Multidimensional transition fronts for Fisher-KPP reactions
Abstract
We study entire solutions to homogeneous reaction-diffusion equations in several dimensions with Fisher-KPP reactions. Any entire solution 0<u<1 is known to satisfy \[ t -∞ |x| c|t| u(t,x) = 0 for each c<2f'(0)\,, \] and we consider here those satisfying \[ t -∞ |x| c|t| u(t,x) = 0 for some c>2f'(0)\,. \] When f is C2 and concave, our main result provides an almost complete characterization of transition fronts as well as transition solutions with bounded width within this class of solutions.
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