Existence of blowup solutions to the semilinear heat equation with double power nonlinearity
Abstract
We consider the semilinear heat equation ut= u+|u|p-1u-|u|q-1u in Rn×(0,T), where n=5, p=n+2n-2 and q∈(0,1). By the presence of -|u|q-1u, this equation has a finite time extinction property. We show the existence of a new type of blowup solutions by using this property. In fact, we obtain such blowup solutions by connecting a specific blowup solution of ut= u+|u|p-1u and a specific solution of ut= u-|u|q-1u, and by adding correction terms.
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