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: http://zebu.uoregon.edu/2004/es399/ae.html
Дата изменения: Sun Mar 7 01:40:44 2004 Дата индексирования: Mon Oct 1 23:40:34 2012 Кодировка: Поисковые слова: m 2 |
The terms in the above horrible equation are the following:
Environmental alteration and/or habitat loss basically directly influence lalpha as that would impact values for so and s1 more than anything else. Generally speaking, in mammalian populations, if you manage to survive to adulthood your basically okay (unless you have tenure ...).
Hence species survivability or stability depends on how well the growth equation shown above can be optimized. Things that help species are:
Conversely, environmental alterations that can trigger a population crash are
The special case of lambda = 1.
Our equation greatly simplifies for lambda = 1.
In that case, we have the condition that
This mathematical condition is the same as the physical condition of an exact balance between female survival probability and females born per year in the ecosystem.
For instance, for s = 0.9 and b = 0.25 then la must be .1/.25 = 0.40.
Since la = so * s1 * s and s = 0.9, then the stability condition occurs whenever so * s1 = 0.44.
As another example, consider the case when all 3 survival probabilities are the same (s= so=s1 = 0.5).
In this case la = .125 and 1 -s = 0.5. Therefore b would have to be 4 to achieve stability. Clearly this is an unphysical situation.
In this way, all of these various parameters are related at some level and are not completely independent and arbitrary. This is another way of saying that, since the species has survived, there has obviously been some balance achieved, over time, between these parameters.
However, at any given time in any system of mammals (except humans), lambda is always less than 1 (sometimes only slightly less than 1), because of the difficulty of balance the parameters to achieve stability. On long timescales, such balance can occur, but at any snapshot in time, there is no balance.
The importance of determining lambda is that, once we know its value we can then estimate the characteristic timescale of the population crash as
where N is the number of known individuals in the population (8000 in this case).
As stated earlier, lambda is fractional growth rate, so if you find that lambda = 0.98 then that means 2% species reduction per year and the doubling time (or in this case the halving time) of the population is 70/2 = 35 years. After so many halving times, the species is essentially extinct. For instance, using 8000 and .98 produces a population crash time of 450 years, or 450/35 = 13 halving times. Note that 213 = 8192.
So lets work out the case for the first data set I gave you for the assignment. Data Set 1 (from university biologists):
So we would have
as our equation to solve. This can not be solved analytically, but only by trial and error (which is why you program this). Note, however, that l can not be less than .95 else the right hand side of the equation becomes negative. So you only have to guess at l in the range of 0.95 to 1.
The solution for this case is l = 0.98 which leads to the 450 year population crash timescale.
In principle, the formula that we have been using would allow the female adults to live forever (and reproduce forever). This is obviously unphysical and so one needs to introduce a correction factor, w , which represents the maximum reproductive age of a species (something that's actually hard to measure).
The corrected expression looks even more horrible than the first one.
Before we collectively freak out, let's examine this new equation to see if it makes sense in some physical limits.
In the first case, let w approach infinity. In that case, s/l is less than 1 and (s/l)w would be 0 and we recover our initial equation.
In the case where w=a (i.e. the female dies when they reach reproductive age) we would have the condition
Which is exactly what you get if you formally make s =0. And we just stated this condition: when the female reaches their reproductive age, a, they die and hence have no adult female survival probability.
As you will determine in your exercise, and as we will see below, the addition of w makes a very big difference. Lets take the case of w = 15 years for the previous data set. We then have the same right hand side as before (0.024) and the same numerator as before:
l3(1 - .95/ l)
But this is now corrected by the term in the denominator which is
(1 - .95/ l)13
Putting this into excel and incrementing lambda until we get an approximate solution yields lambda = 0.85 or a fractional decrease in the population of 15% per year - this is a lot bigger than the previous decrease of 2% a year and we get a population crash time of 56 years, instead of 450 years.
So, w makes a big damn difference!
Equilibrium Occupancy:
Finally, let's consider an ecosystem which is composed of a bunch
of individual cells or areas. Within each cell or areas one
can identify 3 possible conditions
Demographic potential is the equilibrium proportion of total territory that would be occupied by females in a completely suitable region. k is not something easily measured but p and h can be. These are related by the following:
For simplicity we will use now use p for po
Note that in the unique case of h = 1 (i.e. 100% of the ecosystem is habitable), then p (the observed occupancy) will equal k and the species is at is demographic potential.
More generally, lets consider a case of h = 0.5 for a species with k = 0.7. In that case, we should observe a value of
p = 1 - 0.3/0.5 = 0.4
So 40% of my ecosystem should be occupied by adult females.
If h is known exactly (which we will pretend that it is) then the variance in k can be determined as follows:
Below is a data set each with Np = 10.
Data Set 1 (from university biologists):
What do we get for this.
Putting in the values for p and h and solving for k shows that k = =0.77.
The standard deviation of k (which is the square root of the variance) would be 0.06 in this case of Np = 10. And therefore k is determined to an accuracy of 6% k = 0.77 +/- 0.06.
If we assume, for the sake of argument, that before development, h was 0.65 then that would lead to p = 1 - .23/.65 = 0.64 compared to the current value of p = 0.4. On this basis, would could therefore argue that development has lead to a substantial reduction of the species throughout the ecosystem.
However, this is now where you have to consider the error bars on k. For instance a k value of 0.71 is perfectly consistent with the data and that leads to p = 0.54 which is less of a difference.
Therefore, in the real world, its important to be able to determine k to pretty high accuracy.
Finally we consider the critical case of h = 1 - k .
If h in the real world falls below this critical value, then the species will no longer have enough habitat to support them.
Formally, for k = 0.77 we would get hcritical = 1 - 0.77 = 0.23 which is less than the present h of 0.38.
That means you could argue that 15% more of the total ecosystem could be developed without killing the species. However, once again, errors on k are important. If you use a k = 0.71 this gets you to hcritical = 0.29. So unless you know k very accurately, you can not determine with accuracy the real world value of hcritical