Longevity-Mass for mammals and birds falls approximately in a triangle

To comprehensively study the geometry of life history space of endothermic animals (mammals and birds), we analyzed a large dataset of life history traits taken from AnAge build 13 [43]. We filled some of the gaps in the database by literature search, adding 20 longevity values for species with missing data, and 168 values for other life history traits (Table 1 summarizes the taxa, and S1 Table lists the entire data). We also added brain size from a different source [17] resulting in 324 additional entries. We analyzed species with both mass and longevity known, resulting in a dataset with 2105 endotherms, each with 13 relevant life-history features (See Methods and S1 Table).

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Table 1. Summary of taxa used in this manuscript.

https://doi.org/10.1371/journal.pcbi.1004524.t001

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Table 2. Mass and longevity of selected animals.

https://doi.org/10.1371/journal.pcbi.1004524.t002

We begin by focusing on mass and longevity (Fig 2A). We find that the data is much better explained by a triangle (the minimal area triangle enclosing the data up to a defined number of outliers is shown in Fig 2A, see Methods, and S1 Text) than by a line such as an allometric power law (Fig 1B), as well as higher order polygons such as a four-vertex polygon (quadrangle). Statistical model selection tests (Akaike information criterion, cross validation tests) indicate that a triangle is a better fit than a line, even when taking into account that fitting a triangle requires more parameters than a line (see Methods). Fits to higher order polygons (quadrangle, pentagon etc.) do not provide enough improvement in fit quality to justify their extra parameters. We also tested the statistical significance that a triangle describes the data by comparison to randomized data, according to a test developed in [35], (p = 0.005, see Methods). We conclude that a triangle is a good description of the geometry of the data in the log mass-log longevity plane.

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Fig 2. The longevity-mass data set is well described by a triangle in log space.

(a) Placental mammals (blue), birds (red) and marsupials (green) are presented in a log-log plot, black lines represent the best fit triangle and the three ellipses on the vertices represent the position and error of the archetypes determined by bootstrapping (see Methods). (b) Bats, naked mole rat are close to the B archetype. (c) Marsupials cover much of the same triangle. (d) Primates are close to the B archetype, flightless birds are far from it.

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We also asked whether the way longevity is defined- the longest lived animal on record- may affect the geometry. We aimed to allow for a shorter longevity value for each species, perhaps reflecting natural conditions. We thus generated a dataset in which longevity of each species was multiplied by a random number between 0.8 and 1.0, thus shortening its longevity entry. We find that a triangle still significantly fits the data in over 95% of 1000 such randomly perturbed datasets (See S1 Text).

Two of the edges of the mass-longevity triangle are approximately parallel to the axes. The third edge has a slope of 0.274±0.007. This value agrees with the ¼ allometric relation between mass and longevity (Fig 2A), L ∼ M^1/4. Linear regression applied to the full dataset also gives a slope close to ¼, when ‘outliers’ such as bat species are removed, explaining previous findings of an allometric ¼-law.

The three vertices of the triangle correspond–in Pareto theory- to archetypes. The error in the vertex position is about 3% as estimated by bootstrapping (Fig 2A). The first archetype is close to high mass–high longevity species such as whales, elephants, and the hippopotamus. We name this the W-archetype, for whales. The second archetype is next to species of low mass and low longevity such as shrews, mice and hummingbirds. We name it the S-archetype, for shrews. The third archetype is near low mass—high longevity species. These include bats and the bat-like myotis, the naked mole rat, and birds like canaries. We name this the B-archetype for bats (for values of mass and longevity see Table 2).

Flying birds lie in a region closest to the B (bat) archetype (Fig 2A). Marsupials (in green) are spread over much of the triangle (Fig 2C). Non-flying birds lie farthest from this archetype (Fig 2D). Primates are relatively close to the B archetype (Fig 2D), as are arboreal squirrel species (S1 Fig).

A phylogenetic analysis of this dataset shows that above the taxonomic level of family, the position on the triangle cannot be wholly explained by phylogenetic history (S2 Text and S2 Fig).

The S-archetype (shrews, rodents) with short lifespan and high predation is enriched with high litter size and litter frequency

We next asked which tasks might be at play in each archetype. We approach this by looking for commonalities in the species near the archetypes. Quantitatively, we ask which life history features (other than mass or longevity) are maximal or minimal at the archetype. If Pareto theory is applicable, certain traits should be maximal or minimal in animals closest to the archetype; these traits should decline (or rise) with distance from the archetype.

The S-archetype lies at low mass and short lifespan. The closest animals are shrews and rodents (orders Rodentia and Soricomorpha). We tested 11 different life history traits of the animals from the AnAge database [43] as a function of their distance from the S-archetype. We normalized traits with units of time (female maturity, weaning, inter-litter interval) by the organism lifespan, and normalized traits with units of mass (birth weight, weaning weight) by the adult weight, to obtain dimensionless traits. Some information was lacking in the database, because some species had missing trait values (Ranging from 82% for Body temperature to 28% for Litter/Clutch size).

To search for enriched (depleted) features next to the archetypes, we followed the algorithm of Ref [37]. Briefly, we divided species into bins according to their distance from a given archetype, such that each bin had the same number of species. Then, we looked for features that have significantly maximal (minimal) values in the bin next to an archetype. According to Pareto theory, traits associated with the task of the archetype should have their maximal or minimal value at the bin closest to the archetype.

We find (see Methods, S3 Text, including multiple hypothesis tests) that several life history traits are highly enriched near the S-archetype (Fig 3 and Table 3). Specifically, two traits associated with high reproduction rate—litter/clutch size and litter/clutch per year—are both maximal at this archetype. In addition, normalized brain size (for mammals) is highest at this archetype, as well as the relative gestation/incubation period relative to lifespan (see Fig 3).

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Fig 3. Each archetype is enriched with specific life-history traits.

Trait values are plotted versus distance from an archetype. Species were binned to equal sized bins according to distance from an archetype. Median trait value in the bin normalized by median trait value in the dataset is shown, error bars are from bootstrapping. Curves for features enriched significantly at an archetype are marked with an asterisk (listed also in Table 3). Bin size selection is explained in S3 Text.

https://doi.org/10.1371/journal.pcbi.1004524.g003

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Table 3. Enrichment analysis of the archetypes.

https://doi.org/10.1371/journal.pcbi.1004524.t003

The enrichment for these traits is rather sharply peaked at the bin closest to the archetype, and falls off rapidly with distance from the archetype. This is the behavior expected from Pareto theory. These results support the conclusion that a task including rapid reproduction, many offspring, and rapid growth is maximized at the S-archetype. This inference makes sense: these animals are generally thought to face high predation. High predation has been suggested as an evolutionary pressure for resource allocation to early life, which correlates with short lifespan [1,8,44] in mammals (but see exception [45] in guppies). The tasks most important in this situation may be rapid reproduction, many offspring, and rapid growth [27].

The S-archetype is a point deduced from the overall shape of the dataset- an extrapolated vertex of a triangle that encompasses the dataset; the region in the immediate proximity of the S-archetype is empty. This is because the endotherms in the dataset do not have longevity shorter than 2 years. There may be a physiological or ecological limit that prevents endotherms from going below a minimal longevity. For example, the heart-rate of mammals smaller than a shrew is expected to approach the physiological limitations of the circulatory system [46].

W-archetype (whales, elephants) with large mass, long-term survival and low predation is enriched with low clutch-size and clutch-frequency

The closest animals to the W-archetype are whales, elephants, hippopotamus and orcas, which have large mass and high longevity. Enrichment analysis shows that at this archetype, animals have relatively long gestation/incubation periods. They have smallest and least frequent clutches/litters [47] (Fig 3). They have a relatively small brain compared with their mass. Again, the enriched traits are maximal at the bins closest to the archetypes, and decay with distance from the archetype.

The task inferred for this archetype is appropriate for these large animals according to previous literature. High mass may allow them to escape predation, so that selection pressure to live longer becomes more meaningful [48–50]. Furthermore, they invest resources in a single offspring, which probably has good odds to reach adulthood.

B-archetype (bats, naked mole rat) corresponds to a protected niche that provides long term survival and low predation, and is enriched with high relative weaning weight, low relative gestation and incubation

The third archetype, the B-archetype, has a low mass (close to the mass of the S-archetype) but high longevity values (almost half of the longevity of the W-archetype). The animals closest to this archetype are bats, the naked mole rat, and many songbirds such as the Eurasian goldfinch, Broad-tailed hummingbird and Purple sugar bird. These species are thought to have lower extrinsic mortality rates by finding niches that reduce the number of possible predators. Both bats and birds fly, whereas the naked mole rat lives underground.

Somewhat farther from the archetype are arboreal species (primates, Southern flying squirrel, Pygmy marmoset, Sugar glider), which also have relatively low predation due to their niche (Fig 2) [10,51]. Among birds, there appears to be a correlation between flying ability and the distance from this archetype, where the birds farthest from this archetype are flightless, such as the penguin, ostrich and hen (Fig 2D). Related species occur in layers at different distance from this archetype, suggesting different levels of protective environments. The bats are closest to the archetype, then the primates. In a similar distance from the archetype are the family of Sciuridae (squirrels), and farther away a strip with a high concentration of “armored” species such as hedgehogs, pangolin, armadillos and porcupines (S1 Fig).

Enrichment analysis indicates that species closest to the B-archetype have shorter pregnancies (or incubations) relative to lifespan. They wean the fastest relative to their longevity. This means that a larger part of their life is spent in puberty and adulthood. Compared to their mass, these species have large brain and they are born large and wean large. (Fig 3) These traits are maximally enriched at the archetype and decay rapidly with distance from it.

Evidence for a fourth archetype–large predators

We went beyond two-dimensional trait-space of mass and longevity, by considering additional life history traits. One challenge is missing data- many of the 13 traits in the database are sparsely filled. We therefore chose the four traits with the most data, in the sense that there is the largest number of species in the database with all four traits available. These traits are mass (adult weight), longevity, female maturity and birth weight (see Methods). There are 550 mammals with data in all four traits. We removed 142 marsupials from the dataset, because birth weight in marsupials has a different physiological context and clusters far from other mammals.

We analyzed the species in this four dimensional trait space. We performed principal component analysis (PCA) to determine the effective dimensionality of the data. We find that the first 3 PCs capture ~99.5% of the variance (p < 10⁻⁴ compared to shuffled data).This suggests that data falls effectively in three dimensions. The three PCs are loaded heavily with the following traits: PC1 is related to mass (adult weight and birth weight), PC2 to time (longevity and female maturity), and PC3 to the ratio between the adult weight and birth weight.

We went on to test whether the data can be reasonably described by a polyhedron in this three dimensional space (Fig 4A). We find that a tetrahedron captures the data well, and with high significance compared to randomized data (p < 2⋅10⁻⁴) [37] (see Methods). Higher-order polyhedra do not improve the fit to justify their extra parameters (Methods).

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Fig 4. Mammalian species fall approximately in a tetrahedron when considering a higher dimensional space of life-history traits.

(a) Axes are linear combination (PCs) of: adult weight, birth weight, longevity, and female maturity. PC1 is primarily related to mass (adult weight and birth weight), PC2 to time (longevity and female maturity), and PC3 to the difference between the adult weight and birth weight. The archetypes B, S, and W are indicated, and the new fourth archetype is marked by X. Species closest to the fourth archetype are indicated. The best fit tetrahedron is indicated in grey dashed lines; vertices (archetypes) are marked in red. (b) The new archetype (X) falls near the middle of the mass-longevity triangle. (c-e) The projections of the data and tetrahedron on the three principal planes are shown for additional perspective.

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Fig 4C–4E shows this tetrahedron from three points of view in the space of the first 3 principal components. The tetrahedron has four vertices, which we consider as four archetypes. Three of the archetypes match those we discussed so far. The fourth archetype lies at an intermediate point of mass-longevity (M~3.5kg, L~18 years) (Fig 4B), and at low birth weight. The animals nearest this archetype are the panda and bears, while somewhat farther are other carnivorous mammals (order Carnivora including the feline family—lions and tigers, and the canine family wolves). Enrichment analysis did not supply significant enrichment of other life-history traits at this archetype, perhaps due to the small number of data points. The potential task or strategy related to this archetype is thus mainly performed by large predators.

Pareto theory offers an explanation of triangles in trait space

We conclude by discussing previous work in the context of Pareto theory. In the field of life history, several triangle-shaped suites of variation were found in the past (summarized in S2 Table). Grime [52] considered a trait space of plants, including life history traits such as leaf longevity and litter, and morphological traits such as root morphology and leaf from. This study identified three syndromes of traits that go together. Each syndrome is specialized for a different strategy: stress tolerant (S), ruderal (R), and competitive (C), which apply to extreme niches: High stress and low disturbance, low stress and high disturbance, and low stress and low disturbance. The C, S and R survival strategies can be considered as tasks. The CSR model is widely used when describing plants life history strategies, and was implemented also to reef corals [53] and fungi [54]. The original CSR model by Grime was depicted in performance space, by triangle whose vertices represent each strategy. More recent work [53] analyzed trait space using principal coordinate analysis (PcoA), to find that high dimensional trait data falls approximately on two dimensions. Projecting on this 2D plane, data falls in a triangle, with generalists in the middle and specialist at each strategy towards the vertices. This series of studies fits well with Pareto theory, where the vertices of the triangles in trait space define three archetypes, whose traits correspond to Grimes syndromes.

In another pioneering study [55] a triangle was found in the life history trait space of fresh and marine fish. Here the triangle was found in trait-space defined by the measured juvenile survival, fecundity, and onset and duration of reproductive life. The three strategies (tasks) matching three niches in this case are: (i) periodic strategy in environments with predictable patterns of change, (ii) opportunistic strategy in marginal habitats and large predation, and (iii) equilibrium strategy in temporally stable and resource limited environments. Evidence for a triangle due to different resource limitations was found in phytoplankton, where competitive ability for nitrate, phosphate as well as cell volume exert tradeoffs [56]. In many of these studies it is noted that the strategies described are extremes, while intermediate strategies lie in the middle of the triangle. These studies thus seem to be consistent with predictions of the Pareto theory of Shoval et al.

Life-history data

Data was downloaded from AnAge database of animal longevity, build 13 [43]. We considered 13 traits: female maturity (days), male maturity (days), gestation/incubation (days), weaning (days), litter/clutch size, litters/clutches per year, inter-litter/interbirth interval, birth weight (g), weaning weight (g), adult weight (g), maximum longevity (yrs), metabolic rate (W), and temperature (K). Maximum longevity is manually curated data on the oldest age on record [63]. Values of other traits were averaged across measurement methods, geographical location and literature source [63], with field data preferred over captive data. When there was a substantial difference between age at sexual maturity and age of first reproduction, the former was used. Sexual maturity is defined as the time from conception to physiological sexual maturity [9]. Further information about AnAge database can be found in refs [9,43,63] and on the website: http://genomics.senescence.info/help.html#anage.

Four traits in the AnAge database were not used: growth rate because it is a fitting parameter of a model where for birds and mammals different models were used, body mass because it strongly and tightly correlates with the adult weight entry; we also did not use mortality rate doubling time (MRDT) for a given species using the Gompertz equation and the infant mortality rate (IMR). Because of missing data, we added to this dataset information from several sources on longevity and other life history traits [64–67]. We consider only species with data in both adult weight and longevity (S1 Table lists the data), which amounts to 2105 endotherms (rows), each with its taxonomic tree and 13 relevant life-history features (columns). See Methods for more details. We also added the brain size from [17]. We took only the species from this database that existed on AnAge this resulted in 324 values for brain size.

Fit to polygons and model selection

We tested several models for the log mass-log longevity data. This includes a linear fit, l = am + b, a triangle enclosing he data and more generally an n-vertex polygon. We first used the PCHA algorithm to find the best n points on the convex hull of the data that accounts for most of the variance in the data as described in [41]. A line is defined by two archetypes, a triangle by three etc. For each number of archetypes n, we compute the explained variance given by the mean relative distance of the N data points to the polygon . Here p_i is the ith data point and s_i is the closest point to p_i in the polygon [41,68]; points inside the polygon have ‖p_i − s_i‖ = 0. The normalization term ‖p_i‖, refers to the distance to the center of mass of all the data points. We seek a number of archetypes for which adding an additional archetype does not increase EV by much. We find that explained variance for n = 2, 3, 4, 5 is EV = 0.9711, 0.9989, 0.9993, 0.9999. Thus a triangle is better than a line, and four-vertex or five-vertex polygons make only a tiny improvement over the triangle (2% vs. 0.04%).

We approached model selection also in a second way, by using a criterion that takes into account the number of free parameters in the model, namely the Akaike information criterion (AIC)[69]. The first step in calculating AIC is to calculate how likely each model is. Likelihood is calculated by assuming that the data was drawn from a distribution (the model). According to standard practice, we used a Gaussian error model: the convolution of the line/triangle/polygon with a Gaussian to account for the possibility of noise. The standard deviation of the Gaussian distribution was chosen to be 30% of the value at the data-point. Similar results were obtained with a 10% or 100% std. In all of these cases the triangle was overwhelmingly more likely than a line (AIC/2 ~–log likelihood ~ 7500, 3600 for line and triangle in the 30% case, 56000, 5600 for the 10% case, and 4300, 3900 in the 100% case). A triangle was more likely than a 4-vertex model for the 30% and 100% cases.

Statistical significance of triangle

To estimate the statistical significance of the description of the data by a triangle or a tetrahedron (polygon), we calculated the t-ratio. The t-ratio is the ratio of the polygon’s volume to the volume of the convex hull of the data [35]. It is a measure for the extent that the data fills the polygon. A t-ratio of one occurs when the data convex hull is exactly the desired polygon. We then generate randomized datasets by sampling from the cumulative distribution created by each coordinate independently from its ensemble of measured values. This eliminates correlations between traits while conserving the distribution of values of each parameter. We calculate the t-ratios for each randomized dataset in comparison to its own minimal volume enclosing polygon, and set the p-value to be the proportion of randomized sets with a smaller or equal t-ratio than the original data. See S1 Text for more details.

Archetype position and error

In order to determine the position of the three archetypes on the mass-longevity plane we used the algorithm described by Shoval et al. [35]. This algorithm finds the minimal triangle enclosing all the data point, without allowing any outliers. To be robust to outliers, we applied a peeling procedure–removing the convex hull of the data. We repeated this procedure, and after each peeling we looked for the archetypes of the new dataset. The change of position of the W archetype was large after one peeling step (~17% of the large edge of the triangle), but remained relatively unchanged after more peelings (~3%). Thus, the final position of the archetypes presented here is given after the data was peeled once.

All the data points inside the polygon obey the rule, X = θA. Here, X is the matrix of the data (namely, mass and longevity), A is the matrix of the archetypes, where each column is a different archetype and θ is the weight vector representing the compromises between the tasks (archetypes). For each data point ∑θ_i = 1. For every point inside the triangle ∀θ_i ≥ 0. Values of theta are given in S1 Table.

We computed the uncertainty of the archetype positions by bootstrapping, resampling the 2105 data point with replacements and computing the new triangle archetypes. We obtained archetype position distribution by repeating this procedure 1000 times. The standard deviations of the archetype positions are depicted as ellipses in Fig 2.

Phylogeny and position on the triangle

The intersection between the data in the phylogeny of [70] and the present dataset includes 966 mammals. We represented each data points by its first two weights (the third is determined by the demand that ∑θ_i = 1). On this resulting triangle we measured distance of two species, d, by the Euclidean distance between the points. The distance on the phylogenetic tree was measured as the shortest path distance, namely, for each two species, we looked for their nearest common ancestor, and summed the length (years) of the branches leading to each species (see S2 Text and S2 Fig).

Enrichment

For each archetype, we divide the data into equally populated bins according to their distance from the archetype. Bin size was determined using a bootstrapping test (see S3 Text). Then we check whether the median of each trait in each bin is maximal (or minimal) with respect to the rest of the bins. We then test whether the distribution of points in the first bin is significantly different than the rest of the data (the Mann-Whitney test [71]). Then we used the Benjamini-Hochberg procedure for multiple hypothesis testing [72]. All the enriched features in Table 3 are significant after the multiple hypothesis testing. For further explanations on the way we tested for feature robustness and the choosing of bin-size see S3 Text.

Higher dimensional trait space and the fit tetrahedron

We scanned all 715 possible combinations of four traits of the 13 in the database, and chose the four traits with the largest number of species that have data on all four traits. We found the best fit tetrahedron using SISAL algorithm [73], evaluated the errors in archetypes by bootstrapping (12% errors), and the significance by the t-ratio test (p < 2⋅10⁻⁴).