Abstract
We show that, if $b\in L^1(0,T;L^1_{\rm {loc}}(\mathbb R))$ has
spatial derivative in the John-Nirenberg space ${\rm{BMO}}(\mathbb R)$, then it generates a unique flow $\phi(t,\cdot)$ which has an $A_\infty(\mathbb R)$ density for each time $t\in [0,T]$.
Our condition on the map $b$ is not only optimal but also produces a sharp quantitative estimate for the density.
As a killer application we achieve the well-posedness for a Cauchy problem of the transport equation in ${\rm{BMO}}(\mathbb R)$.