In a recent paper A. Cianchi, N. Fusco, F. Maggi, and A. Pratelli have shown
that, in the Gauss space, a set of given measure and almost minimal Gauss
boundary measure is necessarily close to be a half-space. Using only geometric
tools, we extend their result to all symmetric log-concave measures \mu on the
real line. We give sharp quantitative isoperimetric inequalities and prove that
among sets of given measure and given asymmetry (distance to half line, i.e.
distance to sets of minimal perimeter), the intervals or complements of
intervals have minimal perimeter.Comment: 14 pages, 3 figure

de Castro, Yohann

English

arXiv

Yohann de Castro

Annales Mathématiques Blaise Pascal

Quantitative Isoperimetric Inequalities on the Real Line

14 pages, 3 figuresInternational audienceIn a recent paper A. Cianchi, N. Fusco, F. Maggi, and A. Pratelli have shown that, in the Gauss space, a set of given measure and almost minimal Gauss boundary measure is necessarily close to be a half-space. Using only geometric tools, we extend their result to all symmetric log-concave measures \mu on the real line. We give sharp quantitative isoperimetric inequalities and prove that among sets of given measure and given asymmetry (distance to half line, i.e. distance to sets of minimal perimeter), the intervals or complements of intervals have minimal perimeter

HAL-INSA Toulouse

Castro, Yohann de

Numérisation de Documents Anciens Mathématiques

Scientific Publications of the University of Toulouse II Le Mirail

Quantitative Isoperimetric Inequalities on the Real Line

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Annales Mathématiques Blaise Pascal

HAL-INSA Toulouse

Numérisation de Documents Anciens Mathématiques

Scientific Publications of the University of Toulouse II Le Mirail