Table of Contents

BASE

Metapopulations and internal colonization

Ilhas dos Barbados - Reserva Biológica Poço das Antas. Foto: Ernesto Viveiros de Castro. http://www.biologia.ufrj.br/labs/lecp/linhas.htm

There's an assumption in the last model (Metapopulations and propagule rain - Tutorial in EcoVirtual) that we can get rid off: the assumption that the propagule rain is constant. Instead, we can make the colonization rate a function of the percentage of occupied patches. In a simple formulation of this model, the propagule source is just from within the system (closed system) and the probability of colonization increases linearly with the proportion of occupied patches.

The model

This way, our model does not have a constant colonization rate $p_i$, but a probability of colonization that depends on the number of occupied patches:

$$p_i = if$$

here $i$ is a constant that indicates how much the colonization probability increases with every new occupied patch. This way, the more occupied patches we have, the greater is the probability that new patches will be occupied. Substituting this new formula for $p_i$ in our old equation, we have:

$$\frac{df}{dt}=if(1-f)- p_e f $$

Equilibrium

The fraction of the occupied patches in equilibrium(F) changes to:

$$ F=1-\frac{p_e}{i} $$

Simulation

Let's see this first-hand by simulating this situation. As in the last exercise, we have created an R function that runs the simulation for us. As before, this function simply draws random colonization and extinction events for every patch at every time step, following the model's rules. It then shows the graph and an occupancy matrix for every time interval.

Argumentos função

The parameters are:

option parameter definition
data set R object where the results are stored
Maximum time $tmax$ Number of model iterations
columns $cl$ number of habitat columns in the landscape
rows $rw$ number of habitat rows in the landscape
initial occupance $f0$ initial number of occupied patches
colonization coef. $ci$ colonization coefficient
prob. extinction $pe$ extinction probability

Now you can simulate the model with the values you chose. For example,

tmax = 100
ncol = 10 
nrow = 10  
f0 = 0.1  
ci = 1
pe = 0.5

Play around with the model for a while by changing the parameters and try to answer the following questions:

  • is there any difference between this model and the seed rain, keeping the shared parameters equal?
  • does the position of a patch in the landscape affect its $p_i$ or $p_e$? Is this realistic?
  • are there any combinations of $i$ and $p_e$ that cannot exist?
  • what is the meaning of a negative F?
  • in which situation the equilibrium is $\hat{f} = 1?$

Scenario suggestions

tmax = 100 
cl = 10
rw = 10  
f0 = 0.1 
ci = 0.5
pe = 0.5 

To learn more