Leslie Matrix Model with Density-Dependent Recruitment I (LMMDDR) by Mike Martin

This page generates plots, information, and data for a Leslie matrix model with density-dependent recruitment

The model helps to describe the dynamics between the different, age-based population classes within the population of a given species. On this page we assume the fertilities depend on the size of the overall population or, better said, the density. The vector x has components that represent the populations of each of the age-based classes. The Leslie matrix has fertilities or fecundities on the first row of the matrix. That is, the i^{th} entry in the first row represent the average number of newborns produced by one couple in the i^{th} age group that survive through the time interval in which they were born. The entries in the first row and their respective parameters should all be non-negative. The other parameters, s_{i}'s, represent the survival probabilities from one class to the next. More specifically, s_{i} is the fraction of the i^{th} age group that live to the (i+1)^{st} age group. Each s_{i} is positive and less than or equal to one. On this page we have arbitrarily set the number of population classes to two.

Enter in the values of the parameters (described above), the initial distribution, and the number of steps, then press the "Evaluate" button.

a =

b_{1} =

b_{2} =

α_{1} =

α_{2} =

s_{1} =

x_{1} (0) =

x_{2} (0) =

N =

PERCENTAGE POPULATIONS PLOT Class I in BLUE // Class II in PURPLE

EGGS & RECRUITS PLOT Eggs in RED // Recruits in GREEN

TOTAL POPULATION PLOT

POPULATION TRAJECTORY DATA

PROPORTION TRAJECTORY DATA

TOTAL POPULATION TRAJECTORY DATA

References:

Perron-Frobenius Theory The Leslie Matrix

The Leslie Matrix