Egocentric information helps desert ants to navigate around familiar obstacles
Department of Zoology, University of Zürich, Winterthurerstrasse 190, CH-8057 Zürich, Switzerland
*Author for correspondence (e-mail: rwehner{at}zool.unizh.ch)
Accepted 1 October 2001
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Summary |
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Key words: homing, landmark guidance, landmark obstacle, detour, vector navigation, motor learning, idiothetic orientation, desert ant, Cataglyphis fortis.
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Introduction |
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For the sake of argument, let us consider that ants returning to the nest had to detour around an obstacle. What information do they acquire and use once they have reached the edge of the obstacle and must decide upon the course to be taken next? There seem to be at least three possibilities. The animals could use a local vector that is given by an external system of reference such as skylight coordinates (hypothesis 1). Alternatively, they could define the course to be taken with respect to the visual cue provided by the landmark obstacle (hypothesis 2) or with respect to the locomotor course taken prior to reaching the edge of the obstacle (hypothesis 3).
It is possible to discriminate between these three hypotheses by experimentally rotating the obstacle by degrees. In this case, hypothesis 1 would predict that the animal would maintain its previous compass course irrespective of the angle
about which the obstacle had been rotated. If the course of the animal also rotated by angle
, either hypothesis 2 or hypothesis 3 could hold. To discriminate between the two, it was necessary to design an experimental situation in which the obstacle disappeared from the field of view of the ant once the ant reached the edge of the obstacle. If the course taken by the ant followed the rotation of the (now invisible) obstacle, then the animal must have relied on egocentric (hypothesis 3) rather than allocentric (hypotheses 1 and 2) information.
Previous experiments have shown that ants of the genus Cataglyphis can behave according to hypothesis 1 and 2. For example, if the ants were presented with an array of landmarks (small black cylinders) flanking a frequently travelled route, they were able to associate so-called local vectors with the landmarks. These local vectors pointed in the compass direction the animal has previously chosen irrespective of whether the landmark array had been rotated (Collett et al., 1998). This is in accordance with hypothesis 1. However, if an extended landmark (a large black wall) obstructed their straight homebound path, ants arriving at the end of the wall chose a constant angle relative to the wall. When the obstacle was rotated by 45°, their courses were rotated by almost the same angular amount relative to the direction chosen by the ants during training (Collett et al., 2001
). This result leads to a rejection of hypothesis 1 because the ants did not follow the trained compass direction after turning around the edge of the wall. One cannot distinguish, however, between hypotheses 2 and 3, because the landmark obstacle in this experiment was so conspicuous.
In the present study, we set out to test whether egocentric information (hypothesis 3) can be used to determine the course taken by the ants after turning around an obstacle. We again forced the ants to deviate from their straight homebound paths around an extended barrier, but this time the obstacle was rather inconspicuous and vanished completely from the field of view of the ant as soon as it had reached the edge of the barrier and started to turn around it. This experimental design allowed us to distinguish between hypotheses 2 and 3. What happens when this obstacle is rotated relative to the training situation? Do the ants follow an allocentric course (the habitual compass direction) or does their course alter to match the rotation of the barrier? If the latter were the case, the ants would have defined their courses with respect to the locomotor course taken before reaching the edge of the obstacle and must, therefore, have relied on egocentric (idiothetic) information. In the present study, we show that this is, in fact, the case.
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Materials and methods |
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Training
The nest selected for the experiments was located within a flat open area, with the nearest natural landmarks (some shrubs, <0.5 m high) at least 40 m away. A feeding site F was established 13 m to the south of the nest entrance N. Between the nest and the feeder, a V-shaped barrier was placed with its tip pointing towards the feeder (Fig. 1A). The barrier consisted of two wooden shelves, each 6 m long and 5 cm high, enclosing an angle of 120°. Ants heading for the feeder could easily climb over the obstacle because a flat ramp of sand had been constructed on the inner side of the V-shaped array (Fig. 1B). The ants then had to jump down from the top of the barrier to run straight to the feeder, and did so unhesitatingly. Ants returning from the feeder, however, were not able to cross the barrier because some smooth tape had been glued to it on the feeder-facing side. On their first homebound path, the ants tried repeatedly to cross the barrier and ran back and forth along the obstacle until they finally managed to turn around its end and head for the nest. Approximately half the ants chose the left detour around the barrier, and the other half chose the right detour. Subsequent home runs were observed until the ants detoured around the barrier without any hesitation. The ants were then marked with a coloured dot depending on whether they had chosen the left (red) or right (green) detour direction.
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Ants were tested in two different states of homing behaviour. They were captured either at the nest entrance after they had returned from the feeder and completed their homebound run (so-called zero-vector ants) or at the feeder before they had started their homebound run (vector ants). The term zero-vector ants refers to the fact that, upon arrival at the nest entrance, the ants have paid out their home vector. If these ants were displaced to unfamiliar terrain, they would switch on a systematic search program (Wehner and Srinivasan, 1981). Accordingly, the term vector ants means that the ants taken from the feeder have their full home vector (F
N) still to be paid out.
Well-trained ants, detectable by their red or green colour mark, were transferred individually to the test area, provided with a biscuit crumb, and released. Zero-vector ants were released at the tip of a barrier identical to the one used for training. The barrier was presented either in the same orientation as during training (N=36) or rotated through 45° to either the west (N=22) or the east (N=27). In addition, ants were released on the bare test area without any barrier (N=22). Vector ants (N=22) were released at the geographical position of the feeder relative to the barrier, which was oriented as during training.
A grid of white lines (mesh width 1 m, square dimension 25 mx25 m) was painted on the desert floor so that the trajectory of the ant could be recorded on graph paper (square dimension 1 cm). After 510 min of recording, the ant was captured again, marked with a blue dot, and released into the entrance of its nest. Each ant was tested only once.
Data analysis
The first path segment after the ant, approaching the barrier from the insurmountable (feeder-based) side, had turned round one end of the barrier was analysed. This path segment expresses the directional information the ants had associated with the barrier. In the following, it is called the detour vector in order to use a neutral term that could be applied irrespective of whether the ants behaved according to hypothesis 1, 2 or 3. Some zero-vector ants (14 out of 85 ants) did not manage to get round the barrier during 10 min of recording time. These runs were omitted from the evaluation. Furthermore, analyses were restricted to those ants that detoured around the same end of the barrier that they had used during training (for numbers of ants, see Results).
To determine the directions of the detour vectors, four concentric circles (radii 1, 2, 3 and 4 m) were drawn around the ends of the barrier (Fig. 1C). The first intersections of the path of the ant with each of these four circles were recorded. The lengths of the detour vectors were defined as the distance from the intersection of the trajectory with the imagined extension of the barrier to the endpoint of the trajectory. This point was judged by eye; it is characterised by a deviation of at least 90° from the previous mean running direction of the ant. In addition, the walking distance along the barrier immediately before the ant turned round it was recorded. Results are presented as means ± S.D.
In experiments without a barrier, the direction of the first points of intersection of the trajectories of the ants with concentric circles (radii 1, 2, 3 and 4 m) centred on the point of release was determined.
Statistical treatment of circularly distributed data
The Rayleigh test was used to test whether sample points were distributed non-randomly. To test whether mean angles differed from expected directions, 95 % confidence limits were used. The MardiaWatsonWheeler test was applied to detect differences between the mean angle and/or angular variance of two samples (Batschelet, 1981).
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Results |
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Ants caught at the feeder (vector ants) and released at the geographical position of the feeder relative to the test barrier (the fictive feeding site) chose their preferred detour around the barrier in 86 % of cases (N=22). Although the ants had performed several foraging trips in the training area before they were tested, none of them took the short cut from the release point to the end of the barrier. Instead, all the ants headed towards a point close to the tip of the V-shaped barrier and then ran alongside the barrier for a distance of 5.7±1.3 m (N=19). This value did not differ significantly from the mean distance that the zero-vector ants had walked along the barrier immediately before turning around it (5.0±2.6 m, N=68; P=0.8, z=0.206, MannWhitney test).
In zero-vector ants, the mean lengths of the detour vectors were the same irrespective of the test situation (barrier in training orientation, 5.1±2.0 m, N=25; barrier rotated through 45°, 5.3±1.7 m, N=43; P=0.8, z=0.318, MannWhitney test). However, the mean lengths of the detour vectors differed between zero-vector ants and vector ants (P=0.02, KruskalWallis test). In addition, the mean lengths of the detour vectors for vector ants (6.7±2.0 m, N=19) closely corresponded with the distance from the end of the barrier to the fictive location of the nest (7.2 m, P>0.2, t-test), while the corresponding path lengths in zero-vector ants were significantly shorter (5.1±2.0 m, N=25, P<0.001, t-test).
To justify the use of the term detour vector, we compared the mean lengths of detour vectors of vector ants, which are assumed to have their home vector (nest-to-feeder) still to be paid out, with those of zero-vector ants with the barrier in the training and in the rotated positions. The distributions of detour vector lengths pertaining to these three experimental situations could not be distinguished statistically (P=0.6, KruskalWallis test). Detour vectors in zero-vector ants therefore seem to have a defined length, although this length was too short to cover the distance between the edge of the barrier and the fictive position of the nest relative to the barrier.
Direction of the detour vector with the barrier in the training orientation
After passing the barrier, both vector ants (Fig. 2A) and zero-vector ants (Fig. 2B) continued in a direction that led towards the fictive position of the nest relative to the barrier. There was no difference between the mean directions and angular variances of the detour vectors exhibited by vector ants and zero-vector ants (Fig. 3).
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Discussion |
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According to the hypothesis that detour vectors are stored as a constant bearing as local vectors sensu Collett et al. (1998), the direction of the detour vector should have been the same irrespective of whether the barrier had been rotated (see Introduction, hypothesis 1). This was not the case. There are two possible explanations to account for this result. First, the ants might have remembered a constant direction relative to their previous walking direction along the barrier and thus might have defined the direction of the local vector within an egocentric system of reference (see Introduction, hypothesis 3). Alternatively, the sight of the landmark might have guided the ants (see Introduction, hypothesis 2). An example of the latter hypothesis was recently reported using a somewhat similar experimental paradigm. In this case, the obstacle consisted of a large black wall placed at right angles to the home vector of the ant (Collett et al., 2001
).
Compared with the obstacle used in the present study (sand-coloured, height 5 cm, visual angle seen from the feeder 0.4°), the obstacle in the wall experiment was very conspicuous (black, height 50 cm, visual angle seen from the feeder 5°). This difference affected the behaviour of the ants when they approached it during training. In the experiment using a black wall, most of the ants returning from the feeder (eight out of 11 recorded training trajectories) headed directly towards the end of the wall, indicating that the sight of the black wall guided the trajectories of the ants on their entire homing trip. In contrast, ants trained with an inconspicuous barrier, as in the present experiments, never took a shortcut to the end of the barrier. Even after lengthy training, they always ran first to a point close to the tip of the V-shaped barrier and then walked along the obstacle before they finally turned round the end. The barrier seemed to be noticed only after the ants had approached it closely. After the ants had turned round the edge of the barrier, it became inconspicuous because of the ramp of sand attached to the nest-side of the obstacle. Hence, we can exclude hypothesis 2 and conclude that the directional choices of the ants seem to be defined within an egocentric system of reference (hypothesis 3).
The existence of hypothesis 3 detour vectors associated with a running direction along an almost invisible obstacle can also be inferred from other recently published data (Collett et al., 1998). In these experiments, desert ants were trained to run the first part of their homeward journey from a feeder to the nest inside a narrow east-pointing channel that forced them to deviate from their straight homebound path. Having left the channel, the ants had to make a 90° turn to the right and run further in this southward direction to reach their nest (Fig. 7A). Since the channel was hidden in a trench, visual stimuli were absent after the ants had left the channel. Zero-vector ants were tested in channels of different lengths rotated through 45°. If the test channel had the same length as during training, the ants behaved according to either hypothesis 1 or hypothesis 3: half walked southwards, while the others made a 90° turn to the right at the end of the channel (Fig. 7B). Ants released in a test channel half the length of the training channel, however, seem to follow a compromise course (Fig. 7C). Only if the rotated test channel was reduced to a quarter of the training length did the ants display allocentric local vectors (hypothesis 1, Fig. 7D).
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The ants in our experiments might even have relied on a fixed motor sequence on their entire return trip to the nest because, during training, they were constantly kept from following their home vector by the presence of the barrier. Some vertebrates are able to learn fixed pathways in a cluttered, familiar environment without reverting to external signals; for example, shrews (Grünwald, 1969), rats (Gallistel, 1990
) and hamsters (Georgakopoulos and Etienne, 1994
). A similar behaviour was reported for honeybees trained to follow a complex route through a series of obstacles to reach a feeder. After the obstacles had been removed in a test, the bees continued to fly the same detour trajectory that they had followed during training when the obstacles were present (Collett et al., 1993
).
The desert ants behaved differently in a corresponding test situation: if the ants that had been trained with the barrier were released at the test area without any barrier, they followed their global home vector (feedernest) although they had never been able to do so during training (Fig. 8). The mean length of their homebound runs within the test area (13.1±2.7 m, N=18) was not significantly different from the net foraging distance (13 m, P=0.9, t-test). The detoured homebound path was not, therefore, governed solely by a stereotyped sequence of motor instructions but was initially guided by the home vector, which is thought to be defined within an allocentric system of reference, the skylight compass (Wehner, 1982
). Hence, desert ants seem to be able to use both allocentric and egocentric systems of reference during a single foraging excursion if they encounter obstacles that force them to deviate from their straight homing course.
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Acknowledgments |
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References |
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Batschelet, E. (1981). Circular Statistics in Biology. New York, London: Academic Press.
Collett, M., Collett, T. S., Bisch, S. and Wehner, R. (1998). Local and global vectors in desert ant navigation. Nature 394, 269272.
Collett, T. S., Collett, M. and Wehner, R. (2001). The guidance of desert ants by extended landmarks. J. Exp. Biol. 204, 16351639.
Collett, T. S., Fry, S. N. and Wehner, R. (1993). Sequence learning in honeybees. J. Comp. Physiol. A 172, 693706.
Gallistel, C. R. (1990). The Organization of Learning. Cambridge, MA: MIT Press.
Georgakopoulos, J. and Etienne, A. S. (1994). Identifying locations by dead reckoning and local cues. Behav. Proc. 31, 5774.
Grünwald, A. (1969). Untersuchungen zur Orientierung der Weisszahnspitzmäuse (Soricidae-Crocidurinae). Z. Vergl. Physiol. 65, 191217.
Schmidt, I., Collett, T. S., Dillier, F. X. and Wehner, R. (1992). How desert ants cope with enforced detours on their way home. J. Comp. Physiol. A 171, 285288.
Stamps, J. (1995). Motor learning and the value of familiar space. Am. Nat. 146, 4158.
Wehner, R. (1982). Himmelsnavigation bei Insekten. Neurophysiologie und Verhalten. Neujahrsbl. Naturforsch. Ges. Zürich 184, 1132.
Wehner, R. (1987). Spatial organization of foraging behavior in individually searching desert ants, Cataglyphis (Sahara desert) and Ocymyrmex (Namib desert). In From Individual to Collective Behavior in Social Insects (ed. J. M. Pasteels and J.-L. Deneubourg), pp. 1542. Basel: Birkhäuser.
Wehner, R., Michel, B. and Antonsen, P. (1996). Visual navigation in insects: coupling of egocentric and geocentric information. J. Exp. Biol. 199, 129140.
Wehner, R. and Srinivasan, M. V. (1981). Searching behaviour of desert ants, genus Cataglyphis (Formicidae, Hymenoptera). J. Comp. Physiol. A 142, 315338.
Wehner, R. and Wehner, S. (1986). Path integration in desert ants. Approaching a long-standing puzzle in insect navigation. Monit. Zool. Ital. (N.S.) 20, 309331.