论文信息 - A direct proof of a theorem of Blaschke and Lebesgue

A direct proof of a theorem of Blaschke and Lebesgue

The Blaschke-Lebesgue Theorem states that among all planar convex domains of given constant width B the Reuleaux triangle has minimal area. It is the purpose of this article to give a direct proof of this theorem by analyzing the underlying variational problem. The advantages of the proof are that it shows uniqueness (modulo rigid deformations such as rotation and translation) and leads analytically to the shape of the area-minimizing domain. Most previous proofs have relied on foreknowledge of the minimizing domain. Key parts of the analysis extend to the higher-dimensional situation, where the convex body of given constant width and minimal volume is unknown.

Evans M. Harrell

[1] A PROOF OF BLASCHK'S THEOREM ON THE REULEAUX TRIANGLE , 1952 .

[2] Max L. Warshauer,et al. Lecture Notes in Mathematics , 2001 .

[3] William James Firey,et al. Isoperimetric ratios of Reuleaux polygons , 1960 .

[4] Konvexe Bereiche gegebener konstanter Breite und kleinsten Inhalts , 1915 .

[5] Anton E. Mayer. Theorie der konvexen Körper , 1936 .

[6] M. Ghandehari. An optimal control formulation of the Blaschke-Lebesgue theorem , 1996 .

[7] Wilhelm Blaschke. Kreis und Kugel , 1916 .

[8] Richard Phillips Feynman,et al. Surely You're Joking, Mr. Feynman/What Do You Care What Other People Think? , 1989 .

[9] H. Groemer,et al. Convex Bodies of Constant Width , 1983 .

[10] R. Schneider. Convex Bodies: The Brunn–Minkowski Theory: Minkowski addition , 1993 .

[11] D. Gilbarg,et al. Elliptic Partial Differential Equa-tions of Second Order , 1977 .

[12] P. Mcmullen. GEOMETRIC INEQUALITIES (Grundlehren der mathematischen Wissenschaften 285) , 1989 .