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Source: The Open Library
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1Tenzornaja trigonometrija
By Anatoly Sergeevich Ninul
“Tenzornaja trigonometrija” Metadata:
- Title: Tenzornaja trigonometrija
- Author: Anatoly Sergeevich Ninul
- Languages: English - rus
- Number of Pages: Median: 320
- Publisher: ➤ Fizmatkniga - Mir Publisher - Fizmatlit Publisher
- Publish Date: 2004 - 2021 - 2025
- Publish Location: Moscow, Russia - Moscow
“Tenzornaja trigonometrija” Subjects and Themes:
- Subjects: ➤ Mathematics - Geometry - Algebra - General inequality for all average values - Algebraic equations (theory and solution) - Equation roots reality (positivity) criterion - Linear Algebra - Matrix Theory - Characteristic coefficients of a matrix - Singularity parameters of a matrix (interrelation and inequalities) - Pseudoinverse matrices (exact and limit formulas) - Singular matrices - Null-prime matrix - Null-normal matrix - Lineor - Planar - All quadratic norms of matrix objects - Group Theory - Quasi-Euclidean space of index q or 1 - Pseudo-Euclidean space of index q or 1 - Plane Trigonometry - Pseudoplane Trigonometry - Tensor Calculus - Tensor Trigonometry - Eigenprojectors - Eigenreflectors - Orthogonal - Oblique - Affine - Tensor angle and its functions - Spherical - Hyperbolic - Orthospherical - Matrix trigonometric spectrum - Cosine and Sine relations and inequalities for matrix objects - Tensor of motion (or rotation) - Principal motion (or rotation) - Orthospherical motion (or rotation) - Polar decompositions of a motion tensor - QR-decomposition of a lineor - Multi-dimensional Geometry - Non-Euclidean Geometries - Geometries trigonometric models - Motions trigonometric models - Noncommutative Pythagorean Theorem - Angular defect (nature) - Angular excess (nature) - Oriented hyperspheroid - Minkowski hyperboloids - Beltrami pseudosphere - Mathematical Physics - Relativity - Minkowski space-time - Geometry of world lines - Kinematics - Dynamics - Thomas precession - Relativistic effects (trigonometric interpretation) - Relativistic Laws of Conservation (their conditions) - Mathematical Principle of Relativity - Ninul
- Places: Moscow
Edition Identifiers:
- The Open Library ID: OL59555034M - OL35374290M - OL27049231M
- Online Computer Library Center (OCLC) ID: 255128609
- All ISBNs: ➤ 5030037179 - 5940522785 - 9785030037172 - 9795030037171 - 9785940522782 - 5891554291 - 9785891554290
First Setence:
"In Theory of Matrices such classical notions as a singular matrix and its rank, eigen subspaces, annuling polynomial, projectors, and so one, have a sense only for exact matrices and at exact computations. ..."
"In Theory of Matrices such usual notions as a singular matrix, its rank, eigenvalues, eigenvectors or eigensubspaces, annuling polynomial, and so one have a sense only for exact matrices and at exact computations. ..."
Author's Alternative Names:
"Ninul A. S.", "Anatolij Sergeevič Ninul" and "by Anatoly Sergeevich Ninul"Access and General Info:
- First Year Published: 2004
- Is Full Text Available: Yes
- Is The Book Public: Yes
- Access Status: Public
Online Access
Online Borrowing:
- Borrowing from Open Library: Borrowing link
- Borrowing from Archive.org: Borrowing link
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Wiki
Source: Wikipedia
Wikipedia Results
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Length contraction
geometrical interpretation of all relativistic effects by introducing his concept of four-dimensional spacetime. The numerous and confusing visual effects of combination
Special relativity
replace Galilean transformations of Newtonian mechanics. Other effects include the relativistic corrects to the Doppler effect and the Thomas precession. It
Quantum mechanics
Arnold Sommerfeld's extension of the Bohr model to include special-relativistic effects. In the mid-1920s quantum mechanics was developed to become the standard
Velocity-addition formula
In relativistic physics, a velocity-addition formula is an equation that specifies how to combine the velocities of objects in a way that is consistent
Atomic orbital
atomic number Z, the effects of relativity become more pronounced, and especially so for s electrons, which move at relativistic velocities as they penetrate
History of special relativity
"four vector" and "six vector". He also introduced a trigonometric formulation of the relativistic velocity addition rule, which according to Sommerfeld
Aberration (astronomy)
related to light-time correction and relativistic beaming, although it is often considered separately from these effects. Aberration is historically significant
Foldy–Wouthuysen transformation
discussion of the Foldy–Wouthuysen-type transformations in particle interpretation of relativistic wave equations is in Acharya and Sudarshan (1960). Its utility
Victor Brumberg
February 12, 1933) is a Russian theoretical physicist specializing in relativistic celestial mechanics and astrometry. He worked as a chief-scientist at
Astronomical unit
error, and based on techniques that did not yet standardize all relativistic effects, and thus were not constant for all observers. In 2012, finding that