Neutrino mixing, interval matrices and singular values

Digital Watermarking is a technology, to facilitate the authentication, copyright protection and Security of digital media. The objective of developing a robust watermarking technique is to incorporate the maximum possible robustness without compromising with the transparency. Singular Value Decomposition (SVD) using Firefly Algorithm provides this objective of an optimal robust watermarking technique. Multiple scaling factors are used to embed the watermark image into the host by multiplying these scaling factors with the Singular Values (SV) of the host image. Firefly Algorithm is used to optimize the modified host image to achieve the highest possible robustness and transparency. This approach can significantly increase the quality of watermarked image and provide more robustness to the embedded watermark against various attacks such as noise, geometric attacks, filtering attacks etc.

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Estimation of the Number of Signal Components Based on Singular Values of Noise Subspace

JOURNAL OF ELECTRONICS INFORMATION TECHNOLOGY ◽

10.3724/sp.j.1146.2010.01216 ◽

2011 ◽

Vol 33 (9) ◽

pp. 2039-2044 ◽

Cited By ~ 1

Author(s):

Xin-peng Zhou ◽

Feng Han ◽

Guo-hua Wei ◽

Si-liang Wu

Keyword(s):

Singular Values ◽

Noise Subspace

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Analysis of multiplicity of Hankel singular values of control systems

Automation and Remote Control ◽

10.1134/s0005117915020022 ◽

2015 ◽

Vol 76 (2) ◽

pp. 205-218 ◽

Cited By ~ 2

Author(s):

L. A. Mironovskii ◽

T. N. Solov’eva

Keyword(s):

Control Systems ◽

Singular Values ◽

Hankel Singular Values

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Ramanujan’s function k(τ)=r(τ)r 2(2τ) and its modularity

Open Mathematics ◽

10.1515/math-2020-0105 ◽

2020 ◽

Vol 18 (1) ◽

pp. 1727-1741

Author(s):

Yoonjin Lee ◽

Yoon Kyung Park

Keyword(s):

Continued Fraction ◽

Quadratic Field ◽

Singular Values ◽

Modular Function ◽

Imaginary Quadratic Field ◽

Modular Equations ◽

Positive Rational Number ◽

Congruence Relations ◽

Symmetry Relations ◽

Ray Class Field

Abstract We study the modularity of Ramanujan’s function k ( τ ) = r ( τ ) r 2 ( 2 τ ) k(\tau )=r(\tau ){r}^{2}(2\tau ) , where r ( τ ) r(\tau ) is the Rogers-Ramanujan continued fraction. We first find the modular equation of k ( τ ) k(\tau ) of “an” level, and we obtain some symmetry relations and some congruence relations which are satisfied by the modular equations; these relations are quite useful for reduction of the computation cost for finding the modular equations. We also show that for some τ \tau in an imaginary quadratic field, the value k ( τ ) k(\tau ) generates the ray class field over an imaginary quadratic field modulo 10; this is because the function k is a generator of the field of the modular function on Γ 1 ( 10 ) {{\mathrm{\Gamma}}}_{1}(10) . Furthermore, we suggest a rather optimal way of evaluating the singular values of k ( τ ) k(\tau ) using the modular equations in the following two ways: one is that if j ( τ ) j(\tau ) is the elliptic modular function, then one can explicitly evaluate the value k ( τ ) k(\tau ) , and the other is that once the value k ( τ ) k(\tau ) is given, we can obtain the value k ( r τ ) k(r\tau ) for any positive rational number r immediately.

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Linear maps preserving structured singular values of matrices

Linear Algebra and its Applications ◽

10.1016/j.laa.2021.03.002 ◽

2021 ◽

Author(s):

Constantin Costara

Keyword(s):

Singular Values ◽

Linear Maps

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Current and future neutrino oscillation constraints on leptonic unitarity

Journal of High Energy Physics ◽

10.1007/jhep12(2020)068 ◽

2020 ◽

Vol 2020 (12) ◽

Author(s):

Sebastian A. R. Ellis ◽

Kevin J. Kelly ◽

Shirley Weishi Li

Keyword(s):

Precise Measurement ◽

Sterile Neutrino ◽

Current Knowledge ◽

Unknown Origin ◽

Neutrino Masses ◽

Matrix Elements ◽

Neutrino Mixing ◽

Next Generation ◽

Active Neutrino ◽

Mixing Matrix

Abstract The unitarity of the lepton mixing matrix is a critical assumption underlying the standard neutrino-mixing paradigm. However, many models seeking to explain the as-yet-unknown origin of neutrino masses predict deviations from unitarity in the mixing of the active neutrino states. Motivated by the prospect that future experiments may provide a precise measurement of the lepton mixing matrix, we revisit current constraints on unitarity violation from oscillation measurements and project how next-generation experiments will improve our current knowledge. With the next-generation data, the normalizations of all rows and columns of the lepton mixing matrix will be constrained to ≲10% precision, with the e-row best measured at ≲1% and the τ-row worst measured at ∼10% precision. The measurements of the mixing matrix elements themselves will be improved on average by a factor of 3. We highlight the complementarity of DUNE, T2HK, JUNO, and IceCube Upgrade for these improvements, as well as the importance of ντ appearance measurements and sterile neutrino searches for tests of leptonic unitarity.

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Stable Calibrations of Six-DOF Serial Robots by Using Identification Models with Equalized Singular Values

Robotica ◽

10.1017/s0263574721000229 ◽

2021 ◽

pp. 1-22

Author(s):

Zhouxiang Jiang ◽

Min Huang

Keyword(s):

Industrial Robot ◽

Singular Values ◽

Calibration Method ◽

Identification Accuracy ◽

Condition Numbers ◽

Measurement Instruments ◽

Unknown Parameters ◽

Calibration Methods ◽

Six Dof ◽

The Stability

SUMMARY In typical calibration methods (kinematic or non-kinematic) for serial industrial robot, though measurement instruments with high resolutions are adopted, measurement configurations are optimized, and redundant parameters are eliminated from identification model, calibration accuracy is still limited under measurement noise. This might be because huge gaps still exist among the singular values of typical identification Jacobians, thereby causing the identification models ill conditioned. This paper addresses such problem by using new identification models established in two steps. First, the typical models are divided into the submodels with truncated singular values. In this way, the unknown parameters corresponding to the abnormal singular values are removed, thereby reducing the condition numbers of the new submodels. However, these models might still be ill conditioned. Therefore, the second step is to further centralize the singular values of each submodel by using a matrix balance method. Afterward, all submodels are well conditioned and obtain much higher observability indices compared with those of typical models. Simulation results indicate that significant improvements in the stability of identification results and the identifiability of unknown parameters are acquired by using the new identification submodels. Experimental results indicate that the proposed calibration method increases the identification accuracy without incurring additional hardware setup costs to the typical calibration method.

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KATRIN bound on 3+1 active-sterile neutrino mixing and the reactor antineutrino anomaly

Journal of High Energy Physics ◽

10.1007/jhep05(2020)061 ◽

2020 ◽

Vol 2020 (5) ◽

Author(s):

C. Giunti ◽

Y.F. Li ◽

Y.Y. Zhang

Keyword(s):

Sterile Neutrino ◽

Neutrino Mixing ◽

Reactor Antineutrino

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OVERVIEW OF SUSY GUT MODELS OF NEUTRINO MIXING

International Journal of Modern Physics A ◽

10.1142/s0217751x03017300 ◽

2003 ◽

Vol 18 (22) ◽

pp. 3971-3979 ◽

Cited By ~ 1

Author(s):

S.M. BARR

Keyword(s):

Grand Unification ◽

Neutrino Masses ◽

Neutrino Mixing ◽

Neutrino Masses And Mixings

A brief review is given of some ideas for explaining neutrino masses and mixings within the context of supersymmetric grand unification. Emphasis is put on so-called lopsided models.

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