- In
quantum mechanics, an
antisymmetrizer A {\displaystyle {\mathcal {A}}} (also
known as an
antisymmetrizing operator) is a
linear operator that makes...
- a
thick zigzag or wavy bar
crossing the
index lines horizontally.
Antisymmetrization of
indices is
represented by a
thick straight line
crossing the index...
-
alternating map is zero; similarly, the
antisymmetrization of a
symmetric map is zero,
while the
antisymmetrization of an anti-symmetric map is its double...
-
tensor may be
antisymmetrized or symmetrized, and
there is
according notation. We
demonstrate the
notation by example. Let's
antisymmetrize the type-(0...
- In physics, the
Moyal bracket is the
suitably normalized antisymmetrization of the phase-space star product. The
Moyal bracket was
developed in
about 1940...
- }\right),\end{aligned}}}
where square brackets conventionally denote antisymmetrization over
bracketed indices, i.e. g α [ β , γ ] ϵ = 1 2 ( g α β , γ ϵ −...
-
stimulated electronic states of the monomers. Thus, no
intermolecular antisymmetrization of the
electronic states is included, and the
Pauli exclusion principle...
- {\displaystyle f} can be
recovered if both its
symmetrization and
antisymmetrization are
known is when n = 2 {\displaystyle n=2} and the
abelian group...
- in use. More generally,
irrespective of the
number of dimensions,
antisymmetrization over p {\displaystyle p}
indices may be
expressed as T [ a 1 … a p...
-
totally antisymmetric part of the tensor. It is thus
equivalent to
antisymmetrization followed by
applying the
Hodge star. The unit
volume form ω = ⋆ 1...