Mustapha Lakrib scite author profile

Mustapha Lakrib

3Publications

33Citation Statements Received

158Citation Statements Given

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154

Affiliations

Université Djillali Liabes, Laboratoire de Mathématiques, University of Upper Alsace

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The operating diagram of a model of two competitors in a chemostat with an external inhibitor

Dellal

Lakrib

Sari

2018

Mathematical Biosciences

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Understanding and exploiting the inhibition phenomenon, which promotes the stable coexistence of species, is a major challenge in the mathematical theory of the chemostat. Here, we study a model of two microbial species in a chemostat competing for a single resource in the presence of an external inhibitor. The model is a four-dimensional system of ordinary differential equations. Using general monotonic growth rate functions of the species and absorption rate of the inhibitor, we give a complete analysis for the existence and local stability of all steady states. We focus on the behavior of the system with respect of the three operating parameters represented by the dilution rate and the input concentrations of the substrate and the inhibitor. The operating diagram has the operating parameters as its coordinates and the various regions defined in it correspond to qualitatively different asymptotic behavior: washout, competitive exclusion of one species, coexistence of the species around a stable steady state and coexistence around a stable cycle. This bifurcation diagram which determines the effect of the operating parameters, is very useful to understand the model from both the mathematical and biological points of view, and is often constructed in the mathematical and biological literature.

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Time averaging for functional differential equations

Lakrib

2003

Journal of Applied Mathematics

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Averaging Results for Functional Differential Equations

Lakrib¹,

Sari²

2004

Siberian Mathematical Journal

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Mustapha Lakrib

The operating diagram of a model of two competitors in a chemostat with an external inhibitor

Time averaging for functional differential equations

Averaging Results for Functional Differential Equations

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