Global UCP For Parabolic Fractional p-Laplace Equation With Very Rough Potentials
Abstract
We show that the global unique continuation principle holds for the parabolic fractional p-Laplace equation with very rough potentials V(x,t) ∈ Lp'tW-s,p'x. Whereas the result is new even for the fractional p-Laplace operator, the corresponding local problem remains open even with zero potential. The short proof eschews extension techniques and Carleman estimates.
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