Rotating Spirals in segregated reaction-diffusion systems

Abstract

We give a complete characterization of the boundary traces i (i=1,…,K) supporting spiraling waves, rotating with a given angular speed ω, which appear as singular limits of competition-diffusion systems of the type \[ ∂∂ t ui - ui = μ ui -β ui Σj ≠ i aij uj in ×R+, ui = i on ∂×R+, ui(x,0) = ui,0(x) for x ∈ \] as β +∞. Here is a rotationally invariant planar set and aij>0 for every i and j. We tackle also the homogeneous Dirichlet and Neumann boundary conditions, as well as entire solutions in the plane. As a byproduct of our analysis we detect explicit families of eternal, entire solutions of the pure heat equation, parameterized by ω∈R, which reduce to homogeneous harmonic polynomials for ω=0.