An Optimal Sobolev Embedding for L1
Abstract
In this paper we establish an optimal Lorentz space estimate for the Riesz potential acting on curl-free vectors: There is a constant C=C(α,d)>0 such that \[ \|Iα F \|Ld/(d-α),1(Rd;Rd) ≤ C \|F\|L1(Rd;Rd) \] for all fields F ∈ L1(Rd;Rd) such that *curl F=0 in the sense of distributions. This is the best possible estimate on this scale of spaces and completes the picture in the regime p=1 of the well-established results for p>1.
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