Bourgain-Brezis-Mironescu formula for Riesz Potentials
Abstract
We identify the Bourgain-Brezis-Mironescu pointwise limit of the nonlocal potential operator (1-α)\, Iα( Dα f), 0<α<1, where Iα denotes the Riesz potential and Dα a nonlinear fractional differential operator. Specifically, for every f∈ Cc∞( Rn) and every x∈ Rn, we show that equation* α 1- (1-α)\, Iα( Dα f)(x) = Kn\, I1(|∇ f|)(x), equation* where Kn is the geometric constant appearing in the well-known Bourgain-Brezis-Mironescu formula [BBM02]. By a density argument, we further extend this result to every f∈ W1,1( Rn), obtaining almost everywhere convergence along subsequences.
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