Sobolev regular flows of non-Lipschitz vector fields

Albert Clop; Heikki Jylhä

doi:10.1016/j.jde.2018.10.002

Sobolev regular flows of non-Lipschitz vector fields

Albert Clop, Heikki Jylhä

Producción científica: Contribución a una revista › Artículo › Investigación

6 Citas (Scopus)

Resumen

We show that vector fields with exponentially integrable derivatives admit a well defined flow of homeomorphisms X(t,⋅)∈W1,p(t)loc for some p(t)>1, at least for small times. When the field is certain Riesz potential of a bounded function, the result becomes global in time, due to techniques from Geometric Function Theory. The local result also applies to the flows arising from Yudovich solutions to the planar Euler system with bounded vorticity.

Idioma original	Inglés
Páginas (desde-hasta)	4544-4567
Publicación	Journal of Differential Equations
Volumen	266
DOI	https://doi.org/10.1016/j.jde.2018.10.002
Estado	Publicada - 5 abr 2019

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10.1016/j.jde.2018.10.002

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title = "Sobolev regular flows of non-Lipschitz vector fields",

abstract = "We show that vector fields with exponentially integrable derivatives admit a well defined flow of homeomorphisms X(t,⋅)∈W1,p(t)loc for some p(t)>1, at least for small times. When the field is certain Riesz potential of a bounded function, the result becomes global in time, due to techniques from Geometric Function Theory. The local result also applies to the flows arising from Yudovich solutions to the planar Euler system with bounded vorticity.",

author = "Albert Clop and Heikki Jylh{\"a}",

year = "2019",

month = apr,

day = "5",

doi = "10.1016/j.jde.2018.10.002",

language = "English",

volume = "266",

pages = "4544--4567",

journal = "Journal of Differential Equations",

issn = "0022-0396",

publisher = "Academic Press Inc.",

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TY - JOUR

T1 - Sobolev regular flows of non-Lipschitz vector fields

AU - Clop, Albert

AU - Jylhä, Heikki

PY - 2019/4/5

Y1 - 2019/4/5

N2 - We show that vector fields with exponentially integrable derivatives admit a well defined flow of homeomorphisms X(t,⋅)∈W1,p(t)loc for some p(t)>1, at least for small times. When the field is certain Riesz potential of a bounded function, the result becomes global in time, due to techniques from Geometric Function Theory. The local result also applies to the flows arising from Yudovich solutions to the planar Euler system with bounded vorticity.

AB - We show that vector fields with exponentially integrable derivatives admit a well defined flow of homeomorphisms X(t,⋅)∈W1,p(t)loc for some p(t)>1, at least for small times. When the field is certain Riesz potential of a bounded function, the result becomes global in time, due to techniques from Geometric Function Theory. The local result also applies to the flows arising from Yudovich solutions to the planar Euler system with bounded vorticity.

UR - http://www.mendeley.com/research/sobolev-regular-flows-nonlipschitz-vector-fields

UR - https://www.scopus.com/pages/publications/85054434975

U2 - 10.1016/j.jde.2018.10.002

DO - 10.1016/j.jde.2018.10.002

M3 - Article

SN - 0022-0396

VL - 266

SP - 4544

EP - 4567

JO - Journal of Differential Equations

JF - Journal of Differential Equations

ER -

Sobolev regular flows of non-Lipschitz vector fields

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