Qualitative properties of solutions to a generalized Fisher-KPP equation

Abstract

The following Fisher-KPP type equation ut=Kuxx-Buq+Aup, (x,t)∈×(0,∞), with p>q>0 and A, B, K positive coefficients, is considered. For both p>q>1 and p>1, q=1, we construct stationary solutions, establish their behavior as |x|∞ and prove that they are separatrices between solutions decreasing to zero in infinite time and solutions presenting blow-up in finite time. We also establish decay rates for the solutions that decay to zero as t∞.

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