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Quantitative uniqueness for fractional heat type operators

In this paper we obtain quantitative bounds on the maximal order of vanishing for solutions to $(\partial_t - Δ)^s u =Vu$ for $s\in [1/2, 1)$ via new Carleman estimates. Our main result Theorem 1.1 and Theorem 1.3 can be thought of as a parabolic generalization of the corresponding quantitative uniqueness result in the time independent case due to Rüland and it can also be regarded as a nonlocal generalization of a similar result due to Zhu for solutions to local parabolic equations.