Abstract
First we extend to several dimensions the Hecke–Ostrowski result by constructing a class of d-dimensional parallelepipeds of bounded remainder. Then we characterize the Riemann measurable bounded remainder sets in terms of “equidecomposability” to such a parallelepiped. By constructing invariants with respect to this equidecomposition, we derive explicit conditions for a polytope to be a bounded remainder set. In particular this yields a characterization of the convex bounded remainder polygons in two dimensions. The approach is used to obtain several other results as well.
We study bounded remainder sets with respect to an irrational rotation of the d-dimensional torus. The subject goes back to Hecke, Ostrowski and Kesten who characterized the intervals with bounded remainder in dimension one.
Original language | English |
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Pages (from-to) | 87-133 |
Number of pages | 47 |
Journal | Geometric and Functional Analysis |
Volume | 25 |
Issue number | 1 |
DOIs | |
State | Published - Feb 2015 |
Bibliographical note
Publisher Copyright:© 2015, Springer Basel.
Keywords
- Bounded remainder set
- Discrepancy
- Equidecomposability
- Scissors congruence