Endpoint L1 estimates for Hodge systems
Abstract
In this paper we give a simple proof of the endpoint Besov-Lorentz estimate \|Iα F\|B0,1d/(d-α),1(Rd;Rk) ≤ C \|F \|L1(Rd;Rk) for all F ∈ L1(Rd;Rk) which satisfy a first order cocancelling differential constraint. We show how this implies endpoint Besov-Lorentz estimates for Hodge systems with L1 data via fractional integration for exterior derivatives.
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