Cauchy Kernel of Slice Dirac Operator in Octonions with Complex Spine

AbstractIn this paper, Jacobi and trigonometric polynomials are used to con-struct the approximate solution of a singular integral equation with multiplicative Cauchy kernel in the half-plane.

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A generalized Weierstrass representation for a submanifold $S$ in $\mathbb{E}^n$ arising from the submanifold Dirac operator

Surveys on Geometry and Integrable Systems ◽

10.2969/aspm/05110259 ◽

2019 ◽

Cited By ~ 1

Author(s):

Shigeki Matsutani

Keyword(s):

Dirac Operator ◽

Weierstrass Representation

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Robust Cauchy Kernel Conjugate Gradient Algorithm for Non-Gaussian Noises

IEEE Signal Processing Letters ◽

10.1109/lsp.2021.3081381 ◽

2021 ◽

pp. 1-1

Author(s):

Letian Qi ◽

Minglin Shen ◽

Daili Wang ◽

Shiyuan Wang

Keyword(s):

Conjugate Gradient ◽

Conjugate Gradient Algorithm ◽

Gradient Algorithm ◽

Cauchy Kernel ◽

Non Gaussian

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Extended supersymmetries and the Dirac operator

Annals of Physics ◽

10.1016/j.aop.2004.08.006 ◽

2005 ◽

Vol 315 (2) ◽

pp. 467-487 ◽

Cited By ~ 23

Author(s):

A. Kirchberg ◽

J.D. Länge ◽

A. Wipf

Keyword(s):

Dirac Operator

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Eigenvalue bounds for non-selfadjoint Dirac operators

Mathematische Annalen ◽

10.1007/s00208-021-02158-x ◽

2021 ◽

Author(s):

Piero D’Ancona ◽

Luca Fanelli ◽

Nico Michele Schiavone

Keyword(s):

Dirac Operator ◽

Discrete Spectrum ◽

Complex Plane ◽

Dirac Operators ◽

Resolvent Estimates ◽

Eigenvalue Bounds ◽

Mixed Norms ◽

Massless Case ◽

Abstract Version ◽

Embedded Eigenvalues

AbstractWe prove that the eigenvalues of the n-dimensional massive Dirac operator $${\mathscr {D}}_0 + V$$ D 0 + V , $$n\ge 2$$ n ≥ 2 , perturbed by a potential V, possibly non-Hermitian, are contained in the union of two disjoint disks of the complex plane, provided V is sufficiently small with respect to the mixed norms $$L^1_{x_j} L^\infty _{{\widehat{x}}_j}$$ L x j 1 L x ^ j ∞ , for $$j\in \{1,\dots ,n\}$$ j ∈ { 1 , ⋯ , n } . In the massless case, we prove instead that the discrete spectrum is empty under the same smallness assumption on V, and in particular the spectrum coincides with the spectrum of the unperturbed operator: $$\sigma ({\mathscr {D}}_0+V)=\sigma ({\mathscr {D}}_0)={\mathbb {R}}$$ σ ( D 0 + V ) = σ ( D 0 ) = R . The main tools used are an abstract version of the Birman–Schwinger principle, which allows in particular to control embedded eigenvalues, and suitable resolvent estimates for the Schrödinger operator.

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A Discrete Analogue of the Dirac Operator and the Discrete Modified Novikov–Veselov Hierarchy

International Mathematics Research Notices ◽

10.1093/imrn/rnq014 ◽

2010 ◽

Vol 2010 (18) ◽

pp. 3463-3488 ◽

Cited By ~ 2

Author(s):

Dmitry Zakharov

Keyword(s):

Dirac Operator ◽

Discrete Analogue

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Higher spectral flow and an entire bivariant JLO cocycle

Journal of K-theory K-theory and its Applications to Algebra Geometry and Topology ◽

10.1017/is012008031jkt193 ◽

2012 ◽

Vol 11 (1) ◽

pp. 183-232 ◽

Cited By ~ 5

Author(s):

Moulay-Tahar Benameur ◽

Alan L. Carey

Keyword(s):

Dirac Operator ◽

Chern Character ◽

Dirac Operators ◽

Cyclic Cohomology ◽

Closed Manifold ◽

Spectral Flow ◽

Smooth Functions ◽

Base Manifold ◽

K Theory ◽

Higher Spectral Flow

AbstractFor a single Dirac operator on a closed manifold the cocycle introduced by Jaffe-Lesniewski-Osterwalder [19] (abbreviated here to JLO), is a representative of Connes' Chern character map from the K-theory of the algebra of smooth functions on the manifold to its entire cyclic cohomology. Given a smooth fibration of closed manifolds and a family of generalized Dirac operators along the fibers, we define in this paper an associated bivariant JLO cocycle. We then prove that, for any l ≥ 0, our bivariant JLO cocycle is entire when we endow smoooth functions on the total manifold with the Cl+1 topology and functions on the base manifold with the Cl topology. As a by-product of our theorem, we deduce that the bivariant JLO cocycle is entire for the Fréchet smooth topologies. We then prove that our JLO bivariant cocycle computes the Chern character of the Dai-Zhang higher spectral flow.

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ANALYTIC SAMPLING APPROXIMATION BY PROJECTION OPERATOR WITH APPLICATION IN DECOMPOSITION OF INSTANTANEOUS FREQUENCY

International Journal of Wavelets Multiresolution and Information Processing ◽

10.1142/s0219691313500409 ◽

2013 ◽

Vol 11 (05) ◽

pp. 1350040 ◽

Cited By ~ 2

Author(s):

YOUFA LI ◽

TAO QIAN

Keyword(s):

Hardy Space ◽

Numerical Experiment ◽

Hilbert Transform ◽

Mild Condition ◽

Instantaneous Frequency ◽

Projection Operator ◽

Approximation Scheme ◽

Special Functions ◽

Cauchy Kernel ◽

Sequence Of Functions

A sequence of special functions in Hardy space [Formula: see text] are constructed from Cauchy kernel on unit disk 𝔻. Applying projection operator of the sequence of functions leads to an analytic sampling approximation to f, any given function in [Formula: see text]. That is, f can be approximated by its analytic samples in 𝔻s. Under a mild condition, f is approximated exponentially by its analytic samples. By the analytic sampling approximation, a signal in [Formula: see text] can be approximately decomposed into components of positive instantaneous frequency. Using circular Hilbert transform, we apply the approximation scheme in [Formula: see text] to Ls(𝕋2) such that a signal in Ls(𝕋2) can be approximated by its analytic samples on ℂs. A numerical experiment is carried out to illustrate our results.

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