A hybrid variational principle for the Keller-Segel system in $\mathbb R^2$

Adrien Blanchet (GREMAQ); David Kinderlehrer; Jos\'e A. Carrillo; Michal Kowalczyk (DIM); Philippe Lauren\c{c}ot (IMT); Stefano Lisini

arxiv: 1407.5562 · v1 · pith:K4DHMUNLnew · submitted 2014-07-21 · 🧮 math.AP

A hybrid variational principle for the Keller-Segel system in mathbb R²

Adrien Blanchet (GREMAQ) , Jos\'e A. Carrillo , David Kinderlehrer , Michal Kowalczyk (DIM) , Philippe Lauren\c{c}ot (IMT) , Stefano Lisini This is my paper

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keywords keller-segelsystemhybridprinciplevariationaladvantageallowsbelow

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We construct weak global in time solutions to the classical Keller-Segel system cell movement by chemotaxis in two dimensions when the total mass is below the well-known critical value. Our construction takes advantage of the fact that the Keller-Segel system can be realized as a gradient flow in a suitable functional product space. This allows us to employ a hybrid variational principle which is a generalisation of the minimising implicit scheme for Wasserstein distances introduced by Jordan, Kinderlehrer and Otto (1998).

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A hybrid variational principle for the Keller-Segel system in mathbb R²

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