The effects of fecundity, mortality and distribution of the initial condition in phenological models
Abstract
Pest phenological models describe the cumulative flux of the individuals into each stage of the life cycle of a stage-structured population. Phenological models are widely used tools in pest control decision making. Despite the fact that these models do not provide information on population abundance, they share some advantages with respect to the more sophisticated and complex physiologically-based demographic models. The main advantage is that they do not require data collection to define the initial conditions of model simulation, reducing the effort for field sampling and the high uncertainty affecting sample estimates. Phenological models are often built considering the developmental rate function only. To the aim of adding more realism to phenological models, in this paper we explore the consequences of taking three additional elements into account: the age distribution of individuals which exit from the overwintering phase, the age- and temperature-dependent profile of the fecundity rate function and the consideration of a temperature-dependent mortality rate function. Numerical simulations are performed to investigate the effects of these elements with respect to phenological models considering development rate functions only. To further test the implications of different models formulation, we compare results obtained from different phenological models to the case study of the codling moth (Cydia pomonella) a primary pest of the apple orchard. The results obtained from model comparison are discussed in view of their potential application in pest control decision support.
- Publication:
-
Ecological Modelling
- Pub Date:
- June 2019
- DOI:
- 10.1016/j.ecolmodel.2019.03.019
- arXiv:
- arXiv:1812.02121
- Bibcode:
- 2019EcMod.402...45P
- Keywords:
-
- Phenological model;
- Stage-structured population;
- Mortality rate;
- Fecundity rate;
- Age distribution;
- Codling moth;
- Quantitative Biology - Populations and Evolution