Braverman, ElenaLiao, WenyuanKamrujjaman, Md.2016-01-222016-01-222016-01-222016http://hdl.handle.net/11023/2771We study reaction-diffusion equations describing population dynamics of single harvested species and of two competing species. The main aim of the thesis is to study the roles of two different diffusion strategies: the regular diffusion and the directed diffusion. In directed diffusion, rather than the population itself, its ratio to either locally available resources (carrying capacity) or to a positive distribution function diffuses. We focus on how directed diffusion, especially, carrying capacity driven dispersion in the habitat influences selection. For single species, we present comparative numerical results between carrying capacity driven diffusion and regular diffusion for Gilpin-Ayala type growth and harvesting. For two competing species, we study the interaction between different types of dispersal: one of them is subject to a regular diffusion while the other moves in the direction of most per capita available resources. If spatially heterogeneous carrying capacities coincide, and intrinsic growth rates are proportional then competitive exclusion of a regularly diffusing population is inevitable. When the resource function of a regularly diffusing population is higher than of the other species, the two populations may coexist. For symmetric growth, we consider the case when the ideal free distribution is attained as a combination of the two strategies adopted by the two species. Then there is an ideal free pair, and the relevant coexistence equilibrium is a global attractor. In the event that only one of the diffusion strategies is proportional to the carrying capacity, we prove the competitive exclusion of the other species. In case of weak competition, both species can coexist even only one of the species adopts the ideal free dispersal strategy. When one of the species is following the directed dispersal strategy and the other is dispersing regularly, there is a unique coexistence solution if the difference between the carrying capacity and the directed function is a positive constant. Coexistence can be a result of the interplay of different diffusion coefficients or growth rates.engUniversity of Calgary graduate students retain copyright ownership and moral rights for their thesis. You may use this material in any way that is permitted by the Copyright Act or through licensing that has been assigned to the document. For uses that are not allowable under copyright legislation or licensing, you are required to seek permission.Education--MathematicsEconomics--AgriculturalSociology--Theory and MethodsAnimal Culture and NutritionFisheries and AquacultureEcologyCarrying capacity driven diffusionIdeal free distributionCompetitionEvolutionary stabilitySystem of partial differential equationsThe Influence of Diffusion Strategies on the Competition of Two Spatially Distributed Populations in Heterogeneous Environmentdoctoral thesis10.11575/PRISM/28207