness profile of the foot.

2.3. Electronics and control architecture

The WRL TTP is controlled by a real-time National Instruments SbRIO-9651 System on Module (SOM), equipped with a real-time processor Xilinx Zynq-7020 with dedicated FPGA. An IEEE 802.11 connection allows remote monitoring and control parameters setting via a graphical user interface (GUI). The prosthesis is powered by a 24 V battery pack (a series of 6 cells of Panasonic NCR18650PF) with an integrated Battery Management System that can guarantee more than two hours of continuous operation. The motor is driven by an Elmo Gold Twitter, with a limited current range equal to [−2 A, 2 A]. Its current supply can be interrupted by acting on an external emergency button in case of adverse events.

The control architecture of the prosthesis is developed in three main layers (Figure 5), following the generalized framework developed in most current wearable robotic devices (Tucker et al., Reference Tucker, Olivier, Pagel, Bleuler, Bouri and Lambercy2015). The high-level layer and middle-level layer run on the SOM real-time processor at 100 Hz, while the low-level layer runs at 1 kHz on the SOM FPGA.

1. 1) High-level control layer: The high-level controller uses the GUI inputs on a remote laptop to select the control mode of the WRL TTP and to set control parameters and segmentation thresholds. Moreover, it is responsible for detecting gait events – Foot Contact (FC) and Foot Off (FO). The FC and FO events can be detected using either a threshold on the $ \mathrm{vGRF} $ estimated from the sensorized foot or a rule-based algorithm on signals from the foot IMU (Fiumalbi et al., Reference Fiumalbi, Martini, Papapicco, Agnello, Mazzarini, Baldoni, Gruppioni, Crea and Vitiello2022).

2. 2) Middle-level control layer: The middle-level controller uses the information measured by the onboard sensors and provided from the high-level control layer to (i) compute a continuous estimate of the gait phase, and (ii) send the reference motor commands to the low-level controller (Figure 5(b)).

   The continuous gait phase estimation is computed by a pool of Adaptive Oscillators (AOs) (Yan et al., Reference Yan, Parri, Ruiz Garate, Cempini, Ronsse and Vitiello2017) with non-linear kernel-based filtering. The phase $ \varphi $ ranges from 0% to 100% within a stride, and it is reset at each FC. The AOs are synchronized with the rotation of the foot along the sagittal plane, estimated online through the Madgwick sensor fusion algorithm (Madgwick, Reference Madgwick2010).

   The WRL TTP actuation is managed through a library of motor commands, determined and tuned during preliminary tests on healthy subjects. During the whole gait cycle, the middle-level controller provides as output (i) the low-level control mode ( $ {\mathrm{LLC}}_{\mathrm{mode}} $ ), either velocity control or zero current control, and (ii) the respective desired low-level control reference ( $ {\mathrm{LLC}}_{\mathrm{ref}} $ ). Notably, whenever the WRL TTP is controlled in zero current, the $ {\mathrm{LLC}}_{\mathrm{ref}} $ is set to 0 A.

3. 3) Low-level control layer: When controlled in $ {\mathrm{LLC}}_{\mathrm{mode}} $ velocity control, the error between $ {\mathrm{LLC}}_{\mathrm{ref}} $ and the measured velocity of the motor is used as input for a proportional-derivative (PD) regulator, returning an electrical desired current $ {I}_{des} $ .

Figure 5. (a) Layered control architecture of the WRL TTP. The control mode selection in the High-Level layer is performed via manual selection on the remote GUI. (b) Graphical representation of the mode-specific assistive strategy in the middle-level layer. The violet parts indicate a low-level control in current (desired output in A). The yellow parts indicate a low-level control in velocity (desired output in motor rounds per minute).

The WRL TTP can be controlled in two operating modes: passive mode (PM) and active mode (AM).

• a) Passive Mode

When controlled in PM, the actuator is driven at negative velocity during the swing phase to unload the energy stored in the ESAR foot compressed by the user, to emulate the behaviour of a passive device (Figure 5(b)):

1. 1. from FC to FO, the motor is controlled in zero current, thus the actuator does not provide additional deformation of the foot;

2. 2. at FO, the $ {\mathrm{LLC}}_{\mathrm{mode}} $ is set to velocity control and the $ {\mathrm{LLC}}_{\mathrm{ref}} $ is instantaneously set to −2000 rpm to unload the residual elastic energy in swing;

3. 3. the motor control mode is set to zero current whenever the foot is in a neutral, unloaded, position, which is detected when the camshaft angle is lower than a manually tuned threshold angle $ {\theta}_{unload} $ , close to the lower instability point $ I1 $ of the 4-bar linkage:

(2) $$ {\theta}_{cam}\left(\mathrm{t}\right)<{\theta}_{unload}. $$

1. b) Active Mode

The AM control strategy drives the actuator during stance to bring the four-bar linkage over the upper instability point $ I2 $ to return the energy during the push-off phase. The active loading is controlled by tuning a desired stride phase $ {\unicode{x03C6}}_{des} $ at which the energy should be returned (desired flipover phase). This control strategy ensures an adaptive energy release throughout the subject’s walk (Figure 5(b)):

1. 1. from FC, the prosthesis is controlled in zero current until a set stride phase value is reached:

(3) $$ \varphi \left(\mathrm{t}\right)>{\varphi}_{fb}, $$

where $ \varphi \left(\mathrm{t}\right) $ (%) is the online stride phase estimated by the AOs, and $ {\varphi}_{fb} $ (%) is a feedback threshold used to command the engagement of the motor. The value of $ {\varphi}_{fb} $ is initialized to 20% and updated at each stride according to the rule described in point 3 to make the prosthesis comply with different loading conditions;

1. 2. when the equation in point 1 is met, the $ {\mathrm{LLC}}_{\mathrm{mode}} $ is set to velocity control with a $ {\mathrm{LLC}}_{\mathrm{ref}} $ of 6000 rpm to run the motor at the maximum velocity, injecting energy in the elastic structure of the foot until the camshaft angle reaches $ I2 $ :

(4) $$ {\theta}_{cam}\left(\mathrm{t}\right)>{\theta}_{flipover}, $$

where $ {\theta}_{cam} $ is the angle measured by the camshaft encoder, and the threshold angle $ {\theta}_{flipover} $ is the value of the camshaft angle when the linkage is at point $ I2 $ , manually set by the experimenters depending on the stroke length. At this time, the phase estimated by the AOs is stored as the actual flipover phase ( $ {\varphi}_{\mathrm{act}}\left(\mathrm{t}\right) $ );

1. 3. the control system computes the difference between $ {\varphi}_{\mathrm{act}}\left(\mathrm{t}\right) $ and the desired value $ {\varphi}_{des} $ to update the feedback threshold $ {\varphi}_{fb} $ for the upcoming stride, according to the following rules:

(5) $$ {\displaystyle \begin{array}{l} If\left({\varphi}_{\mathrm{act}}\left(\mathrm{t}\right)-{\varphi}_{des}>1\right)\; then\left({\varphi}_{fb}={\varphi}_{fb}-1\%\right)\\ {} If\left({\varphi}_{\mathrm{act}}\left(\mathrm{t}\right)-{\varphi}_{des}>3\right)\; then\left({\varphi}_{fb}={\varphi}_{fb}-2\%\right)\\ {} If\left({\varphi}_{\mathrm{act}}\left(\mathrm{t}\right)-{\varphi}_{des}<-1\right)\; then\left({\varphi}_{fb}={\varphi}_{fb}+1\%\right)\\ {} If\left({\varphi}_{\mathrm{act}}\left(\mathrm{t}\right)-{\varphi}_{des}<-3\right)\; then\left({\varphi}_{fb}={\varphi}_{fb}+2\%\right)\end{array}} $$

In particular, if $ {\varphi}_{\mathrm{act}}\left(\mathrm{t}\right) $ is greater than $ {\varphi}_{des} $ , $ {\varphi}_{fb} $ is lowered to engage the motor earlier during the next stride. Conversely, if $ {\varphi}_{\mathrm{act}}\left(\mathrm{t}\right) $ is lower than $ {\varphi}_{des} $ , $ {\varphi}_{fb} $ is increased to delay the motor engagement in the next stride.

1. 4. the prosthesis is controlled in zero current from the flipover to FO, that is, the energy return phase. In this phase, the energy is rapidly returned thanks to the free motion of the overrunning clutch;

2. 5. in the swing phase, the WRL TTP is controlled as in PM to reposition the foot in a neutral position.

3.1. Concept verification with transtibial amputee subjects

Two transtibial amputees (Table 1) with a residual mobility level of K3/K4 (medicare functional classification levels (Gailey et al., Reference Gailey, Roach, Applegate, Cho, Cunniffe, Licht, Maguire and Nash2002)) were recruited to perform treadmill walking to assess the ability of the WRL TTP to assist gait in different operating conditions (Figure 6). The experimental activities were approved by the Area Vasta Toscana Centro Ethics Committee (study number 16678), and conducted at IRCCS Fondazione Don Carlo Gnocchi (Florence, Italy). Tests were performed after an initial process of tuning and familiarization with the device. The WRL TTP was fixed and aligned on the socket of each subject by a prosthetist, and the thigh IMU was fastened above the knee along the sagittal plane of the leg using an elastic band. The stroke regulation was then adjusted after assessing the comfortable walking speed and the foot deformation produced by the user. The value of the stroke regulation was set to release the retained energy exclusively when controlling the prosthesis in AM: this ensured that the assistive action of the motor additionally deformed the foot, allowing the linkage to reach the flipover. Conversely, in PM the flipover was never reached, and the motor was driven backwards to unload the structure.

Table 1. Subjects’ general information and test parameters

Figure 6. (a) Photograph of subject 1 wearing the WRL TTP. (b) Photograph of subject 2 using the WRL TTP during the verification tests.

The tuning process of the flipover phase in AM ( $ {\varphi}_{des}\Big) $ started from the average phase of the dorsiflexion peak (i.e., the beginning of push-off) in PM and was fine-tuned according to the user feedback. An early return phase $ {\varphi}_{des}^e $ and a late return phase $ {\varphi}_{des}^l $ were also defined respectively as a decrement and an increment of 5% of the desired flipover phase $ {\varphi}_{des} $ . The walking speeds for the test were selected following the procedure described by Nagano et al. (Reference Nagano, Begg, Sparrow and Taylor2013):

1. 1. the subject started walking in AM at a comfortable speed;

2. 2. the treadmill speed was increased by 0.3 km/h every ten strides until the subject had to stop due to excessive physical effort. The speed was then further increased by 0.3 km/h and noted as maximum speed;

3. 3. the treadmill speed was brought to the initial value;

4. 4. the treadmill speed was decreased by 0.3 km/h every ten strides until it became too uncomfortable to walk. The speed was then further reduced by 0.3 km/h and noted as minimum speed;

5. 5. steps from 1 to 4 were repeated three times, and the self-selected speed ( $ \mathrm{SSS} $ ) was set as the average value among the collected maxima and minima.

To demonstrate the capability of the prosthesis to continuously adapt to different speeds, once the $ \mathrm{SSS} $ was set, the subject was asked to walk on the treadmill at three increasing speeds without taking breaks: the self-selected one, a speed 10% higher ( $ \mathrm{SS}{\mathrm{S}}_{+10\%} $ ), and one 20% higher ( $ \mathrm{SS}{\mathrm{S}}_{+20\%} $ ). The subject walked at each speed for 60 s after the treadmill reached the steady-state speed. This procedure was repeated five times: in the first and the last trial, the prosthesis was operated in PM, whereas in the other trials, the operation mode of the prosthesis was AM, setting the three desired flipover phases $ {\varphi}_{des} $ , $ {\varphi}_{des}^e $ and $ {\varphi}_{des}^l $ in a randomized order. The treadmill was equipped with the Optogait system (Microgate S.r.l., Italy) to extract relevant spatiotemporal gait parameters.

To have an insight into the end-users’ opinion on the prosthesis, at the end of the trial the subjects were asked to fill in an ad-hoc Visual Analog Scale (VAS) (Chiarotto et al., Reference Chiarotto, Maxwell, Ostelo, Boers, Tugwell and Terwee2019) for three items (weight, comfort, and safety).

3.2. Data analysis

In data post-processing, single strides were extracted by segmenting the acquired data between two consecutive FC events and normalized over 100 samples. For each stride, the mean and standard deviation were computed for five metrics. To assess the capability of the prosthesis to adapt to different loading conditions and stride durations, we analyzed the actual flipover phase $ {\varphi}_{act}\left(\mathrm{t}\right) $ at the different commanded flipover phases and velocities. To evaluate the residual tension in the prosthesis, we measured the peak force measured by the load cell, at FO before commanding the active unload of the leaf spring of the ESAR foot. To evaluate the capability of the prosthesis to deform the structure additionally and inject energy, we estimated the peak dorsiflexion ankle angle and the energy injected by the actuator (computed as the difference between the work exchange during AM and PM strides estimated offline by exploiting the model presented in the Supplementary Material). To preliminary assess behavioral differences between the two operating modalities, we computed the cadence of the subjects, as used in other clinical assessments and gait training (TIRR SCI Clinical Exoskeleton Group et al., Reference Chang, Afzal, Berliner and Francisco2018; Bunge et al., Reference Bunge, Davidson, Helmore, Mavrandonis, Page, Schuster-Bayly and Kumar2021). Moreover, we computed the temporal and spatial symmetry indexes (SI) as

(6) $$ \mathrm{SI}=\frac{\mid {X}_L-{X}_R\mid }{0.5\cdotp \left({X}_L+{X}_R\right)}\cdotp 100 $$

where $ {X}_L $ and $ {X}_R $ were either the stride length (spatial SI) or the stride time (temporal SI) of the left and right limb, respectively, extracted from the Optogait system (Błażkiewicz et al., Reference Błażkiewicz, Wiszomirska and Wit2014). With this definition, a SI of 0% indicates perfect symmetry.

For results visualization, a representative stride (one for each control modality and speed) was chosen as the one with lower RMS error with respect to the median profile computed from all the strides extracted.