The Shifting operation for real matrices
Involution Matrices of Real Quaternions
... Quaternions are an extension of the complex numbers C and were first described by Irish mathematician Sir William Rowan Hamilton in 1843. Hamilton was looking for a way to formalize 3 points in 3-space in the same way ...
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On the real spectrum of a product of Gaussian matrices
... N matrices of Gaussian variables over the real, complex or quaternion number systems ...Hermitian matrices, these number fields had been shown earlier by Dyson [8] to relate to global time reversal ...
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On Real-valued Visual Cryptographic Basis Matrices
... (National Centre for Advanced Research in Discrete Mathematics, Kalasalingam University, Anand Nagar, Krishnankoil-626 126, Tamil Nadu, India [email protected]) Abstract. Visual cryptography (VC) encodes an image ...
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The Effects of Multinationals’ Profit Shifting Activities on Real Investments
... We can conclude that multinationals generate significant competitive advantages by means of shifting profits if the parent company is located in a lower taxing home country. Fur- thermore, our analysis shows that ...
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The Effects of Multinationals? Profit Shifting Activities on Real Investments
... profit shifting activities and related invest- ment ...profit shifting activities and the related effects on the size and probability of multinationals’ investments at typical tax ...profit shifting ...
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Computing eigenvalues of real symmetric matrices\ud with rational filters in real arithmetic
... IN REAL ARITHMETIC ∗ ANTHONY ...large matrices by methods related to contour integrals; best known are the works of Sakurai and coauthors and Polizzi and ...the matrices are real symmetric, ...
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On Real Matrices to Least Squares g Inverse and Minimum Norm g Inverse of Quaternion Matrices
... the real representations of quaternion matrices and matrix rank method, we give the expression of the real ma- trices in least-squares g-inverse and minimum norm ...
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Orthogonal Rational Functions with real coefficients and semiseparable matrices
... 1 real and conclude that also X 1 , ...a real orthogonal transformation to select the basis functions of ψ 1 , and since such a transformation on ψ 1 implies an orthogonal transformation on U 1 , we can ...
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Moment Matrices, Border Bases and Real Radical Computation
... Proof. See [14, Sec. 2.2]. 4. Truncated Hankel Operators We have seen in the previous section that the kernel of the Hankel operator associated to a positive linear form is a real radical ideal. However, in ...
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The Elasticity of Taxable Income and Income-shifting: What is "Real" and What is Not?
... There are only a few minor legal limitations on whether income is withdrawn as wages or dividends, and explicit tax rate dierences induce clear incentives for tax-motivated income-shifting. We use extensive panel ...
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The elasticity of taxable income and income-shifting: what is “real” and what is not?
... avoidance, real responses and bargaining channels), they study the implications of optimal income taxation at the upper end of the income ...the real and avoidance responses are small while bargaining ...
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Trace of Positive Integer Power of Real 2 × 2 Matrices
... 2 real matrix A, in the terms of Trace of A (TrA) and Determinant of A (DetA), which are based on definition of trace of matrix and multiplication of the matrixn times, where n is positive integer and this formula ...
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Jacobi matrices and quadrature rules on the unit circle and the real line
... An efficient family of strongly A-stable Runge-Kutta collocation methods for stiff system and DAEs. Part I[r] ...
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The chiral Gaussian two-matrix ensemble of real asymmetric matrices
... as the supersymmetric method [28], skew-orthogonal polynomials [8] or probabilistic methods [9] are very likely to be extendible to our two-matrix model as well. The paper is organised as follows. In Section 2 we ...
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Big Data Comes of Age: Shifting to a Real-time Data Platform
... Enterprise Management Associates – Hybrid Data Ecosystem™ Response – The need for platforms to respond at new speeds and scale has opened the door for new ways to leverage data and provide insights to end users. This is ...
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Central limit theorems for the real eigenvalues of large Gaussian random matrices
... Our approach to this problem is based on a formalism recently developed in [19], which allowed the authors to characterize the large deviation behaviour for the probability of an anomalously small number of real ...
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Significance and recovery of blocks structures in binary and real-valued matrices with noise
... Biclustering algorithms have been of recent interest in the field of Data Mining, particularly in the analysis of high dimensional data. Most biclustering problems can be stated in the following form: given a rectangular ...
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Skew-orthogonal Laguerre polynomials for chiral real asymmetric random matrices
... random matrices with real elements, belonging to two different ...of real eigenvalues and complex conjugate eigenvalue pairs can be written as a ...non-Hermitian real Wishart-Laguerre ...
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Y-Calculus: A language for real Matrices derived from the ZX-Calculus
... some real transformations can only be obtained by composition of complex ...with real matrices, by losing the angles and a node of the ZX-Calculus, and adding another angle-parametrised ...
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Central limit theorems for the real eigenvalues of large Gaussian random matrices
... are real? This very natural and fundamental question was asked in 1994 by Edelman, Kostlan and Shub [7] who proved that if G is an N × N matrix of independent identically distributed standard normal variables, and ...
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