Flow with A∞( R) density and transport equation in BMO( R)
Abstract
We show that, if b∈ L1(0,T;L1loc(R)) has spatial derivative in the John-Nirenberg space BMO(R), then it generalizes a unique flow φ(t,·) which has an A∞( R) density for each time t∈ [0,T]. Our condition on the map b is optimal and we also get a sharp quantitative estimate for the density. As a natural application we establish a well-posedness for the Cauchy problem of the transport equation in BMO( R).
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