Author:
ASLAM JAI,CHEN SHUJIAN,FRICK FLORIAN,SALOFF-COSTE SAM,SETIABRATA LINUS,THOMAS HUGH
Abstract
Toeplitz conjectured that any simple planar loop inscribes a square. Here we prove variants of Toeplitz’s square peg problem. We prove Hadwiger’s 1971 conjecture that any simple loop in$3$-space inscribes a parallelogram. We show that any simple planar loop inscribes sufficiently many rectangles that their vertices are dense in the loop. If the loop is rectifiable, there is a rectangle that cuts the loop into four pieces which can be rearranged to form two loops of equal length. (The previous two results are independently due to Schwartz.) A rectifiable loop in$d$-space can be cut into$(r-1)(d+1)+1$pieces that can be rearranged by translations to form$r$loops of equal length. We relate our results to fair divisions of necklaces in the sense of Alon and to Tverberg-type results. This provides a new approach and a common framework to obtain inscribability results for the class of all continuous curves.
Publisher
Cambridge University Press (CUP)
Subject
Computational Mathematics,Discrete Mathematics and Combinatorics,Geometry and Topology,Mathematical Physics,Statistics and Probability,Algebra and Number Theory,Theoretical Computer Science,Analysis
Reference33 articles.
1. Ueber einige Aufgaben der Analysis situs;Toeplitz;Verhandlungen der Schweizerischen Naturforschenden Gesellschaft in Solothurn,1911
2. AN INTEGRATION APPROACH TO THE TOEPLITZ SQUARE PEG PROBLEM
3. Inscribed squares and square‐like quadrilaterals in closed curves
4. [29] R. E. Schwartz , ‘A trichotomy for rectangles inscribed in Jordan loops’, Preprint, 2018,arXiv:1804.00740.
5. On some geometric properties of closed curves;Schnirelman;Uspekhi Mat. Nauk,1944
Cited by
6 articles.
订阅此论文施引文献
订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献