We show that vectorfields b whose spatialderivative D_xb satisfies a Orlicz summability condition have a spatially continuous representative and are well-posed. For the case of sub-exponential summability, their flows satisfy a Lusin (N) condition in a quantitative form, too. Furthermore, we prove that if D_xb satisfies a suitable exponential summability condition then the flow associated to b has Sobolev regularity, without assuming boundedness of div_xb. We then apply these results to the representation and Sobolev regularity of weak solutions of the Cauchy problem for the transport and continuity equations.
Classical flows of vector fields with exponential or sub-exponential summability
Ambrosio, Luigi;Serra Cassano, Francesco
2023
Abstract
We show that vectorfields b whose spatialderivative D_xb satisfies a Orlicz summability condition have a spatially continuous representative and are well-posed. For the case of sub-exponential summability, their flows satisfy a Lusin (N) condition in a quantitative form, too. Furthermore, we prove that if D_xb satisfies a suitable exponential summability condition then the flow associated to b has Sobolev regularity, without assuming boundedness of div_xb. We then apply these results to the representation and Sobolev regularity of weak solutions of the Cauchy problem for the transport and continuity equations.File in questo prodotto:
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Ambrosio-Nicolussi_Golo-SerraCassano_ODE.pdf
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