From indirect to direct taxis by fast reaction limit
Abstract
Many ecological population models consider taxis as the directed movement of animals in response to a stimulus. The taxis is named direct if the animals are guided by the density gradient of some other population or indirect if they are guided by the density of a chemical secreted by individuals of the other population. Let u and v denote the densities of two populations and w the density of the chemical secreted by individuals in the v population. We consider a bounded, open set ⊂ RN with regular boundary and prove that for the space dimension N≤ 2 the solution to the Lotka-Volterra competition model with repulsive indirect taxis and homogeneous Neumann boundary conditions ut - du u = ∇ · u ∇ w +μ1u(1-u-a1v)\,, vt - dv v = μ2v(1-v-a2u)\,, ( wt - dw w )= v- w\, , converges to the solution of repulsive direct-taxis model: ut - du u = ∇ · u ∇ v +μ1u(1-u-a1v)\,, vt - dv v = μ2v(1-v-a2u)\, when 0. For space dimension N≥ 3 we use the compactness argument to show that the result holds in some weak sense. A similar result is also proved for a typical prey-predator model with prey taxis and logistic growth of predators.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.