Unique continuation for the heat operator with potentials in weak spaces
Abstract
We prove strong unique continuation property for the differential inequality |(∂t +)u(x,t)| V(x,t)|u(x,t)| with V contained in weak spaces. In particular, we establish the strong unique continuation property for V∈ L∞t Ld/2,∞x, which has been left open since the works of Escauriaza [6] and Escauriaza-Vega [8]. Our results are consequences of the Carleman estimates for the heat operator in the Lorentz spaces.
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