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===소스=== | ===소스=== | ||
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| + | ==메타데이터== | ||
| + | ===위키데이터=== | ||
| + | * ID : [https://www.wikidata.org/wiki/Q907439 Q907439] | ||
| + | ===Spacy 패턴 목록=== | ||
| + | * [{'LOWER': 'dirac'}, {'LEMMA': 'operator'}] | ||
2021년 2월 17일 (수) 00:49 기준 최신판
노트
위키데이터
- ID : Q907439
말뭉치
- Another Dirac operator arises in Clifford analysis.[1]
- Here we visualize eigenfunctions of Laplace-Beltrami (left) which ignores extrinsic bending, and our relative Dirac operator (right) which ignores intrinsic stretching.[2]
- We introduce a new extrinsic differential operator called the relative Dirac operator, leading to a family of operators with a continuous trade-off between intrinsic and extrinsic features.[2]
- A general eigenvalue problem for the Dirac operator on a metric manifold M in terms of spinor and tangent fields defined via the Clifford algebra is derived herein.[3]
- Eigenvalues and eigenfunctions for the Dirac operator on any sphere or pseudosphere are determined.[3]
- In this section we collect general facts on the \(L^p\)-spectrum of the Dirac operator.[4]
- We derive upper eigenvalue bounds for the Dirac operator of a closed hypersurface in a manifold with Killing spinors such as Euclidean space, spheres or hyperbolic space.[5]
- In higher codimension we obtain bounds on the eigenvalues of the Dirac operator of the submanifold twisted with the spinor bundle of the normal bundle.[5]
- These lectures aim to give an elementary exposition on basic results about the first eigenvalue of the Dirac operator, on compact Riemannian Spin manifolds with positive scalar curvature.[6]
- We end by pointing out how the size of the gap around zero in the spectrum of the Dirac operator, increases when the geometrical structure is Kähler or Quaternion-Kähler.[6]
- Applications of this result include the construction of non-isotopic metrics with invertible Dirac operator, and a concordance existence and classification theorem.[7]
- Note that as \(r\longrightarrow +\infty\), the Dirac operator becomes \(-i\sigma_1 e_1 - i\sigma_2 e_2\), which is the spin-Dirac operator on \(\mathbb{R}^2\).[8]
- The spectrum The spin-Dirac operator is a first order, self-adjoint elliptic operator, which implies (as \(S^2\) is compact) that it has a discrete spectrum.[8]
- I really like Thomas Friedrich's Dirac Operators in Riemannian Geometry, I think it's a great reference for this stuff.[9]
- It should be obvious why the Dirac operator is important in physics because of fermions.[10]
소스
- ↑ Dirac operator
- ↑ 2.0 2.1 A Dirac Operator for Extrinsic Shape Analysis
- ↑ 3.0 3.1 Eigenvalues and eigenfunctions of the Dirac operator on spheres and pseudospheres
- ↑ $$L^p$$ L p -spectrum of the Dirac operator on products with hyperbolic spaces
- ↑ 5.0 5.1 Extrinsic Bounds for Eigenvalues of the Dirac Operator
- ↑ 6.0 6.1 SPECTRAL PROPERTIES OF THE DIRAC OPERATOR AND GEOMETRICAL STRUCTURES
- ↑ (PDF) The Spectrum of the Dirac Operator
- ↑ 8.0 8.1 The Dirac operator on the 2-sphere
- ↑ The definition of the Dirac operator
- ↑ Why is the Dirac operator so important - in both physics and mathematics?
메타데이터
위키데이터
- ID : Q907439
Spacy 패턴 목록
- [{'LOWER': 'dirac'}, {'LEMMA': 'operator'}]