Abstract
In an ideal elastic bounce of the body, the time during which mechanical energy is released during the push equals the time during which mechanical energy is absorbed during the brake and the maximal upward velocity attained by the center of mass equals the maximal downward velocity. Deviations from this ideal model, prolonged push duration and lower upward velocity, have found to be greater in older than in younger adult humans. However it is not known how similarity to the elastic bounce changes during growth and whether an optimal elastic bounce is attained at some age. Here we show that similarity with the elastic bounce is minimal at 2 years and increases with age attaining a maximum at 13-16 years, concomitant with a mirror sixfold decrease of the impact deceleration peak following collision of the foot with the ground. These trends slowly reverse during the course of the lifespan.
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Introduction
Indirect evidence that energy is partly conserved in human running thanks to an elastic bounce of the body is provided by an efficiency of positive work production twice that attained by a contracting muscle1,2. The elasticity of the bounce can also be directly deduced by considering the mechanical energy changes of the center of mass of the body after landing and before takeoff3,4. In bouncing gaits such as running, hopping and trotting mechanical energy is absorbed each step by muscle-tendon units when the body decelerates during the brake and restored when the body reaccelerates during the push. In this stretch-shorten cycle of muscle-tendon units, some energy is stored elastically during stretching and recovered during shortening. In adult running elastic energy storage and recovery is greater the greater the length change of tendon relative to that of muscle. This is because adult tendon has a very small elastic hysteresis5,6, i.e. the force exerted during shortening is only slightly less than during stretching. Muscle's stretch-shorten cycle on the contrary exhibits a large hysteresis, i.e. a large energy loss, because it exerts a force during stretching Fstr, which may largely exceed that during shortening Fsho. The relative role of muscle vs tendon involvement during the bounce can be deduced considering that during running on the level at a constant speed the momentum lost during the brake Fstr tbrake equals the momentum gained during the push Fsho tpush and since Fstr > Fsho in contracting muscle then tbrake < tpush when muscle instead of tendon lengthens and shortens. The ratio between time intervals during which negative and positive work are done tbrake/tpush would approach unity in an ideally elastic bounce sustained uniquely by tendon (where Fstr~Fsho). The asymmetric response of muscle to lengthening and shortening also explains the difference between maximal downward velocity Vv,mx,down (higher) and upward velocity Vv,mx,up (lower) attained by the center of mass during the bounce. In fact, a higher Vv,mx,down can be passively attained during the fall thanks to gravity relying, for the downward deceleration, on the greater force the muscle is able to afford when lengthening during the subsequent negative work phase (brake). On the contrary, a lower maximal upward velocity Vv,mx,up is actively attained against gravity by muscular contraction during the positive work phase (push) when the muscle is shortening and is capable of a lower force. This explains why, when muscle operates instead of tendon, Vv,mx,up < Vv,mx,down. Therefore, tbrake/tpush and Vv,mx,up/Vv,mx,down are greater the more the kinetics and the kinematics of the bounce approach those of an ideal elastic body. Both ratios increase with the active muscle contraction that prevents muscle lengthening and thus favors tendon lengthening. In fact: i) tbrake/tpush is lower at low running speed, when muscle activation is lower, whereas tbrake~tpush at high speeds, when muscle activation is higher3; ii) tbrake/tpush is lower in old humans than in young adult humans associated with a lower force attained during the bounce by the elderly4,7.
It is not known how the running bounce differs from that of an ideal elastic body during growth. In this study we measured tbrake, tpush, Vv,mx,up, Vv,mx,down and the vertical acceleration of the center of mass of the body av during running steps in nine age groups with mean ages ranging between 2.6 and 27.7 years.
Results
Indicative records obtained on two subjects 2.5 years and 15.8 years old, where the difference in results between ages is largest, are shown in Fig. 1. In the younger subject:
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1
tbrake/tpush is lower mainly due to a shorter duration of the brake consequent to a sharper decrease of the total mechanical energy of the center of mass Etot following the aerial phase ta.
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2
The peak in kinetic energy of vertical motion Ekv = 0.5 Mb Vv2 (where Mb is the mass of the body and Vv is the vertical velocity of the center of mass of the body) is lower during the lift than during the fall, indicating a lower ratio Vv,mx,up/Vv,mx,down.
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3
The impact deceleration peak following landing av,impact is much greater than in the older subject, whereas the subsequent ‘active’ peak, roughly simultaneous with the minimum of Etot and Ep, is similar to that of the older subject8.
Average values of tbrake/tpush, Vv,mx,up/Vv,mx,down and av,impact measured in the nine age groups of the present study are given in Table 1 and plotted as a function of age in Fig. 2. The three last rows in Table 1 (indicated by asterisks) and the open symbols in Fig. 2 refer to tbrake/tpush and Vv,mx,up/Vv,mx,down data obtained in two previous studies3,4 in the same speed range. It can be seen that during growth both tbrake/tpush and Vv,mx,up/Vv,mx,down increase to a maximum at 13–16 years whereas av,impact decreases to a minimum at about the same age. The maximal deceleration downward av,impact following collision of the foot with the ground is, on average, ~6 times greater in the 2 years group than in the 16 years group (Table 1). Subsequently the ratios tbrake/tpush and Vv,mx,up/Vv,mx,down, which would attain unity in an elastic bounce, decrease and av,impact increases.
Discussion
The mirroring opposite trend of the av,impact curve with the tbrake/tpush and Vv,mx,up/Vv,mx,down curves in Fig. 2 strongly suggests that the impact peak is a relevant factor impeding an elastic bounce. This is reasonable because some of the mechanical energy absorbed and released by the heel pad and other structures during the impact phase9 is lost prior the beginning of the push, thus decreasing the mechanical energy at disposal for the subsequent positive work phase. The fall in Etot during tbrake represents the total amount of energy that can possibly be stored elastically. In the example of Fig. 1, the impact duration occupies ~45% of the total fall in Etot in the 2.5 years old subject and ~24% in the 15.8 years old subject. It follows that relatively less mechanical energy is left after the impact phase to be stored in muscle-tendon units of the younger subject during the fall in Etot. The mechanical energy lost during the impact phase must be replaced by muscular contraction during the following positive work phase resulting, as described above, in an increased duration of tpush and in a decrease of Vv,mx,up, i.e. in a less elastic bounce and a greater energy expenditure. In fact, measurements made in a previous study2 show that the efficiency of positive work production during running below 11 km h−1 is lower in 4.5 years old children than in 21.6 years adults (0.405 ± 0.046 (s.d.), N = 46 vs. 0.426 ± 0.036 (s.d.), N = 67, P = 0.014).
This study draws attention to two points: i) the youngest subjects are more exposed to high-impact collisions and ii) the impact peak and the similarity to an elastic bounce change during growth.
The first point has practical health implications. It is known that high-impact collision forces are likely to be associated with injuries of the muscular-skeleton system10,11,12. The present finding, that the impact peak during running is elevated in the youngest subjects requires particular attention.
With regard to the second point it is relevant to consider that the mass-specific vertical stiffness of the running bounce k/Mb decreases during growth to a minimum in the 16 years group to increase again in the 28 years group8 with the same trend of the impact peak found in the present study. In other words, the step frequency is higher in the youngest, due to the lower dimensions of their body, requires a higher mass-specific vertical stiffness, to cope with the natural frequency of the bouncing system8 and this, in turn, causes a higher impact peak and a lower similarity to an elastic bounce. Interestingly, an inverse relationship between k/Mb and similarity to an elastic bounce was also found when comparing running, trotting and hopping animals of different size13. In adult humans, the height of the impact peak increases with the effective foot mass Meff, i.e. with the proportion of the body mass Mb stopping abruptly at touch-down9,14. We do not know studies describing changes of the ratio Meff/Mb during growth: this requires further experiments. However, it is worth noting since now that the optimal similarity to an elastic bounce is attained in the 16 years group thanks to an increase in Mb not compensated by an increase in k (ref. 8), resulting in a more compliant system and it is abandoned in the 28 years group because of an increase in k not compensated by the increase in Mb, resulting in a stiffer system. This suggests that the completion of neuro-muscular maturation15 associated with greater tendon compliance16 attains in the teens an ideal condition that is no longer tenable at an older age.
It remains to be explained why a stiffer system results in a less elastic bounce and if this condition is necessarily caused, in animals as in humans, by a greater impact peak following collision with the ground. In addition, do we really know that a greater kinematic and kinetic similarity of the bounce with that of an ideal elastic body translates into a more efficient run? Not necessarily, but experimental data show that in human running: i) the efficiency is greater at high speeds1,2 when tbrake~tpush as in an elastic bounce3; ii) the greater deviation from the elastic model in the elderly4, i.e. a lower ratio tbrake/tpush, is associated with a greater energy expenditure17; iii) as mentioned above, both the efficiency2 and the similarity to an elastic bounce (Fig. 2), increase from 4.5 to 21.6 years; and iv) in running turkeys and rhea and hopping springhare and kangaroos, a lower efficiency in the smaller animal was found to be bound to a lower tbrake/tpush13,18. The lower efficiency in smaller animals was ascribed in the literature to a less efficient elastic energy storage possibly due to their tendons being relatively thicker than those of larger animals19,20,21,22.
Methods
Measurements were made starting from records of the force exerted by the foot on the ground in vertical and fore-aft directions obtained in a previous study8 by means of a force-platform. The method of analysis of the force records to obtain the mechanical energy of the center of mass of the body (Fig. 1) has been described in detail previously4,13. Here we used only runs where: i) the ratio between positive and negative work done during the step to maintain the motion of the center of mass was between 0.75 and 1.25; ii) the curves of gravitational potential energy and of the kinetic energy of forward motion were in phase with an energy transfer between them ≤ 10%, warranting the mechanism of running rather than that of walking and iii) the ratio between the average vertical force in the complete steps used for the analysis and the weight of the body was between 0.97 and 1.03. Analysis was restricted to running speeds less than 11 km h−1 because below this speed the mean vertical acceleration during the push is independent of body size and age8. Written informed consent of the subjects and/or their parents was obtained. Experiments involved no discomfort, were performed according to the Declaration of Helsinki and approved by the local ethics committee.
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Acknowledgements
The authors wish to thank Andrea Cavagna for constructive discussions and suggestions on the manuscript preparation. This study was supported by the Fonds National de la Recherche Scientifique of Belgium and by the Italian Ministero dell'Istruzione, dell'Università e della Ricerca.
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M.A.L. suggested to apply the landing-takeoff software3,4,13 to the force-platform records obtained in a previous study8, did most of the software arrangements and of the analysis of the data. B.S. provided the original force-platform records with instructions for their analysis and mechanical efficiency data, did most of the literature search and provided useful suggestions in the preparation of the manuscript. G.A.C. collaborated with software preparation, did some of the analysis of the data and wrote the paper.
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Legramandi, M., Schepens, B. & Cavagna, G. Running humans attain optimal elastic bounce in their teens. Sci Rep 3, 1310 (2013). https://doi.org/10.1038/srep01310
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DOI: https://doi.org/10.1038/srep01310
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