INTRODUCTION

TOP ABSTRACT INTRODUCTION METHODS RESULTS DISCUSSION REFERENCES

THE IMPRESSIVE SPEEDS OF THE swiftest human and animal runners are believed to be promoted by anatomic and physiological features that increase both the frequency and length of their strides. Slender legs with relatively fast muscle fibers presumably increase stride frequencies by allowing limbs to be repositioned more rapidly (11, 14, 15, 17, 30) and long limbs are believed to extend stride lengths by providing greater forward propulsion (11, 14, 15, 17, 30). Although these mechanisms are widely accepted, their actual contributions to the faster top speeds of swifter runners are not known. The greater maximal frequencies of runners with faster muscle fibers (2, 7, 13) could be achieved by reducing the portion of the stride the foot is in contact with the ground rather than the portion taken to swing the limb into position for the next step. If the mechanical energy to reposition limbs is provided largely passively through elastic recoil and energy transfers between body segments (12, 19, 29), rather than actively by power generated within muscles (11, 15, 30), minimum swing time would be affected minimally by muscle fiber speeds. Similarly, longer strides do not necessarily require longer legs. At top speed, human sprinters take strides considerably longer than those of non-sprinters, although their legs are of similar length (2). One means of achieving longer strides would be to apply greater support forces to the ground. At any speed, applying greater forces in opposition to gravity would increase a runner's vertical velocity on takeoff, thereby increasing both the aerial time and forward distance traveled between steps.

Here, we hypothesized that greater ground forces, rather than shorter minimum swing times enable human runners to reach faster top speeds.

	METHODS

TOP ABSTRACT INTRODUCTION METHODS RESULTS DISCUSSION REFERENCES

Experimental Design

(1)

(2)

(3)

(4)

(5)

The first test of our hypothesis was to have 33 subjects of different sprinting abilities run to top speed on a level treadmill. We predicted the contact lengths, stride frequencies, and swing times of fast and slow runners would not differ but that the support force applied to the ground would be greater for faster vs. slower runners.

To maximize the range of top running speeds attained by our subjects, we included both male and female subjects. Although small differences in running mechanics might be present between male and female runners, several considerations suggested that such differences, if present, would not confound this experimental test. First, the quantitative test of our hypothesis expressed in Eq. 5 applies equally to male and female runners. Second, the functional properties of the skeletal muscles that apply ground force and swing limbs (6) do not differ between men and women. Third, the difference in performance between equally trained male and female runners results from the greater proportion of the body's weight made up of fat in females (28). Fourth, the gender difference in world record running performances for three Olympic sprint events (9.3 ± 1.8%) closely matches the gender difference in percent body fat (i.e., 10%).

We recognized that individual variation in step frequencies and contact lengths not directly related to top speed might exist among the 33 subjects participating in our first test; therefore, we undertook a second test designed to alter F_avge/W_b while holding step frequency and contact length constant. We had the same runners run to top speed on 6° and +9° treadmill inclinations. Comparing subjects to themselves across these conditions provided a statistically and biologically more robust test with respect to individual variability. The mechanical determinants of speed described by Eq. 5 apply equally to declined, inclined, and level treadmill running. In each case, the height of the center of mass does not change over time, and F_avge/W_b represents the average force applied normal to the earth (i.e., support force) during the period of foot-ground contact.

Our hypothesis for the second test was virtually identical to that of the first test: we predicted runners would reach higher declined than inclined top speeds by applying greater vertical forces to the running surface while repositioning their legs in the same minimum time.

Meeting our experimental objective required measurements of the vertical but not the horizontal component of the ground reaction force. During constant-speed running, the peak vertical ground-reaction forces are typically 5-10 times greater than the peak horizontal forces (24). When one runs at a constant speed against no air resistance, the propulsive forces that increase the body's forward velocity before takeoff simply offset the braking forces that decrease the body's velocity on landing. In the present experiment, both the net horizontal forces exerted to propel the body forward and the effect of these forces on forward speed must be zero regardless of the top speed attained by the runner or the inclination of the treadmill. Because the net horizontal forces our subjects exerted during each stride could not explain differences in the top speeds attained, they were not included in our analysis.

We conducted our experiments on a treadmill rather than a track or level terrain to facilitate direct measurements of surface reaction forces and running mechanics. This enabled us to eliminate the different resistances that our fast and slow subjects would encounter from air at their different top speeds (25), as well as the mechanical variability that occurs when subjects run at volitional rather than controlled speeds. However, we believe our results will generalize to over-ground running for two reasons. First, the mechanical variables included in our analysis are affected little by the characteristics of the running surface (9) or surface inclination (16). Second, the mechanical requirements to apply sufficient force normal to the earth to support the body's weight against gravity and for some minimum time to be taken to reposition the limb for the next step are similar under all of these conditions.

Subjects

Measurements

Top speed. Subjects performed a 10-min warmup at a comfortable jogging speed, typically 2.5 m/s. They were then strapped into an upper-body harness suspended from the ceiling to prevent them from falling and being propelled behind the treadmill during the test. The chest harness and slackened ceiling suspension did not impede or assist the subjects' running mechanics in any way. The test was initiated at 3.0 m/s with subsequent speed increments of 1.0 m/s through intermediate speeds, and 0.1-0.5 m/s thereafter, in accordance with subject feedback regarding difficulty. Subjects were instructed to recover fully between speeds, which typically took 30-60 s at all but their highest speeds. At each speed, subjects lowered themselves onto the treadmill by transferring their weight from the handrails while initiating the leg movements necessary to begin running on the moving treadmill belt. Subjects typically managed the transition to unassisted running in two to four steps after which force data were collected for a minimum of eight steps. Trials were considered successful if not more than 20 cm of forward or backward movement occurred during the eight steps. Top speeds were the last speeds successfully completed; multiple attempts were typically made at failure speeds. The greatest speeds achieved were within 0.2 m/s of the failure speed for all but three subjects. Level, declined, and inclined tests followed the same protocol.

View larger version (31K): [in this window] [in a new window]   Fig. 1.   Phases of a running stride (A) and simultaneous treadmill reaction force data (B) provided by the force plate for a representative runner. Force data were used to determine contact (tc), aerial (taer), swing (tsw), and total stride times (tstr). Note that the swing period is composed of two aerial periods and the intervening contact period of the contralateral limb.

View larger version (16K): [in this window] [in a new window]   Fig. 2.   Running mechanics as a function of speed for a representative subject. A: speed increases were achieved primarily by increasing stride lengths (Lstr) at lower speeds and stride frequencies (Freqstr) at higher ones. B: stride frequency increases at higher speeds were due to reductions in both foot-ground contact times and swing times that together make up the total stride time. The aerial times comprising roughly two-thirds of the swing period (aerial × 2) also decreased with increases in speed. C: effective support forces [Feff = (F  FWb)/FWb, where Wb is body weight] averaged over the period of foot-ground contact increased in direct proportion to running speed, whereas effective impulses (Impeff = Feff · tc) increased from slower to intermediate speeds before decreasing to a minimum value at top speed. All values are means ± SE for 1 subject. Error bars are obscured by all filled symbols and are too small to be visible for some variables.

Total stride time. Stride time (measured in s) was defined in accordance with Heglund et al. (12) as the time between consecutive footfalls of the same foot (Figs. 1 and 2B).

Step time. Step time (measured in s) was defined as the time between consecutive footfalls of opposite feet. Thus step time = stride time/2.

Contact time. Time of foot-ground contact (measured in s) was determined from the time the applied force exceeded 0 N on the force plate (Figs. 1 and 2B).

Aerial time. Aerial time (measured in s) was determined from the time between the end of the contact period of one foot and the beginning of the contact period of the opposite foot (Figs. 1 and 2B).

Swing time. Swing time (measured in s) was the time that a given foot was not in contact with the ground and was determined by subtracting the contact time from the total stride time (Figs. 1 and 2B).

Impulse applied to the running surface. Effective impulse values were determined from the product of the effective force applied to the running surface and foot-ground contact times. The forces applied to the running surface in opposition to gravity were normalized for the gravitational force exerted by the body's weight (F_Wb). Consequently, effective impulse values have units of seconds and provide the body's aerial time under conditions when the height of the center of mass above the running surface is the same on landing and takeoff (16, 20), a condition met on all three treadmill inclinations utilized here.

Stride frequency. Stride frequency (strides/s) was determined from the inverse of the total stride time (1/total stride time).

Step frequency. Step frequency (strides/s) was determined from the inverse of total step time; therefore, step frequency = stride frequency · 2.

Stride length. Stride length (measured in m) corresponded to the belt distance traveled between successive contact periods of the same foot and was calculated by dividing the treadmill speed by stride frequency.

Step length. Step length (measured in m) corresponded to the belt distance traveled between successive contact periods of opposite feet. Thus step length = stride length/2.

Contact length. Contact length was determined from the product of foot-ground contact time and speed and thus provided the horizontal distance or length traveled by the belt during the contact period.

Video analysis. For general interest, we acquired swing time data from video for the first three finishers in the 100-m dash at the 1996 Olympics. These values are presented graphically but are not included in our statistical analysis. Swing times for the Olympic runners were determined by counting the number of video fields (NBC Sports, 60 fields/s) between right foot-up and right foot-down for eight consecutive strides beyond the 50-m mark. The average number of fields in eight swing periods was multiplied by the time per field to obtain each runner's swing time. Speeds were determined from the number of fields elapsing between each runner's crossing of the 50- and 100-m marks and the time per field. For laboratory subjects, we found that video contact time values exceeded simultaneously measured force plate contact time values by 15%, regardless of treadmill speed due to the brief intervals at the beginning and end of the contact period during which no force is applied to the belt. Thus we decreased the video contact time values of the Olympians by 15% to make the appropriate comparison to the force plate contact time values of our experimental subjects. This adjustment increased the video swing times of the Olympians only marginally (+4.6%).

Statistics

	RESULTS

TOP ABSTRACT INTRODUCTION METHODS RESULTS DISCUSSION REFERENCES

Running Mechanics as a Function of Speed

Top Speed

View larger version (15K): [in this window] [in a new window]   Fig. 3.   tsw vs. top running speed. Across a 1.8-fold range of top speeds, the minimum tsw of different runners (n = 33) varied little (0.373 ± 0.03 s), being less than 0.03 s shorter for a runner with a top speed of 11.1 vs. 6.2 m/s. ×, First 3 finishers in the 100-m dash at the 1996 Olympics. Regression equations and R2 values are for n = 33 treadmill subjects during level running in all figures (tsw = 0.42  0.0050x, R2 = 0.06, P = 0.18; x represents top speed in all equations).

Swing Times

For both fast and slow subjects during level running and the same runners on different inclinations, swing times decreased with increases in running speed to reach nearly the same minimum values at the top speed attained (Fig. 4).

View larger version (16K): [in this window] [in a new window]   Fig. 4.   tsw as a function of running speed for individual runners. A: tsw for a representative subject on inclined (+9°), level (0°), and declined (6°) running surfaces decreased with increasing speed to reach similar minimum values at the different top speeds attained on the different inclinations. B: tsw of slow, average, and fast subjects during level running also decreased with increasing speed, to reach similar minimum values at the considerably different top speeds of these individuals.

Forces Applied to the Running Surface

View larger version (14K): [in this window] [in a new window]   Fig. 5.   Support force (Favge/Wb), foot-ground tc, and taer as a function of top running speed. A: average support forces of runners applied to the running surface (F/FWb) at top speed were systematically higher for faster runners, increasing 1.26 times across the 1.8-fold range of top speeds. The shorter tc of faster runners (B) in combination with their higher ground forces resulted in equivalent impulses and taer among different runners at top speed (C). Favge = 1.26 + 0.101x, R2 = 0.39, P = 0.02; tc = 0.19  0.0087x, R2 = 0.58, P = 0.01; taer = 0.11 + 0.0018x, R2 = 0.028, P = 0.45.

The time spent in the air (mean aerial time = 0.128 ± 0.004 s, Fig. 5C) at top speed did not vary as a function of the top speeds for our 33 subjects during level running. This was due to the equivalence of the vertical impulses determining aerial times among fast and slow runners. However, fast and slow runners achieved these equivalent impulses with different combinations of effective force and foot-ground contact times. Faster runners applied greater forces during briefer contact periods, whereas slower runners applied lesser ground forces during longer contact periods (Fig. 4, A and B). Aerial times and effective impulses at top speed were greater during declined (0.131 ± 0.01 s) and lesser during inclined (0.100 ± 0.004 s) compared with level running (0.121 ± 0.004 s). This occurred because at the same running speed effective force was considerably higher during declined vs. inclined running, whereas foot-ground contact times were similar.

Stride Frequencies

Stride Lengths

Contact Lengths

	DISCUSSION

TOP ABSTRACT INTRODUCTION METHODS RESULTS DISCUSSION REFERENCES

We undertook this study to test the hypothesis that the different top speeds of human runners are determined by the amount of force applied to the ground rather than how rapidly limbs are repositioned in the air and found this to be the case in each of our two experimental tests. Both the greater top speeds of faster vs. slower level runners and those attained during declined vs. inclined running were achieved by the application of greater support forces to the ground while the legs were repositioned in nearly the same minimum time. Here, we also put forth a mechanical explanation for the limit to running speed with a more concrete physiological basis than the considerations of maximal stride lengths and frequencies that have typically framed this question. Because of the narrow constraints on the minimum swing times and maximum contact lengths that runners can use, speed is conferred predominantly by an enhanced ability to generate and transmit muscular force to the ground.

Hypothesis Test One: Comparing Faster and Slower Runners

At top speed during level running, the regression equation for our 33 subjects indicated that stride frequency was 1.16 times greater for a runner with a top speed of 11.1 vs. 6.2 m/s. The relatively weak relationship between top speed and maximal stride frequency was the result of runners with different top speeds repositioning their swing legs in similar periods of time. Because the swing period comprises three-fourths of the total stride time at top speed, similarities in minimum swing times greatly minimized the extent of possible variation in maximal stride frequencies. Minimum swing times from our regression relationship (Fig. 3) were only 8% or three-hundredths of a second shorter for a runner with a top speed of 11.1 vs. 6.2 m/s. As an illustration of this result, our slowest subject, with a top speed of only 6.2 m/s, was able to reposition her leg for her next step nearly as rapidly as the fastest 100-m sprinter in the world (0.344 vs. 0.320 s) although she could only run half as fast. Despite the widespread belief to the contrary (11, 14, 15, 17, 30), a more rapid repositioning of limbs contributes little to the faster top speeds of swifter runners.

We found the second mechanical alternative for achieving faster top speeds, applying greater support forces to the ground, to be the predominant mechanism faster runners utilized to reach their faster top speeds. The regression of average mass-specific force applied to oppose gravity during the contact period on top speed indicated that this force was 1.26 times greater for a runner with a top speed of 11.1 vs. 6.2 m/s. Although support forces differed roughly twice as much across this range of top speeds as did either step frequencies or contact lengths, we expected these force differences to be greater. Our regression relationship indicates that altering the support force applied by only one-tenth of one body weight is sufficient to alter top speed by one full meter per second. In contrast, Eq. 5 predicts the force necessary to affect this difference in top speed should be twice this large for a runner with average step frequencies and contact lengths.

The large sensitivity of top speeds to small differences in the mass-specific support forces applied to the running surface resulted from the positive effect of support forces on maximal stride frequencies. Although we expected maximal stride lengths (Eq. 3) to be positively affected by support forces, we did not expect a positive effect on maximal stride frequencies also. Because both fast and slow runners required an aerial time of 0.128 s to achieve the minimum swing time required to reposition their legs for the next step, the modest differences in maximal stride frequencies between fast and slow runners resulted entirely from the contact portion of the stride being shorter in faster runners. For all runners on a level surface, aerial times are determined by the product of the effective force applied to the ground and the time of foot-ground contact. By applying greater support forces, faster runners were able to achieve the effective impulses and aerial times necessary to reposition their swing legs with the shorter contact times that are used at higher speeds (Fig. 5). The briefer contact times made possible by the greater support forces applied by faster runners resulted in a positive relationship to maximal stride frequencies (R² = 0.30; P = 0.001). Thus the sensitivity of top speeds to the forces applied to the running surface resulted from the positive effect support forces had on both the maximal stride lengths and frequencies that runners were able to attain.

We found little difference in the third mechanism that would enable faster runners to reach faster top speeds: increasing the forward distance traveled during the stance period or contact lengths. Our regression equation indicated that contact lengths were 1.10 times greater for a runner with a top speed of 11.1 vs. 6.2 m/s. However, this resulted from a gender difference in top speed: our female subjects generally had shorter legs, shorter contact lengths, and slower top speeds. Within groups of male and female runners, contact lengths varied little or not at all in relation to top speed. Although elongated steps would provide a speed advantage by increasing the time available to apply ground force, runners do not exercise this option because unnaturally long steps compromise the ability of the active muscles to apply the ground force necessary to elevate the body for the ensuing step. By worsening the mechanical advantage and disrupting the natural spring-like behavior of the leg (8), unnaturally elongated steps increase the muscle forces and volumes that must be recruited per unit of force applied to the ground (22). Reductions in the ground force applied in relation to the muscle forces generated would directly reduce maximum ground forces and therefore also reduce top running speeds.

Hypothesis Test Two: Comparing Declined and Inclined Running

Although equivalent maximal stride frequencies do not explain the different top speeds achieved during declined and inclined running, they do provide additional evidence that a constraint on minimum swing times limits the top speeds of human runners. The means for minimum swing times at top speed on the different inclinations varied little and were virtually the same as those of fast and slow runners during level running (Fig. 3, Table 2). Although declined top speeds exceeded inclined top speeds by 41%, minimum swing times differed by only 8% and were actually shorter for the slower inclined condition. We attributed the slightly shorter and longer minimum swing times during declined and inclined running, respectively, to the running surface interrupting the limb's arc slightly later and earlier under these respective conditions rather than to differences in the velocity at which the limb was repositioned for the next step.

The small portion of the difference in the top speed means not explained by the average mass-specific force applied to the running surface to oppose gravity resulted from the longer contact lengths used during declined vs. inclined running (Table 1). Contact lengths that were 0.07 m longer at top speed during declined vs. inclined running provided an additional speed of 0.72 m/s or 25% of the top speed difference between conditions. Although contact lengths generally do not vary on different inclinations at the same slow and intermediate running speeds (16, 23), our data indicate runners do use slightly shorter contact lengths at faster speeds. The occurrence of contact length adjustments at only the highest inclined speeds may result from the need to modify the position of the limb to provide greater mechanical power to elevate the body more rapidly against gravity.

The application of mass-specific forces that were greater by one-half of the body's weight during declined vs. inclined running conferred an additional 2.1 m/s to the top speeds attained on the declined surface or 75% of the total difference between conditions (Table 1). Although faster declined vs. inclined top speeds were certainly expected, our data indicate that this single mechanical variable accounts for the large majority of these intuitive performance differences. Furthermore, the different maximum support forces that the limbs can apply to the running surface on different inclinations appear to be directly explained by the force-velocity properties of skeletal muscle. Both direct evidence (27) and indirect evidence (3) indicate that the mechanical activity of the extensor muscles that apply ground force during the stance phase is biased toward lengthening contractions that produce greater forces during declined running and shortening contractions that produce lesser forces during inclined running (15). The relationship between the forces generated by the extensor muscles and those that the limb applies to the ground appears to vary little on different inclinations (T. J. Roberts, personal communication). Thus the differences in the speed capabilities of runners on different inclinations are due largely to the influence of the force-velocity properties of muscle on the maximum forces the limbs can apply to the ground.

General Implications From Both Tests: What Limits Running Speed?

In addition to advancing the understanding of human speed, our results offer a more general and unexpected link between the physiological features of swift runners and the mechanical basis of their higher speeds. Certainly, top sprinters have faster muscle fibers and greater muscular power available to reposition their limbs (7, 11, 14, 15) yet do so little or no faster than average and slow human runners do. From this result, we infer that faster fiber speeds do not allow legs to be repositioned appreciably faster. Although the activation of the flexor muscles and tendons that reposition the limb during the swing period is considerable at high speeds (1), this activation likely occurs to increase the storage and release of mechanical energy in the oscillating limb rather than to generate mechanical power chemically within these muscles. Similar patterns of flexor activation during high-speed running in other species suggest that rapid limb repositioning is achieved similarly (10, 26) and that minimum swing times limit the top speeds of running animals. Accordingly, we suggest that the mechanism by which faster muscle fibers confer faster top running speeds in terrestrial cursors is not by decreasing minimum swing times but by increasing the maximum rates at which force can be applied to the ground.

We conclude that human runners reach faster top speeds not by repositioning their limbs more rapidly in the air but by applying greater support forces to the ground.