result in Diophantine approximation
C50358
concept
A result in Diophantine approximation is a theorem or bound that quantifies how closely real numbers can be approximated by rationals (or algebraic numbers) in terms of the size of their denominators or heights.
Instances (5)
- Dirichlet approximation theorem
- Hurwitz theorem
-
Roth theorem
surface form: Roth's theorem
- Subspace theorem
- Liouville's inequality in Diophantine approximation