Abstract
During their first year of life sheep acquire parasites through grazing, and simultaneously build up an immunity to infection. At the beginning of each year non-immune lambs are introduced onto contaminated pasture. We represent this process by differential equations describing the within-year dynamics, and defining a difference equation that describes the between-year dynamics. An example with two system parameters is analysed in detail. It is shown that regions exist in parameter space where periodic (between-year) or aperiodic solutions occur. Parasite control schemes could change the system dynamics from a stable equilibrium to complicated long-term fluctuations.
Original language | English |
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Pages (from-to) | 272-90 |
Number of pages | 19 |
Journal | Journal of Mathematical Biology |
Volume | 37 |
Issue number | 3 |
DOIs | |
Publication status | Published - Sept 1998 |
Keywords
- Animals
- Animals, Domestic
- Antibody Formation/physiology
- Host-Parasite Interactions
- Intestinal Diseases, Parasitic/immunology
- Models, Biological
- Nematoda/growth & development
- Nematode Infections/immunology
- Numerical Analysis, Computer-Assisted
- Sheep
- Sheep Diseases/epidemiology
- Time Factors