Sharp quantitative isoperimetric inequalities in the $L^1$ Minkowski plane

Benoit Kloeckner (IF)

arxiv: 0907.4945 · v1 · pith:IBWKJ7N2new · submitted 2009-07-28 · 🧮 math.FA · math.DG

Sharp quantitative isoperimetric inequalities in the L¹ Minkowski plane

Benoit Kloeckner (IF) This is my paper

classification 🧮 math.FA math.DG

keywords isoperimetricplanealmostasymmetryaxiscaseclosecloseness

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We prove that a plane domain which is almost isoperimetric (with respect to the $L^1$ metric) is close to a square whose sides are parallel to the coordinates axis. Closeness is measured either by $L^\infty$ Haussdorf distance or Fraenkel asymmetry. In the first case, we determine the extremal domains.

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Sharp quantitative isoperimetric inequalities in the L¹ Minkowski plane

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