Solutions with positive components to quasilinear parabolic systems

Abstract

We obtain sufficient conditions for the existence and uniqueness of solutions with non-negative components to general quasilinear parabolic problems equation* ∂t uk = Σi,j=1n aij (t,x,u)∂2xi xj\!uk + Σi=1n bi (t,x,u, ∂x u) ∂xi uk +\, ck(t,x,u,∂x u), \\ uk(0,x) = k(x), \\ uk(t,\,·\,) = 0, on ∂ F, k=1,2, …, m, x∈ F, \;\; t>0. equation* Here, F is either a bounded domain or Rn; in the latter case, we disregard the boundary condition. We apply our results to study the existence and asymptotic behavior of componentwise non-negative solutions to the Lotka-Volterra competition model with diffusion. In particular, we show the convergence, as t+∞, of the solution for a 2-species Lotka-Volterra model, whose coefficients vary in space and time, to a solution of the associated elliptic problem.