An analytical approach to the Rational Simplex Problem
Metric Geometry
2014-04-08 v3 Differential Geometry
Number Theory
Abstract
In 1973, J. Cheeger and J. Simons raised the following question that still remains open and is known as the Rational Simplex Problem: Given a geodesic simplex in the spherical 3-space so that all of its interior dihedral angles are rational multiples of , is it true that its volume is a rational multiple of the volume of the 3-sphere? We propose an analytical approach to the Rational Simplex Problem by deriving a function , defined as an integral of an elementary function, such that if there is a rational , close enough to zero, such that the value is an irrational number then the answer to the Rational Simplex Problem is negative.
Keywords
Cite
@article{arxiv.1304.7464,
title = {An analytical approach to the Rational Simplex Problem},
author = {Victor Alexandrov},
journal= {arXiv preprint arXiv:1304.7464},
year = {2014}
}
Comments
5 pages; in version 3, several new references are added and discussed