Classical and Quantum Gravity, ISSN 0264-9381, 05/2015, Volume 32, Issue 9, pp. 95005 - 95054

We consider the De Donder-Weyl (DW) Hamiltonian formulation of the Palatini action of vielbein gravity formulated in terms of the solder form and spin...

Geometry | De Donder-Weyl | Palatini gravity | Multisymplectic | Vielbein gravity | GENERAL-RELATIVITY | PHYSICS, MULTIDISCIPLINARY | SPIN STRUCTURES | CLASSICAL FIELD-THEORY | ASHTEKAR VARIABLES | CANONICAL STRUCTURE | GAUGE-NATURAL BUNDLES | L-INFINITY-ALGEBRAS | QUANTIZED-FIELDS | SYMPLECTIC APPROACH | POISSON BRACKET | vielbein gravity | ASTRONOMY & ASTROPHYSICS | multisymplectic geometry | PHYSICS, PARTICLES & FIELDS | Formulations | Gravitation | Construction | Solders | Brackets | Mathematical analysis | Independent variables | Quantum gravity | General Relativity and Quantum Cosmology | Mathematics | Mathematical Physics | Physics

Geometry | De Donder-Weyl | Palatini gravity | Multisymplectic | Vielbein gravity | GENERAL-RELATIVITY | PHYSICS, MULTIDISCIPLINARY | SPIN STRUCTURES | CLASSICAL FIELD-THEORY | ASHTEKAR VARIABLES | CANONICAL STRUCTURE | GAUGE-NATURAL BUNDLES | L-INFINITY-ALGEBRAS | QUANTIZED-FIELDS | SYMPLECTIC APPROACH | POISSON BRACKET | vielbein gravity | ASTRONOMY & ASTROPHYSICS | multisymplectic geometry | PHYSICS, PARTICLES & FIELDS | Formulations | Gravitation | Construction | Solders | Brackets | Mathematical analysis | Independent variables | Quantum gravity | General Relativity and Quantum Cosmology | Mathematics | Mathematical Physics | Physics

Journal Article

SpringerBriefs in Applied Sciences and Technology, ISSN 2191-530X, 2014, Issue 9783319024165, pp. 9 - 88

Fokker–Planck diffusion equation | Non-linear viscoelasticity | Order fluids | Hadamard instability | Linear viscoelasticity | Canonical forms | Constant stretch history | Fading memory | Burgers equation | Consistency with thermodynamics | Smoluchowski diffusion equation | Maxwell-like constitutive differential equations | Dissipative instability | Implicit constitutive structures | Rate of dissipation | Nested integral stress | Non-local stress | Single integral constitutive equations | Local stress

Journal Article

The European Physical Journal C, ISSN 1434-6044, 3/2016, Volume 76, Issue 3, pp. 1 - 8

Finite BRST-BV transformations are studied systematically within the W–X formulation of the standard and the Sp(2)-extended field–antifield formalism. The...

Nuclear Physics, Heavy Ions, Hadrons | Measurement Science and Instrumentation | Nuclear Energy | Quantum Field Theories, String Theory | Physics | Elementary Particles, Quantum Field Theory | Astronomy, Astrophysics and Cosmology | GAUGE-THEORIES | LINEARLY DEPENDENT GENERATORS | INDEPENDENCE | LAGRANGIAN QUANTIZATION | CONSTRAINTS | GENERALIZED CANONICAL QUANTIZATION | PHYSICS, PARTICLES & FIELDS | Formulations | Transformations | Mathematical analysis | Formalism | Standards | Physics - High Energy Physics - Theory | Physics and Astronomy (miscellaneous) | Уорда тождество | High Energy Physics | Theory | Engineering (miscellaneous) | калибровочные поля | High Energy Physics - Theory

Nuclear Physics, Heavy Ions, Hadrons | Measurement Science and Instrumentation | Nuclear Energy | Quantum Field Theories, String Theory | Physics | Elementary Particles, Quantum Field Theory | Astronomy, Astrophysics and Cosmology | GAUGE-THEORIES | LINEARLY DEPENDENT GENERATORS | INDEPENDENCE | LAGRANGIAN QUANTIZATION | CONSTRAINTS | GENERALIZED CANONICAL QUANTIZATION | PHYSICS, PARTICLES & FIELDS | Formulations | Transformations | Mathematical analysis | Formalism | Standards | Physics - High Energy Physics - Theory | Physics and Astronomy (miscellaneous) | Уорда тождество | High Energy Physics | Theory | Engineering (miscellaneous) | калибровочные поля | High Energy Physics - Theory

Journal Article

IEEE Transactions on Pattern Analysis and Machine Intelligence, ISSN 0162-8828, 01/2011, Volume 33, Issue 1, pp. 194 - 200

Canonical Correlation Analysis (CCA) is a well-known technique for finding the correlations between two sets of multidimensional variables. It projects both...

Support vector machines | Correlation | least squares | Euclidean distance | regularization | Eigenvalues and eigenfunctions | multilabel learning | Complexity theory | Sparse matrices | partial least squares | Optimization | Canonical correlation analysis | REGRESSION | COMPUTER SCIENCE, ARTIFICIAL INTELLIGENCE | ENGINEERING, ELECTRICAL & ELECTRONIC | Least-Squares Analysis | Multivariate Analysis | Gene Expression Profiling - methods | Algorithms | Models, Statistical | Artificial Intelligence | Studies | Formulations | Least squares method | Correlation analysis | Data sets | Classification | Benchmarking | Regularization | Pattern analysis

Support vector machines | Correlation | least squares | Euclidean distance | regularization | Eigenvalues and eigenfunctions | multilabel learning | Complexity theory | Sparse matrices | partial least squares | Optimization | Canonical correlation analysis | REGRESSION | COMPUTER SCIENCE, ARTIFICIAL INTELLIGENCE | ENGINEERING, ELECTRICAL & ELECTRONIC | Least-Squares Analysis | Multivariate Analysis | Gene Expression Profiling - methods | Algorithms | Models, Statistical | Artificial Intelligence | Studies | Formulations | Least squares method | Correlation analysis | Data sets | Classification | Benchmarking | Regularization | Pattern analysis

Journal Article

IEEE Transactions on Pattern Analysis and Machine Intelligence, ISSN 0162-8828, 12/2013, Volume 35, Issue 12, pp. 3050 - 3065

In this paper, we study canonical correlation analysis (CCA), which is a powerful tool in multivariate data analysis for finding the correlation between two...

Sparsity | multivariate data | Data models | Sparse matrices | Orthogonality | linear discriminant analysis | Canonical correlation analysis | canonical correlation analysis | orthogonality | DECOMPOSITION | CLASSIFICATION | PRINCIPAL COMPONENTS | COMPUTER SCIENCE, ARTIFICIAL INTELLIGENCE | ENGINEERING, ELECTRICAL & ELECTRONIC | DISCRIMINANT-ANALYSIS | SETS | VARIABLES | Usage | Discriminant analysis | Factor analysis | Recursive functions | Canonical correlation (Statistics)

Sparsity | multivariate data | Data models | Sparse matrices | Orthogonality | linear discriminant analysis | Canonical correlation analysis | canonical correlation analysis | orthogonality | DECOMPOSITION | CLASSIFICATION | PRINCIPAL COMPONENTS | COMPUTER SCIENCE, ARTIFICIAL INTELLIGENCE | ENGINEERING, ELECTRICAL & ELECTRONIC | DISCRIMINANT-ANALYSIS | SETS | VARIABLES | Usage | Discriminant analysis | Factor analysis | Recursive functions | Canonical correlation (Statistics)

Journal Article

Annalen der Physik, ISSN 0003-3804, 04/2011, Volume 523, Issue 4, pp. 296 - 353

The present article aims at an extension of the canonical formalism of Arnowitt, Deser, and Misner from self‐gravitating point‐masses to objects with spin....

binary stars | post‐Newtonian approximation | Canonical formalism | spin | post-Newtonian approximation | ANGULAR-MOMENTUM | POLARIZED MEDIA | PERFECT FLUIDS | PHYSICS, MULTIDISCIPLINARY | QUANTUM-GRAVITY | BLACK-HOLES | EXTENDED BODIES | HAMILTONIAN-FORMULATION | QUANTIZED GRAVITATIONAL FIELD | RADIATION-REACTION | Construction | Approximation | Mathematical analysis | Rotating bodies | Relativity | Mathematical models | Formalism | Quadrupoles

binary stars | post‐Newtonian approximation | Canonical formalism | spin | post-Newtonian approximation | ANGULAR-MOMENTUM | POLARIZED MEDIA | PERFECT FLUIDS | PHYSICS, MULTIDISCIPLINARY | QUANTUM-GRAVITY | BLACK-HOLES | EXTENDED BODIES | HAMILTONIAN-FORMULATION | QUANTIZED GRAVITATIONAL FIELD | RADIATION-REACTION | Construction | Approximation | Mathematical analysis | Rotating bodies | Relativity | Mathematical models | Formalism | Quadrupoles

Journal Article

Physica A: Statistical Mechanics and its Applications, ISSN 0378-4371, 03/2018, Volume 493, pp. 125 - 134

The origin of free energy on the earth is solar radiation. However, the amount of free energy it contains has seldom been investigated, because the free energy...

Photon gas | Canonical formulation | Photosynthesis | Carnot efficiency | Free energy | JENNINGS | STATISTICAL-MECHANICS | MAXIMUM-ENTROPY | PHYSICS, MULTIDISCIPLINARY | COWORKERS | NEGATIVE ENTROPY PRODUCTION | THERMODYNAMICS | INFORMATION-THEORY | Thermodynamics | Chlorophyll | Phytochemistry | Radiation

Photon gas | Canonical formulation | Photosynthesis | Carnot efficiency | Free energy | JENNINGS | STATISTICAL-MECHANICS | MAXIMUM-ENTROPY | PHYSICS, MULTIDISCIPLINARY | COWORKERS | NEGATIVE ENTROPY PRODUCTION | THERMODYNAMICS | INFORMATION-THEORY | Thermodynamics | Chlorophyll | Phytochemistry | Radiation

Journal Article

The European Physical Journal C, ISSN 1434-6044, 9/2015, Volume 75, Issue 9, pp. 1 - 11

We carry out ADM splitting in the Lagrangian formulation and establish a procedure in which (almost) all of the unphysical components of the metric are removed...

Nuclear Physics, Heavy Ions, Hadrons | Measurement Science and Instrumentation | Nuclear Energy | Quantum Field Theories, String Theory | Physics | Elementary Particles, Quantum Field Theory | Astronomy, Astrophysics and Cosmology | INVARIANCE | REDUCTION | REPRESENTATIONS | EQUATIONS | CANONICAL APPROACH | SPACETIME DIFFEOMORPHISMS | QUANTIZATION | QUANTUM-GRAVITY | GAUGE | DIRAC | PHYSICS, PARTICLES & FIELDS | Formulations | Geometry | Time dependence | Gravitation | Splitting | Flats | Three dimensional | Symmetry | Physics - High Energy Physics - Theory | Physics and Astronomy (miscellaneous) | General Relativity and Quantum Cosmology | Engineering (miscellaneous) | High Energy Physics - Theory

Nuclear Physics, Heavy Ions, Hadrons | Measurement Science and Instrumentation | Nuclear Energy | Quantum Field Theories, String Theory | Physics | Elementary Particles, Quantum Field Theory | Astronomy, Astrophysics and Cosmology | INVARIANCE | REDUCTION | REPRESENTATIONS | EQUATIONS | CANONICAL APPROACH | SPACETIME DIFFEOMORPHISMS | QUANTIZATION | QUANTUM-GRAVITY | GAUGE | DIRAC | PHYSICS, PARTICLES & FIELDS | Formulations | Geometry | Time dependence | Gravitation | Splitting | Flats | Three dimensional | Symmetry | Physics - High Energy Physics - Theory | Physics and Astronomy (miscellaneous) | General Relativity and Quantum Cosmology | Engineering (miscellaneous) | High Energy Physics - Theory

Journal Article

Classical and Quantum Gravity, ISSN 0264-9381, 05/2016, Volume 33, Issue 11

Starting from a constrained real BF-type action for general relativity that includes both the Immirzi parameter and the cosmological constant, we obtain the...

canonical general relativity | BF gravity | Immirzi parameter | BLACK-HOLE ENTROPY | AREA | GENERAL-RELATIVITY | PHYSICS, MULTIDISCIPLINARY | LOOP QUANTUM-GRAVITY | ASTRONOMY & ASTROPHYSICS | REAL | PHYSICS, PARTICLES & FIELDS

canonical general relativity | BF gravity | Immirzi parameter | BLACK-HOLE ENTROPY | AREA | GENERAL-RELATIVITY | PHYSICS, MULTIDISCIPLINARY | LOOP QUANTUM-GRAVITY | ASTRONOMY & ASTROPHYSICS | REAL | PHYSICS, PARTICLES & FIELDS

Journal Article

Journal of Computational Physics, ISSN 0021-9991, 11/2013, Volume 252, pp. 558 - 572

In this paper, the Standard, Composite, and Canonical forms of the Simplified P(n) (SP(n)) equations are reviewed and their corresponding iterative properties...

Computation | Mathematical analysis | Scattering | Canonical forms | Fourier analysis | Mathematical models | Iterative methods | Standards

Computation | Mathematical analysis | Scattering | Canonical forms | Fourier analysis | Mathematical models | Iterative methods | Standards

Journal Article

Journal of Computational Physics, ISSN 0021-9991, 11/2013, Volume 252, pp. 558 - 572

In this paper, the Standard, Composite, and Canonical forms of the Simplified PNPN (SPNSPN) equations are reviewed and their corresponding iterative properties...

Computation | Mathematical analysis | Scattering | Canonical forms | Fourier analysis | Mathematical models | Iterative methods | Standards

Computation | Mathematical analysis | Scattering | Canonical forms | Fourier analysis | Mathematical models | Iterative methods | Standards

Journal Article

International Journal of Geometric Methods in Modern Physics, ISSN 0219-8878, 03/2017, Volume 14, Issue 3

Canonical formulation of higher order theory of gravity requires to fix (in addition to the metric), the scalar curvature, which is acceleration in disguise,...

Higher order theory | branched Hamiltonian | canonical formulation | R2 GRAVITY | PARTICLE | FIELD-THEORY | ORDER GRAVITY THEORY | MODEL | PHYSICS, MATHEMATICAL | QUANTUM COSMOLOGY | DIMENSIONS | TENSOR | SYMMETRY | QUANTIZATION

Higher order theory | branched Hamiltonian | canonical formulation | R2 GRAVITY | PARTICLE | FIELD-THEORY | ORDER GRAVITY THEORY | MODEL | PHYSICS, MATHEMATICAL | QUANTUM COSMOLOGY | DIMENSIONS | TENSOR | SYMMETRY | QUANTIZATION

Journal Article

INFORMS Journal on Computing, ISSN 1091-9856, 11/2011, Volume 23, Issue 4, pp. 546 - 556

By means of a model based on a set covering formulation, it is shown how the p -median problem can be solved with just a column generation approach that is...

median | column-and-row generation | discrete location | Discrete location | P-median | Column-and-row generation | GRAPH | CANONICAL REPRESENTATION | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | UNCAPACITATED FACILITY LOCATION | PLANT LOCATION PROBLEM | p-median | Fuzzy sets | Set theory | Algorithms | Research | Mathematical research | Computer Science | Operations Research

median | column-and-row generation | discrete location | Discrete location | P-median | Column-and-row generation | GRAPH | CANONICAL REPRESENTATION | COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS | OPERATIONS RESEARCH & MANAGEMENT SCIENCE | UNCAPACITATED FACILITY LOCATION | PLANT LOCATION PROBLEM | p-median | Fuzzy sets | Set theory | Algorithms | Research | Mathematical research | Computer Science | Operations Research

Journal Article

Living Reviews in Relativity, ISSN 2367-3613, 12/2018, Volume 21, Issue 1, pp. 1 - 117

Hamiltonian formalisms provide powerful tools for the computation of approximate analytic solutions of the Einstein field equations. The post-Newtonian...

Radiation reaction and emission | Classical spin and gravity | Astrophysics and Astroparticles | General relativity | Cosmology | Compact binary systems | Analytical and dimensional regularization | Classical and Quantum Gravitation, Relativity Theory | Physics | Canonical equations of motion | Hamiltonian formalism | BLACK-HOLE DYNAMICS | ONE-BODY APPROACH | CANONICAL FORMALISM | POINT-MASS SYSTEMS | GRAVITATIONAL-RADIATION-REACTION | DIRECT INTEGRATION | COALESCING BINARIES | RELAXED EINSTEIN EQUATIONS | DIMENSIONAL REGULARIZATION | 2-BODY PROBLEM | PHYSICS, PARTICLES & FIELDS | Physics - General Relativity and Quantum Cosmology | Review

Radiation reaction and emission | Classical spin and gravity | Astrophysics and Astroparticles | General relativity | Cosmology | Compact binary systems | Analytical and dimensional regularization | Classical and Quantum Gravitation, Relativity Theory | Physics | Canonical equations of motion | Hamiltonian formalism | BLACK-HOLE DYNAMICS | ONE-BODY APPROACH | CANONICAL FORMALISM | POINT-MASS SYSTEMS | GRAVITATIONAL-RADIATION-REACTION | DIRECT INTEGRATION | COALESCING BINARIES | RELAXED EINSTEIN EQUATIONS | DIMENSIONAL REGULARIZATION | 2-BODY PROBLEM | PHYSICS, PARTICLES & FIELDS | Physics - General Relativity and Quantum Cosmology | Review

Journal Article

General Relativity and Gravitation, ISSN 0001-7701, 5/2015, Volume 47, Issue 5, pp. 1 - 15

We find the canonical formulation of the Poincaré BFCG theory in terms of the spatial 2-connection and its canonically conjugate momenta. We show that the...

2-Poincaré group | Theoretical, Mathematical and Computational Physics | BFCG theory | Cosmology | Quantum Physics | Canonical formulation | Differential Geometry | Classical and Quantum Gravitation, Relativity Theory | Physics | Quantum gravity | Astronomy, Astrophysics and Cosmology | 2-Poincare group | PHYSICS, MULTIDISCIPLINARY | ASTRONOMY & ASTROPHYSICS | PHYSICS, PARTICLES & FIELDS | Physics - General Relativity and Quantum Cosmology

2-Poincaré group | Theoretical, Mathematical and Computational Physics | BFCG theory | Cosmology | Quantum Physics | Canonical formulation | Differential Geometry | Classical and Quantum Gravitation, Relativity Theory | Physics | Quantum gravity | Astronomy, Astrophysics and Cosmology | 2-Poincare group | PHYSICS, MULTIDISCIPLINARY | ASTRONOMY & ASTROPHYSICS | PHYSICS, PARTICLES & FIELDS | Physics - General Relativity and Quantum Cosmology

Journal Article

Circuits, Systems, and Signal Processing, ISSN 0278-081X, 6/2015, Volume 34, Issue 6, pp. 2053 - 2064

Many reconstruction algorithms for bandlimited signals associated with linear canonical transform have been proposed. However, these reconstruction algorithms...

Reconstruction | Engineering | (a, b, c, d)$$ ( a , b , c , d ) -Bandlimited signal | Minimum mean squared error | Signal, Image and Speech Processing | Stochastic processes | Electronics and Microelectronics, Instrumentation | Circuits and Systems | Electrical Engineering | (a, b, c, d)-Bandlimited signal | EXTRAPOLATION | DOMAIN | LOCATIONS | NONUNIFORM SAMPLES | MULTICHANNEL | LINEAR CANONICAL TRANSFORM | BAND-LIMITED SIGNALS | ENGINEERING, ELECTRICAL & ELECTRONIC | Analysis | Algorithms | Signal processing | Fourier transforms | Stochastic models

Reconstruction | Engineering | (a, b, c, d)$$ ( a , b , c , d ) -Bandlimited signal | Minimum mean squared error | Signal, Image and Speech Processing | Stochastic processes | Electronics and Microelectronics, Instrumentation | Circuits and Systems | Electrical Engineering | (a, b, c, d)-Bandlimited signal | EXTRAPOLATION | DOMAIN | LOCATIONS | NONUNIFORM SAMPLES | MULTICHANNEL | LINEAR CANONICAL TRANSFORM | BAND-LIMITED SIGNALS | ENGINEERING, ELECTRICAL & ELECTRONIC | Analysis | Algorithms | Signal processing | Fourier transforms | Stochastic models

Journal Article