Extension Properties and Boundary Estimates for a Fractional Heat Operator
Abstract
The square root of the heat operator ∂t-, can be realized as the Dirichlet to Neumann map of the heat extension of data on Rn+1 to Rn+2+. In this note we obtain similar characterizations for general fractional powers of the heat operator, (∂t-)s, s∈ (0,1). Using the characterizations we derive properties and boundary estimates for parabolic integro-differential equations from purely local arguments in the extension problem.
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