Diophantine approximation
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위키데이터
- ID : Q1227061
말뭉치
- Techniques from Diophantine approximation have been vastly generalized, and today they have many applications to Diophantine equations, Diophantine inequalities, and Diophantine geometry.[1]
- This paper is motivated by recent applications of Diophantine approximation in electronics, in particular, in the rapidly developing area of Interference Alignment.[2]
- Given a real number α, there are two ways to define a best Diophantine approximation of α.[3]
- There are still simply-stated unsolved problems remaining in Diophantine approximation, for example the Littlewood conjecture and the Lonely runner conjecture.[3]
- The work of D. Kleinbock, G. Margulis and their collaborators demonstrated the power of this novel approach to classical problems in Diophantine approximation.[3]
- Gives a broad but very concise introduction to Diophantine approximation.[4]
- Equidistribution of expanding translates of curves and Dirichlet’s theorem on diophantine approximation.[5]
- Equidistribution of expanding translates of curves and Diophantine approximation on matrices.[5]
- The basic question in Diophantine approximation is how well a real number can be approximated by rationals with a given bound on denominators.[6]
- In this course we discuss how the methods from the theory of dynamical systems are utilised to prove some of the deep results in Diophantine approximation.[6]
- We also prove complementary results showing that certain natural simultaneous Diophantine approximation problems are NP-hard.[7]
- It was discovered recently that Nevanlinna theory and Diophantine approximation bear striking similarities and connections.[8]
- Each chapter is divided into part A and part B. Part A deals with Nevanlinna theory and part B covers Diophantine approximation.[8]
- Students who want to extend their EC points for Diophantine approximation from 6 to 8 should do first the homework assignments and exam or resit for 6EC.[9]
- The many interactions between Diophantine Approximation and other disciplines in science can be explained by the universal need to approximate complex structures by more regular ones.[10]
- This leads to the domain of Diophantine Approximation on manifolds, where for most questions no general theory is available.[10]
- The diophantine approximation deals with the approximation of real numbers (or real vectors) with rational numbers (or rational vectors).[11]
- Diophantine approximation is about how well real numbers can be approximated by rationals.[12]
- The theory of diophantine approximation (see, for example, Cassels 1965) gives ways of describing how well the rationals approximate a given number.[13]
소스
- ↑ Diophantine approximation
- ↑ Diophantine approximation and applications in interference alignment ☆
- ↑ 3.0 3.1 3.2 Diophantine approximation
- ↑ college Diophantische approximatie, Leiden
- ↑ 5.0 5.1 Dirichlet's theorem on diophantine approximation
- ↑ 6.0 6.1 Lectures on Diophantine approximation and Dynamics
- ↑ The Computational Complexity of Simultaneous Diophantine Approximation Problems
- ↑ 8.0 8.1 Nevanlinna Theory and Its Relation to Diophantine Approximation
- ↑ Diophantine approximation (BM), 2017-2018
- ↑ 10.0 10.1 Effective Equidistribution in Diophantine Approximation : Theory, Interactions and Applications.
- ↑ Diophantine approximation — Sage 9.2 Reference Manual: Diophantine approximation
- ↑ Structure or randomness in metric diophantine approximation?
- ↑ Diophantine approximation in Fuchsian groups
메타데이터
위키데이터
- ID : Q1227061
Spacy 패턴 목록
- [{'LOWER': 'diophantine'}, {'LEMMA': 'approximation'}]