Lipschitz solvability of prescribed Jacobian and divergence for singular measures
Abstract
Let μ be a finite Radon measure on an open set ⊂Rd, singular with respect to the Lebesgue measure. We prove Lusin-type solvability results for the prescribed divergence equation and the prescribed Jacobian equation with Lipschitz solutions. More precisely, for every >0 and every Borel datum f R there exists a vector field V∈ C1c(;Rd) such that div V=f on a compact set K⊂ with μ( K)<, and Lip(V) (1+)\|f\|L∞(,μ). Similarly, for every Borel datum g R there exists a map with -Id∈ C1c(;Rd) such that D=g on a compact set K⊂ with μ( K)<, and Lip(-Id) (1+)\|g-1\|L∞(,μ). The maps V and -Id can be chosen arbitrarily small in supremum norm.
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