Stochasticity
Up until this point, we have assumed that populations are controlled
by population growth rate (\(r=b-d\)),
carrying capacity (for the logistic model), or transitions between
stages (in the matrix population modeling section). But all of these
assume that if these parameters can be estimated, that the populations
follow the same trajectory (i.e., deterministic). That is, if
we started with 20 identical populations, these models would assume that
these populations changed through time in the exact same manner. But
this isn’t really what we observe in natural systems.
So how do we incorporate this variability caused by the probabilistic
and whole number nature of populations (i.e., individuals come in
discrete units (1,2,3…)), and environmental variability on resulting
population dynamics? These forces collectively are referred to as
stochasticity. There are at least two different types of
stochasticity, demographic stochasticity and environmental
stochasticity.
Demographic stochasticity:
The term “demographic stochasticity” appears to have been coined by
the Australian theoretical ecologist Robert May in 1973. Demographic
stochasticity represents the random fluctuations in population size that
occur because the birth and death of each individual is a discrete and
probabilistic event. The probability of birth or death applies to the
individuals. In other words, an individual is either born or it is not,
or an individual dies or it does not; a bird can lay 2 or 3 eggs but not
2.6. When these discrete events are probabilistic they lead to random
fluctuations in population size; and the population size can no longer
be projected precisely.
A simple example: \(N_{t+1}=\lambda
N_t\), let’s say \(\lambda = 2\)
and \(N_0 = 6\); then we’d predict
\(N_1 = 2 * 6 = 12\) with the
deterministic model. Now let’s say one female individual can produce
either one female or three female offsprings with equal probability.
Clearly, on average, two female parents will leave four female
offsprings, so \(\lambda = 2\). Now,
let’s flip coins to construct some numeric examples: head - one female
offspring, tail - three female offsprings.
| 1 |
h - 1 |
t - 3 |
h - 1 |
t - 3 |
t - 3 |
| 2 |
t - 3 |
h - 1 |
h - 1 |
t - 3 |
t - 3 |
| 3 |
t - 3 |
t - 3 |
h - 1 |
h - 1 |
t - 3 |
| 4 |
h - 1 |
h - 1 |
t - 3 |
h - 1 |
t - 3 |
| 5 |
t - 3 |
t - 3 |
t - 3 |
h - 1 |
h - 1 |
| 6 |
t - 3 |
h - 1 |
h - 1 |
t - 3 |
h - 1 |
We can consider a population at time \(t\). Not all individuals in the population
will give birth to the same number of individuals, and often a Poisson
distribution is used to model the number of offspring per individual.
This is a count distribution (1,2,3,…n) with a long tail (most
individuals have few offspring, and few individuals have many
offspring). If we draw from this distribution for each individual, we
introduce some randomness in the number of individuals in the population
at time \(t+1\). The probability of a
birth can be estimated as:
\[P(birth) = \frac{b}{b+d}\]
Another form of demographic stochasticity would be to consider death
of each individual as a bernoulli process (e.g., a coin flip). That is,
at each time step, an individual may die with some probability \(d\). So at time \(t\), we can flip a coin with some
probability of death \(d\) and some
probability of not death \(1-d\). This
is another method to introduce stochasticity. The probability of a death
can be estimated as:
\[P(death) = \frac{d}{b+d}\]
It is interesting to note here that demographic stochasticity will
disproportionately influence small populations. That is, as population
size goes to infinity, the effects of demographic stochasticity go to 0.
But when populations are small, the potential set of outcomes (including
extinction) is rather broad. The most important consequence of
demographic stochasticity is an increased probability of extinction in
small populations.
\[P(extinction)=(\frac{d}{b})^{N_0}\]
Even though the exact population size can not be projected precisely,
we can still calcullate the average population size and its
variance.
\[\bar{N_t} = N_0e^{rt}\]
The variance of population size at time \(t\) depends on whether the birth and death
rates are equal or not. If birth and death rates are equal (i.e., \(r = 0\)):
\[\sigma^2_{N_t} = 2N_0bt\]
If birth and death rates are not equal:
\[\sigma^2_{N_t} =
\frac{N_0(b+d)e^{rt}(e^{rt}-1)}{t}\]
Environmental stochasticity
A second form of stochasticity is environmental stochasticity. This
form of stochasticity influences populations by changing birth and death
processes of all individuals in the population across time. So
demographic stochasticity introduced randomness at each time step by
considering the outcome of birth or death a random variable, whereas
environmental stochasticity will consider the influence of the
environmental conditions on resulting birth and death. This means that a
death rate of 0.1 at time \(t\) may
change to a death rate of 0.15 (or 0.05) at time \(t+1\). By drawing birth and death rates
randomly from a set of feasible values (e.g., a normal distribution), we
can introduce stochasticity into population dynamics.
\[r \sim Normal(\bar{r},
\sigma^2_r)\]
Unlike demographic stochasticity, environmental stochasticity is not
density-dependent (i.e., the effect of environmental
stochasticity is the same in small and large populations).
Mean population size:
\[\bar{N_t} = N_0e^{\bar{r}t}\]
Variance in population size:
\[\sigma^2_{N_t} =
N_0^2e^{2\bar{r}t}(e^{\sigma^2_rt}-1)\]
Extinction from envrionmental stochasticity will almost certainly
happen if the variance in \(r\) is
greater than twice the average of \(r\): \(\sigma^2_r>2\bar{r}\).
Dispersal
Dispersal of individuals in a population is a natural process.
Dispersal is an important aspect of population dynamics can it can
increase or decrease local population densities. Dispersal being defined
as the movement of individuals in a way that allows gene flow (i.e.,
movement of an individual from one population to another). This is not a
very satisfying definition without knowledge of the local population
genetic structure, so we can simplify this, defining dispersal as the
movement of individuals beyond their normal home range. The
home range of an individual is the geographic area the individual
typically encounters. So dispersal puts the individual in a new
environment, which can beneficial for resource acquisition and mate
finding. Dispersal is also necessary for sedentary organisms, as
propagules (e.g., seeds) must somehow travel to suitable new
conditions.
Dispersal can either be active or passive.
Active dispersal is when the individual (or propagule)
moves to a new habitat by its own accord (e.g., a mouse moving to a new
burrow).
Passive dispersal is when an individual (or propagule)
moves to a new habitat with assistance from wind, water, or animal
assistance (e.g., plant seeds dispersed by frugivores).
This is not a plant/animal divide (e.g., sponges and corals). For
instance, many crustacean zooplankton (microscopic organisms which
inhabit aquatic environments) may be dispersed by animals or wind. Many
pathogenic bacteria and fungi of plants are dispersed by wind or water
droplets during rain events.
It is also important here to differentiate dispersal from
migration. Dispersal is an individual-based process of
movement, often involving the movement of young away from their parents
(e.g., in the extreme case, seeds, in a less extreme case, squirrels).
Migration is the movement of a large number of individuals from one
place or another, usually due to climatic cues, and typically with the
intention of reaching a particular breeding ground (e.g., salmon) or
tracking a resource (e.g., cicadas).
Phases of dispersal
Regardless of the mode of dispersal, the act of dispersal involves
three phases: departure, transfer, settlement. There are different
fitness costs and benefits associated with each of these phases.
- departure: the individual moves from the current habitat
- transfer: the individual makes the journey to the new habitat
- settlement: the individual establishes itself in the new
habitat
So this means that dispersal isn’t just the movement of an individual
from one place to another, but the individual has to survive. This is an
important distinction.
Dispersal as a process
Dispersing individuals tend to settle and establish near their
original location. This is because each stage of dispersal comes with a
cost, and longer distance dispersal events tend to be rare (as mortality
increases with increasing dispersal distance). But even if this weren’t
the case, most individuals disperse short distances, while a small
number of individuals will disperse long distances. This leads to a
characteristic dispersal kernel. The dispersal kernel is a
probability distribution of a given individual reaching a given patch
during one dispersal event.
Many have claimed that dispersal is a neutral process, while others
have argued that multiple cues are used by individuals deciding to
disperse. So let’s first start with the assumption of neutrality and get
an idea of what this would look like.
Neutral dispersal
Neutral dispersal would suggest that all individuals have the same
probability of dispersing one unit of distance. We then allow dispersal
to happen probabilistically across a landscape, with each individual
dispersing some number of units. By chance, a population initiated in
some area will spread out in space. It is important to note that neutral
dispersal can produce a dispersal kernel similar to empirical systems.
Let’s look at this.
If you have a linear landscape composed of 10 sites and we consider
individuals dispersing from the far left site, probabilities of
dispersal between patches are equal for all individuals, and are a
function of distance. If all patches are equidistant, we have some
probability \(p\) of going from patch
\(i\) to patch \(i+1\). The probability of going from patch
1 to patch 3, for instance, is \(p^{2}\). The probability of going from
patch 1 to patch 4 is \(p^{3}\). This
creates a geometric distribution (as a discrete distribution) or a
negative exponential dispersal kernel (as a continuous
distribution).
Thus, neutral dispersal dynamics do capture some characteristics of
dispersal in natural systems. However, while neutral dispersal is a good
null expectation, we will now discuss how individuals use social
information to inform dispersal decisions.
Variation in individual behavior
The dispersal kernel for a given population or species suggests that
the probability of an individual dispersing \(x\) distance is relatively predictable if
we know the shape of that distribution. But this doesn’t consider the
influence of three important things.
First, individuals may intrinsically vary in their propensity and
ability to disperse, and will vary in their dispersal distances. We can
imagine that species body size, wing size, genetics, body condition,
etc. will all influence both if the individual disperses and
how far the individual disperses.
Second, abiotic factors can strongly influence dispersal probability
(i.e., if the individual disperses) and dispersal distance.
Third, species dispersal behavior is influenced by species
interactions. The obvious example would be if the individual is
surrounded by predators, it may not want to disperse and risk mortality.
But individual dispersal behavior can also be limited by other
individuals of the same species. That is, species density influences
dispersal behavior.
The influence of density on dispersal behavior
Density-independent dispersal: Organisms have evolved
adaptations for dispersal that take advantage of various forms of
kinetic energy occurring naturally in the environment. This is referred
to as density independent or passive dispersal and operates on many
groups of organisms (some invertebrates, fish, insects and sessile
organisms such as plants) that depend on animal vectors, wind, gravity
or current for dispersal.
Density-dependent dispersal: Density dependent or active
dispersal for many animals largely depends on factors such as local
population size, resource competition, habitat quality, and habitat
size.
What are the characteristics of a good disperser?
Within a single population, what makes an individual more likely to
disperse?
- sex: males tend to disperse more readily, and longer distances
(e.g., insects with wingless females)
- body mass: larger individuals tend to disperse more readily, and
longer distances
- genotype: certain genotypes tend to disperse more readily, and
longer distances (may relate to phenotypic differences that favor
dispersal)
The influence of dispersers on density
Good dispersers may have a certain set of physiological or
demographic differences relative to poor dispersers. For instance, good
dispersers tend to be larger bodied (though not always), fatter, and
have higher fecundity. The implications of this is that areas of new
colonization may have different population dynamics relative to patches
that have been colonized previously. For a species shifting its range,
this suggests that populations on the range edge may contain more
dispersing individuals, which have different demographic rates,
resulting in changes to population-level demographics.
At the species-level, there is a well established trade-off called
the competition-colonization tradeoff. This idea is that
species that are good at colonizing new habitats (i.e., those that can
effectively disperse to a new habitat) tend to be poor competitors. This
leads to succession (the turnover of species over time), which we will
discuss in later lectures, as these early colonizers are quickly
replaced by more dominant competitors (who just aren’t as good at
dispersing).
Dispersal in human-modified landscapes
Things like roads and dams present massive barriers to dispersal of
many organisms. We can imagine a simple case of increased mortality or
decreased dispersal probability near highways (think of all the roadkill
you’ve seen on I-10). Much like geographic barriers (e.g., mountains,
rivers), human-made structures can prevent dispersal (e.g., one species
of snail actually speciated, diverged into two different species, as a
result of a highway being built such that the geographic distribution of
the species was split into two isolated halves). Another example is the
building of “green bridges” across major highways. These are elevated
patches of forest that go over highways, and allow large-ranged mammals
and other organisms to disperse a bit more freely. Another (kind of
funny) example of dispersal in human-modified landscapes is the
dispersal of fish
in the presence of dams
One the other hand, some species take advantage of human-made
structures like roads. The northward expansion of the nine-banded
armadillo was greatly advanced by roads, as armadillos could then walk
alongside of roadways, getting over geographic barriers such as rivers.
Zebra mussels are transported between lakes on the hulls of boats or
through ballast water releases. Ballast water is a huge issue when it
comes to the control of invasive species, as global shipping has
connected areas where dispersal would never happen.