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===위키데이터=== | ===위키데이터=== | ||
* ID : [https://www.wikidata.org/wiki/Q4720484 Q4720484] | * ID : [https://www.wikidata.org/wiki/Q4720484 Q4720484] | ||
| + | ===Spacy 패턴 목록=== | ||
| + | * [{'LOWER': 'alexander'}, {'LEMMA': 'duality'}] | ||
2021년 2월 17일 (수) 00:46 기준 최신판
노트
위키데이터
- ID : Q4720484
말뭉치
- Pontryagin theorem; the duality formulated in it is known as Alexander–Pontryagin duality or as Pontryagin duality.[1]
- In mathematics, Alexander duality refers to a duality theory presaged by a result of 1915 by J. W. Alexander, and subsequently further developed, particularly by Pavel Alexandrov and Lev Pontryagin.[2]
- Alexander had little of the modern apparatus, and his result was only for the Betti numbers, with coefficients taken modulo 2.[2]
- In the process, we develop coarse topological language and a formulation of coarse Alexander duality which is suitable for applications involving quasi-isometries and geometric group theory.[3]
- (2) a refinement of the Borel--Moore homology of the coverage gaps with a positive cone encoding time orientation, and (3) a positive variant of Alexander Duality.[4]
- This note contributes to the point calculus of persistent homology by extending Alexander duality from spaces to real-valued functions.[5]
- The class of simplicial complexes representing triangulations and subdivisions of Lawrence polytopes is closed under Alexander duality.[6]
- The aim of the present article is to make a survey and prove the main results which are necessary for a proof of the generalization of Alexander duality theorem of W.S. Massey.[7]
- In this paper we introduce a relative version of this Čech homology that satisfies the Eilenberg-Steenrod Exactness Axiom, and we prove a relative version of coarse Alexander duality.[8]
- We show that the basis for the complementary fraction is the Alexander dual of the first basis, constructed by shifting monomial exponents.[9]
- This map is an isomorphism and it is called the Alexander-Čech duality (or sometimes simply Alexander duality).[10]
- This paper extends Alexander Duality to this setting.[11]
- Com binato ria l Alexander dualit y exis ts in more general ve rsions.[12]
소스
- ↑ Encyclopedia of Mathematics
- ↑ 2.0 2.1 Alexander duality
- ↑ Kapovich , Kleiner : Coarse Alexander duality and duality groups
- ↑ Positive Alexander Duality for Pursuit and Evasion
- ↑ Proceedings of the twenty-eighth annual symposium on Computational geometry
- ↑ Alexander duality in subdivisions of Lawrence polytopes
- ↑ On the Alexander duality theorem
- ↑ Coarse Alexander duality for pairs and applications
- ↑ Alexander duality in experimental designs
- ↑ Alexander-Čech duality in nLab
- ↑ HHA vol. 15 (2013) no. 2 article 14
- ↑ (PDF) Note: Combinatorial Alexander Duality
메타데이터
위키데이터
- ID : Q4720484
Spacy 패턴 목록
- [{'LOWER': 'alexander'}, {'LEMMA': 'duality'}]