Network for Biological Invasions and Dispersal Research

MITACS Seminar at the University of Manitoba, Winnipeg

Thursday, 30 October, 2008,

Gideon A. Ngwa

of the University of Buea, Cameroon

will speak on

On the population dynamics of the malaria vector

2:30 PM, Machray Hall 418

Abstract:

A deterministic differential equation model for the population dynamics of the human malaria vector is derived and studied. Conditions for the existence and stability of a non-zero steady state vector population density are derived. These reveal that a threshold parameter, the vectorial basic reproduction number, exists and the vector can established itself in the community if and only if this parameter exceeds unity. When a non-zero steady state population density exists, it can be stable but it can also be driven to instability via a Hopf Bifurcation to periodic solutions, as a parameter is varied in parameter space. By considering a special case, an asymptotic perturbation analysis is used to derive the amplitude of the oscillating solutions for the full non-linear system. The present modelling exercise and results show that it is possible to study the population dynamics of disease vectors, and hence oscillatory behaviour as it is often observed in most indirectly transmitted infectious diseases of humans, without recourse to external seasonal forcing.

Biodata:

Dr. Ngwa is an Associate Professor of Mathematics at the University of Buea, Cameroon. He received his B.Sc. degree in pure and applied mathematics from the University of Swansea, Wales, in 1989. He received his M.Sc. in Mathematical Modelling and Numerical Analysis from Oxford University in 1990. He obtained a DPhil in Mathematical Biology from Oxford University in 1993.

For further information, please contact Dr. A. Gumel.