「Tensor」の共起表現一覧(1語右で並び替え)
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| Thermal ellipsoids can be defined by a | tensor, a mathematical object which allows the defini |
| meaning of "rank" is similar to its meaning in | tensor algebra but not to the linear algebra concept |
| mmatic notation is very useful in manipulating | tensor algebra. |
| This possibility is a | tensor analogue of the well known that a null vector |
| Later Schouten wrote | Tensor Analysis for Physicists attempting to present |
| am, J. E. Marsden, and T. S. Ratiu, Manifolds, | Tensor Analysis, and Applications, Springer-Verlag (1 |
| where W is the Weyl | tensor, and P the Schouten tensor given in terms of t |
| See also: theory of elasticity, strain | tensor and holographic interferometry. |
| ey matching conditions stating that the metric | tensor and extrinsic curvature tensor must agree. |
| some ambiguity in regulating the stress-energy | tensor, and this depends upon the curvature. |
| for a more detailed discussion of the Lanczos | tensor and spinor. |
| me in the presence of matter-contain the Ricci | tensor, and so calculating the Christoffel symbols is |
| iative processes tend to stand out, with heavy | tensor and scalar mesons decaying dominantly into vec |
| blished on the theories of Symmetry groups and | Tensor and Matrix algebra, then applied mathematics a |
| Ramond field appears, together with the metric | tensor and dilaton, as a set of massless excitations |
| In that case the components of the | tensor are different, say |
| ace, 1 time) gives , the trace of the Einstein | tensor, as the negative of , the Ricci tensor's trace |
| ry in this category has the square of the Weyl | tensor as the Lagrangian |
| uantization is based on decomposing the metric | tensor as follows, |
| asymptotically approach a well-defined metric | tensor at infinity - for example a spacetime that asy |
| theory of lifts in | tensor bundles |
| sformations on the manifold, it behaves like a | tensor, but under general coordinate transformations, |
| In coordinates, and denoting the Ricci | tensor by Rij and the scalar curvature by R, the comp |
| ten independent degrees of freedom of the Weyl | tensor Cabcd in the Newman-Penrose Formalism for gene |
| He is most famous as the inventor of the | tensor calculus but published important work in many |
| tions, and he used the newly developed tool of | tensor calculus to extend the special theory's global |
| Dirk J. Struik, "J A Schouten and the | tensor calculus," Nieuw Arch. |
| In addition the Bianchi formula for the Weyl | tensor can be rewritten to |
| The left Cauchy-Green deformation | tensor can then be expressed as |
| The topogravitic | tensor can be interpreted as representing the section |
| vita connection , the variation of the Riemann | tensor can be calculated as, |
| Riemannian or Lorentzian manifold whose metric | tensor can be written in form |
| tion, which can be viewed as projection onto a | tensor component. |
| As indicated above, the | tensor components correspond to gravitational waves. |
| where Tab are the energy-momentum | tensor components. |
| hat in general relativity, the electrogravitic | tensor controls tidal stresses on small objects, as m |
| But it is also possible to look for | tensor currents. |
| It is a functional of the metric | tensor defined at a (D-1)-dimensional compact surface |
| A metric | tensor describes the geometry of spacetime. |
| where Tab is the stress-energy | tensor describing the amount and motion of all matter |
| context, they are sometimes called birdtracks, | tensor diagrams, or Penrose graphical notation. |
| The geometrical shape has the Ricci | tensor equal to zero; this fact makes it relevant as |
| his formulation is that the scalar, vector and | tensor evolution equations are decoupled. |
| The | Tensor Fascia Lata attaches about 5cm away at the ili |
| Has rich feature set for scalar, vector, and | tensor field visualization. |
| transforms as a two-form i.e. an antisymmetric | tensor field with two indices. |
| in addition to the metric, which is a rank two | tensor field, there is a scalar field, φ, which has t |
| is widely used in mathematical physics, these | tensor fields should also give rise to specific contr |
| These | tensor fields should obey any relevant physical laws |
| up Elastic Liquids with his second text, Body | Tensor Fields in Continuum Mechanics (Academic Press, |
| is a Lorentzian manifold equipped with certain | tensor fields which are taken to model states of ordi |
| extbooks in rheology (Elastic Liquids and Body | Tensor Fields in Continuum Mechanics) he was one of t |
| systems, and is usually expressed in terms of | tensor fields. |
| As with scalar fluctuations, | tensor fluctuations are expected to follow a power la |
| The presence of primordial | tensor fluctuations (manifested as gravity waves) is |
| d as a function of the deviation of the metric | tensor from its prescribed asymptotic form. |
| description of how one can determine the tidal | tensor from observations of a single timelike congrue |
| r field φ comes from a component of the metric | tensor g55 where the figure 5 labels an additional, f |
| oted as ds and is given in terms of the metric | tensor gab as |
| Tensor Geometry: The Geometric Viewpoint and its Uses | |
| f triangle covariance in definition of inertia | tensor gives eventually |
| ential Aμ comes from a component of the metric | tensor gμ5 where the figure 5 labels an additional, f |
| where the Lanczos | tensor has the symmetries |
| Diffusion | tensor imaging (DTI) is a related use of MR to measur |
| Diffusion | tensor imaging is a non-invasive method to study the |
| ography, magnetic resonance imaging, diffusion | tensor imaging tractography techniques, and the new f |
| A 2009 meta-analysis of diffusion | tensor imaging studies identified two consistent loca |
| Newer technologies such as fMRI and diffusion | tensor imaging can help identify biologically relevan |
| cts in the spinal cord and brain via Diffusion | Tensor Imaging. |
| Four-tensor is a frequent abbreviation for a | tensor in a four-dimensional spacetime. |
| A | tensor in the theory of quadratic Lagrangians, which |
| cle, we will only attempt to define the metric | tensor in the domain of a single chart. |
| The idea of a | tensor in physical science evolved from attempts to d |
| ion rule differs from the rule for an ordinary | tensor in the intermediate treatment only by the pres |
| Therefore we can decompose the expansion | tensor into its traceless part plus a the trace part. |
| y and then placing the resulting stress-energy | tensor into the Einstein field equations. |
| The Einstein | tensor is symmetric |
| Thus another name for the Einstein | tensor is the trace-reversed Ricci tensor. |
| In abstract indices the Bach | tensor is given by |
| In general relativity, the topogravitic | tensor is one of the three pieces of the Bel decompos |
| The metric | tensor is represented by a U-shaped loop or an upside |
| The Levi-Civita antisymmetric | tensor is represented by a thick horizontal bar with |
| ds are Riemannian manifolds in which the Ricci | tensor is proportional (by some constant, not otherwi |
| Thus, the Lanczos potential | tensor is a gravitational field analog of the vector |
| In these coordinates, the metric | tensor is well-approximated by the Euclidean metric, |
| is a Lorentzian manifold in which the Einstein | tensor is null. |
| The | tensor is positive definite as the component of the f |
| e-third of the trace of the orthogonalized Uij | tensor) is listed in these columns. |
| r-Newman metric, the determinant of the metric | tensor is everywhere equal to negative one, even near |
| aterial in a strong magnetic field, the stress | tensor is non-symmetric. |
| hen the expectation value of the stress-energy | tensor is M/2 at A and M/2 at B, but we would never o |
| The stress-energy | tensor is the source of the gravitational field in th |
| ces taking integral values from 0 to 3. Such a | tensor is said to have contravariant rank n and covar |
| on in which the only term in the stress-energy | tensor is a cosmological constant term. |
| and therefore, the stress-energy | tensor isn't symmetric. |
| usually involves a few simple "identities" of | tensor manipulations. |
| Diffusion | tensor MRI (DTI) allows for the investigation of whit |
| The first context is essentially a | tensor multiplied by an extra sign factor, such that |
| The cricothyroid muscle is the only | tensor muscle of the larynx, aiding with phonation. |
| evolution of the metric and the stress-energy | tensor must be solved for together. |
| In general relativity, the Einstein | tensor occurs in the Einstein field equations for gra |
| The source for the conserved stress | tensor of the boundary theory is the boundary value o |
| y and general relativity, the trace-free Ricci | tensor of a pseudo-Riemannian manifold (M,g) is the t |
| eld equations are the components of the metric | tensor of spacetime. |
| The strain | tensor of the motion of turning the rod produces a no |
| The curvature | tensor of this anti-Mach-metric is of the null-type i |
| The traceless quadrupole moment | tensor of a system of charges (or masses, for example |
| the effective vanishing of the Weyl curvature | tensor of the cosmological gravitational field near t |
| be used in conjunction with Darcy's law and a | tensor of hydraulic conductivity to determine the flu |
| ongruence, is a way of breaking up the Riemann | tensor of a pseudo-Riemannian manifold into four piec |
| of a flat background represented by the metric | tensor of Minkowski spacetime. |
| s denoted a scalar-it may also be considered a | tensor of rank 0. The next level of complexity concer |
| is the metric | tensor on the manifold. |
| In differential geometry, the Cotton | tensor on a (pseudo)-Riemannian manifold of dimension |
| geometrical applications of | tensor operators |
| In general relativity, the tidal | tensor or gravitoelectric tensor is one of the pieces |
| al field is considered to be the stress-energy | tensor or matter tensor. |
| an be approximated by the infinitesimal strain | tensor or Cauchy's strain tensor, . |
| he Segre classification of the energy-momentum | tensor or the Petrov classification of the Weyl tenso |
| Since χ is a | tensor, P is not necessarily colinear with E. |
| The | tensor perturbation is truly gauge independent, since |
| n these evolve independently of the vector and | tensor perturbations and are the predominant ones aff |
| rturbations vanish in cosmic inflation and the | tensor perturbations are gravitational waves, which h |
| The Einstein | tensor plays the role of distinguishing these frames. |
| Cadabra has extensive functionality for | tensor polynomial simplification including multi-term |
| provided the coordinate system and the metric | tensor possess some common symmetries. |
| partite quantum syste whose state space is the | tensor product |
| Day's | tensor product construction can be used to generate c |
| o superselection sectors, each of which is the | tensor product of in irreducible representation of G |
| the connection between graph coloring and the | tensor product of graphs. |
| that determine the exact decomposition of the | tensor product of two representations of a group into |
| milies associated with a primary field and the | tensor product is realized by operator product expans |
| In the illustration, each vertex in the | tensor product is shown using a color from the first |
| When the energy-momentum | tensor represents an electromagnetic field, a Killing |
| When the energy-momentum | tensor represents a perfect fluid, every Killing vect |
| The Weyl | tensor represents the part of the gravitational field |
| the vorticity | tensor represents any tendency of the initial sphere |
| ction of such motion relative to the alignment | tensor; scaling factors therefore will differ with th |
| are known as the Harvard CMTs (centroid moment | tensor solutions) and are continued today at Lamont-D |
| The | tensor STij is gauge invariant: it does not change un |
| includes the quantum corrections to the metric | tensor, such as the worldsheet instantons. |
| apted frame can be found in which the Einstein | tensor takes the form |
| It is the only known conformally invariant | tensor that is algebraically independent of the Weyl |
| A dielectric | tensor that is not Hermitian gives rise to complex ei |
| tter and energy in the form of a stress-energy | tensor, the EFE are understood to be equations for th |
| ck proposed his generalization of the Einstein | tensor, the physicists began to discuss the quadratic |
| ute only a traceless term to the stress-energy | tensor, this implies that in a region of spacetime co |
| pending on the fluid, which relates the stress | tensor to the shear rate tensor. |
| The local reduction of the general metric | tensor to the Minkowski metric corresponds to free-fa |
| Addition of the matter stress-energy-momentum | tensor to the Landau-Lifshitz pseudotensor results in |
| skate companies: Almost, Enjoi, Speed Demons, | Tensor Trucks, Blind, Cliche, and Darkstar Skateboard |
| wall are the orifice of the semicanal for the | Tensor tympani muscle and the tympanic orifice of the |
| e pressure and density from the energy density | tensor Tμν, and g* as the effective number of degrees |
| r is usually a quantity that transforms like a | tensor under an orientation preserving coordinate tra |
| Regions of spacetime in which the Weyl | tensor vanishes contain no gravitational radiation an |
| ons, are associated with places where the Weyl | tensor vanishes identically. |
| ymptotically empty in the sense that its Ricci | tensor vanishes in a neighbourhood of the boundary of |
| h theories are obtained when the stress-energy | tensor vanishes. |
| us part of the tube, and blends below with the | Tensor veli palatini muscle. |
| The | tensor veli palatini is lateral to the levator and do |
| is plugged into the symmetric part of the Weyl | tensor W. |
| an important identity regarding the curl of a | tensor we know that for a continuous, single-valued d |
| r Pulay) is an error that occurs in the stress | tensor when using density functional theory. |
| t cause a variation of a medium's permittivity | tensor when an external electric field is applied, pr |
| They depend on the stress-energy | tensor, which in turn depends on the (unknown) metric |
| on of numbers at every point in space (i.e., a | tensor) which would describe how much it was bent or |
| is an equation involving the Riemann curvature | tensor, which measures the change in separation of ne |
| e a nonzero cosmological constant or a Riemann | tensor which is not self-dual. |
| itten as a functional integral over the metric | tensor, which is now the quantum field under consider |
| omplex refractive index or dielectric function | tensor, which gives access to fundamental physical pa |
| in's idea of introducing a nonsymmetric metric | tensor with the symmetric part corresponding to the u |
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