Examples of 'spinor' in a sentence
Meaning of "spinor"
Spinor is an adjective that describes a type of mathematical object used in quantum mechanics and physics to represent the quantum states of fundamental particles. It is a mathematical concept that has both magnitude and direction, essential for describing the properties of particles
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- An element of the fundamental representation of a Clifford algebra that transforms to its negative when the space is rotated through a complete turn from 0° to 360°
How to use "spinor" in a sentence
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spinor
It holds in particular in the doublet or spinor representation.
Killing spinor is a term used in mathematics and physics.
See the spinor map.
A spinor genus is an equivalence class for this equivalence relation.
Tensor and spinor representations.
We then say it transforms as a spinor.
The photoproduction of gravitons on spinor particles in the gravitational theory is considered.
There are essentially two frameworks for viewing the notion of a spinor.
This is the spinor map.
Investigated cosmological models based on a modified teleparallel theory of gravity with a spinor field.
The corresponding spinor can be taken as any non zero column.
In physics, fermions are described by spinor fields.
The number of supercharges in a spinor depends on the dimension and the signature of spacetime.
In quantum field theory, fermions are described by anticommuting spinor fields.
These two inequivalent classes yield spinor transformations of opposite sign.
See also
Both spinor components satisfy the Schrödinger equation.
This means that the partial derivative of a spinor is no longer a genuine tensor.
CV is a spinor space for the underlying real euclidean vector space.
Solutions to the Dirac equation for spinor fields are often called harmonic spinors.
It is described by a complex-valued vector with two components called a spinor.
They are a special kind of spinor field related to Killing vector fields and Killing tensors.
Therefore, these constitute a third kind of quantity, which is known as a spinor.
In this situation, a spinor is a sort of polarized vector.
One may then talk about " the action of a spinor on a vector.
The action of γ on a spinor φ is given by ordinary complex multiplication,.
In differential geometry and mathematical physics, a spin connection is a connection on a spinor bundle.
A manner of regarding a spinor as acting upon a vector, by an expression such as ψvψ.
In physics, tensor fields describe bosons and spinor fields describe fermions.
The above pure spinor is globally defined, and so the canonical bundle is trivial.
Thus the action of a rotation on a spinor is always double-valued.
In physical terms, a spinor should determine a probability amplitude for the quantum state.
Finally, we present the nal shape of dkp spinor in scalar and vector sectors.
This is a special case of the Atiyah-Singer-Dirac operator acting on sections of a spinor bundle.
For zero magnetization, the spinor condensate forms a spin nematic.
The above can be generalized for vector fields, tensor fields, and spinor fields.
It is sometimes also called the pure spinor bundle, as its sections are pure spinors.
In this framework, nucleons are considered as point like particle and represented by a Dirac spinor.
In fact, a parallel pure spinor field determines a canonical reduction of the structure group to SUn.
First, a review of the minimal and non-minimal pure spinor formalisms will be presented.
It is worth reviewing how spinor space and Weyl spinors are constructed, given this formalism.
In addition, sometimes the non-complexified version of has a smaller real representation, the Majorana spinor representation.
We first study the magnetic phases of spinor Bose-Einstein condensates near zero temperature.
As with the Breit equation a sixteen-component spinor Ψ is used.
Is the 4D complex Weyl spinor representation and is called twistor space.
Vector fields, tensor fields, spinor fields.
This is the ( in ) famous spinor representation, and its vectors are called spinors.
In 8 dimensions there is, projectively, a single pure spinor constraint.
Every pure spinor is annihilated by a half-dimensional subspace of C2n.
The subset of C2n that annihilates a given spinor ψ is a complex subspace Cm.
Spinor International » company.
