- Pseudoscalar
In
physics , a pseudoscalar is a quantity that behaves like a scalar, except that it changes sign under a parity inversion such asimproper rotation s while true scalar does not.The prototypical example of a pseudoscalar is the
scalar triple product . A pseudoscalar, when multiplied by an ordinary vector, becomes apseudovector oraxial vector ; a similar construction creates thepseudotensor .Mathematically, a pseudoscalar is an element of the top
exterior power of avector space . More generally, it is an element of thecanonical bundle of adifferentiable manifold .Pseudoscalars in physics
In
physics , a pseudoscalar denotes aphysical quantity analogous to a scalar. Both are physical quantities which assume a single value which is invariant underproper rotation s. However, under theparity transformation , pseudoscalars flip their signs while scalars do not.One of the most powerful ideas in physics is that physical laws do not change when one changes the coordinate system used to describe these laws. The fact that a pseudoscalar reverses its sign when the coordinate axes are inverted suggests that it is not the best object to describe a physical quantity. In 3-space, the
Hodge dual of a scalar is equal to a constant times the 3-dimensional Levi-Civita pseudotensor (or "permutation" pseudotensor); whereas the Hodge dual of a pseudoscalar is in fact a skew-symmetric (pure) tensor of rank three. The Levi-Civita pseudotensor is a completelyskew-symmetric pseudotensor of rank 3. Since the dual of the pseudoscalar is the product of two "pseudo-quantities" it can be seen that the resulting tensor is a true tensor, and does not change sign upon an inversion of axes. The situation is similar to the situation for pseudovectors and skew-symmetric tensors of rank 2. The dual of a pseudovector is a skew-symmetric tensors of rank 2 (and vice versa). It is the tensor and not the pseudovector which is the representation of the physical quantity which is invariant to a coordinate inversion, while the pseudovector is not invariant.The situation can be extended to any dimension. Generally in an "N"-dimensional space the Hodge dual of a rank "n" tensor (where "n" is less than or equal to "N"/2) will be a skew-symmetric pseudotensor of rank "N"-"n" and vice versa. In particular, in the four-dimensional spacetime of special relativity, a pseudoscalar is the dual of a fourth-rank tensor which is proportional to the four-dimensional Levi-Civita pseudotensor.
Examples
* the
magnetic charge (as it is mathematically defined, regardless of whether it exists physically),
* themagnetic flux - it is result of adot product between a vector (thesurface normal ) and pseudovector (themagnetic field ),
* the helicity is the projection (dot product) of a spin pseudovector onto the direction ofmomentum (a true vector).Pseudoscalars in geometric algebra
A pseudoscalar in a
geometric algebra is a highest-grade element of the algebra. For example, in two dimensions there are two basis vectors, e_1, e_2 and the associated highest-grade basis element is:e_1 e_2 = e_{12}.
So a pseudoscalar is a multiple of "e"12. The element "e"12 squares to −1 and commutes with all elements — behaving therefore like the imaginary scalar "i" in the
complex numbers . It is these scalar-like properties which give rise to its name.In this setting, a pseudoscalar changes sign under a parity inversion, since if
:("e"1, "e"2) → ("u"1, "u"2)
is a change of basis representing an orthogonal transformation, then
:"e"1"e"2 → "u"1"u"2 = ±"e"1"e"2,
where the sign depends on the determinant of the rotation. Pseudoscalars in geometric algebra thus correspond to the pseudoscalars in physics.
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