Local null controllability for degenerate parabolic equations with nonlocal term
Abstract
We establish a local null controllability result for following the nonlinear parabolic equation: ut-(b(x,∫01u \ )ux )x+f(t,x,u)=hω,\ (t,x)∈ (0,T)× (0,1) where b(x,r)=(r)a(x) is a function with separated variables that defines an operator which degenerates at x=0 and has a nonlocal term. Our approach relies on an application of Liusternik's inverse mapping theorem that demands the proof of a suitable Carleman estimate.
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