Julia Sánchez Sanz’s research while affiliated with Basque Center for Applied Mathematics and other places

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Publications (1)


Numerical Bifurcation Analysis of Physiologically Structured Populations: Consumer–Resource, Cannibalistic and Trophic Models
  • Article

August 2016

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21 Reads

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8 Citations

Bulletin of Mathematical Biology

Julia Sánchez Sanz

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Philipp Getto

With the aim of applying numerical methods, we develop a formalism for physiologically structured population models in a new generality that includes consumer–resource, cannibalism and trophic models. The dynamics at the population level are formulated as a system of Volterra functional equations coupled to ODE. For this general class, we develop numerical methods to continue equilibria with respect to a parameter, detect transcritical and saddle-node bifurcations and compute curves in parameter planes along which these bifurcations occur. The methods combine curve continuation, ODE solvers and test functions. Finally, we apply the methods to the above models using existing data for Daphnia magna consuming Algae and for Perca fluviatilis feeding on Daphnia magna. In particular, we validate the methods by deriving expressions for equilibria and bifurcations with respect to which we compute errors, and by comparing the obtained curves with curves that were computed earlier with other methods. We also present new curves to show how the methods can easily be applied to derive new biological insight. Schemes of algorithms are included.

Citations (1)


... With an eye on future work, it is reasonable to expect that the results of the present work can be combined with those of [22] for RFDE to obtain an analogous theory for systems of coupled RE and RFDE, similarly to what is done in [21, section 4] for equilibria (although some difficulties may arise from the coupling). This would represent a further step towards the dynamical analysis of complex yet realistic models, e.g., those recently proposed for modeling physiologically structured populations [21,24,29,50]. Establishing this theory for coupled RE and RFDE would also benefit the numerical method already developed in [39], which combines and extends the ideas of [5] for RFDE and of [4] for RE. ...

Reference:

Floquet Theory and Stability of Periodic Solutions of Renewal Equations
Numerical Bifurcation Analysis of Physiologically Structured Populations: Consumer–Resource, Cannibalistic and Trophic Models
  • Citing Article
  • August 2016

Bulletin of Mathematical Biology