A Pu–Bonnesen inequality

Mikhail G. Katz; Stéphane Sabourau

doi:10.1007/s00022-021-00579-2

A Pu–Bonnesen inequality

Mikhail G. Katz, Stéphane Sabourau

Department of Mathematics

Bar-Ilan University

Research output: Contribution to journal › Article › peer-review

Abstract

We prove an inequality of Bonnesen type for the real projective plane, generalizing Pu’s systolic inequality for positively-curved metrics. The remainder term in the inequality, analogous to that in Bonnesen’s inequality, is a function of R- r (suitably normalized), where R and r are respectively the circumradius and the inradius of the Weyl–Lewy Euclidean embedding of the orientable double cover. We exploit John ellipsoids of a convex body and Pogorelov’s ridigity theorem.

Original language	English
Article number	18
Journal	Journal of Geometry
Volume	112
Issue number	2
DOIs	https://doi.org/10.1007/s00022-021-00579-2
State	Published - Aug 2021

Keywords

Bonnesen’s inequality
Circumscribed and inscribed radii
Convex surfaces
Pu’s inequality

All Science Journal Classification (ASJC) codes

Geometry and Topology

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10.1007/s00022-021-00579-2

Cite this

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title = "A Pu–Bonnesen inequality",

abstract = "We prove an inequality of Bonnesen type for the real projective plane, generalizing Pu{\textquoteright}s systolic inequality for positively-curved metrics. The remainder term in the inequality, analogous to that in Bonnesen{\textquoteright}s inequality, is a function of R- r (suitably normalized), where R and r are respectively the circumradius and the inradius of the Weyl–Lewy Euclidean embedding of the orientable double cover. We exploit John ellipsoids of a convex body and Pogorelov{\textquoteright}s ridigity theorem.",

keywords = "Bonnesen{\textquoteright}s inequality, Circumscribed and inscribed radii, Convex surfaces, Pu{\textquoteright}s inequality",

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doi = "10.1007/s00022-021-00579-2",

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AU - Sabourau, Stéphane

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AB - We prove an inequality of Bonnesen type for the real projective plane, generalizing Pu’s systolic inequality for positively-curved metrics. The remainder term in the inequality, analogous to that in Bonnesen’s inequality, is a function of R- r (suitably normalized), where R and r are respectively the circumradius and the inradius of the Weyl–Lewy Euclidean embedding of the orientable double cover. We exploit John ellipsoids of a convex body and Pogorelov’s ridigity theorem.

KW - Bonnesen’s inequality

KW - Circumscribed and inscribed radii

KW - Convex surfaces

KW - Pu’s inequality

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U2 - 10.1007/s00022-021-00579-2

DO - 10.1007/s00022-021-00579-2

M3 - مقالة

SN - 0047-2468

VL - 112

JO - Journal of Geometry

JF - Journal of Geometry

IS - 2

M1 - 18

ER -

A Pu–Bonnesen inequality

Abstract

Keywords

All Science Journal Classification (ASJC) codes

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