A Class of Models Describing Age Structure Dynamics of a Natural Forest
Document Type
Presentation Abstract
Presentation Date
4-26-2001
Abstract
A class of models with only a few easily identifiable parameters are introduced to allow the long-term consequences of disturbances in a natural forest to be qualitatively described. Formulated in terms of the von-Foerster partial differential equation, these models can be reduced to an integro-differential equation for the seedlings' density as a function of time. This seedlings equation contains a small parameter, the ratio of seedlings' re-establishment time and the average life span of a tree. The re-establishment time, typically 2-5 years, measures the time for the number of seedlings to adapt to a change in available resources.
The problem is solved using numerical and asymptotic methods. By means of Banach's fixed point theorem in a suitable function space, it can be shown that these methods converge even when the number of seedlings intermittently vanishes and the solution is not continuously differentiable. In this case, for a certain range of parameters, periodic solutions occur.
Recommended Citation
Kraemer, Michael A., "A Class of Models Describing Age Structure Dynamics of a Natural Forest" (2001). Colloquia of the Department of Mathematical Sciences. 93.
https://scholarworks.umt.edu/mathcolloquia/93
Additional Details
Presentation delivered in partial fulfillment of the requirements for the presenter's doctoral degree.
Thursday, 26 April 2001
4:10 p.m. in Math 109
Coffee/treats at 3:30 p.m. Math 104 (Lounge)