Ftouhi I (2022)
Publication Type: Journal article
Publication year: 2022
DOI: 10.1142/S0219199722500547
The object of the paper is to find complete systems of inequalities relating the perimeter P, the area vertical bar.vertical bar and the Cheeger constant h of planar sets. To do so, we study the so-called Blaschke-Santalo diagram of the triplet (P, h, vertical bar.vertical bar) for different classes of domains: simply connected sets, convex sets and convex polygons with at most N sides. We completely determine the diagram in the latter cases except for the class of convex N-gons when N >= 5 is odd: therein, we show that the boundary of the diagram is given by the graphs of two continuous and strictly increasing functions. An explicit formula for the lower one and a numerical method to obtain the upper one is provided. At last, some applications of the results are presented.
APA:
Ftouhi, I. (2022). Complete systems of inequalities relating the perimeter, the area and the Cheeger constant of planar domains. Communications in Contemporary Mathematics. https://dx.doi.org/10.1142/S0219199722500547
MLA:
Ftouhi, Ilias. "Complete systems of inequalities relating the perimeter, the area and the Cheeger constant of planar domains." Communications in Contemporary Mathematics (2022).
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