Global existence and uniqueness of the solution to a nonlinear parabolic equation
Abstract
Consider the equation u'(t)- u+|u| u=0, u(0)=u0(x), (1), where u':= dudt, =const >0, x∈ R3, t>0. Assume that u0 is a smooth and decaying function, \|u0\|\:=x∈ R3, t∈ R+ |u(x,t)|. It is proved that problem (1) has a unique global solution and this solution satisfies the following estimate \|u(x,t)\|<c, where c>0 does not depend on x,t.
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