Lorentz Group Projector Technique for Decomposing Reducible Representations and Applications to High Spins

Abstract: The momentum-independent Casimir operators of the homogeneous spin-Lorentz group are employed in the construction of covariant projector operators, which can decompose anyone of its reducible finite-dimensional representation spaces into irreducible components. One of the benefits from such operators is that any one of the finite-dimensional carrier spaces of the Lorentz group representations can be equipped with Lorentz vector indices because any such space can be embedded in a Lorentz tensor of a properly-de… Show more

“…The method was first introduced for the Lorentz group in Ref. [16] and has proven to be quite effective for SUðNÞ.…”

“…The decomposition can be achieved by adapting the projector technique for decomposing reducible representations introduced in Ref. [16]. Following the lines of that reference, the sought projection operators P ðmÞ are thus constructed as…”

Spin and flavor projection operators in theSU(2Nf)spin-flavor group

“…The method was first introduced for the Lorentz group in Ref. [16] and has proven to be quite effective for SUðNÞ.…”

“…The decomposition can be achieved by adapting the projector technique for decomposing reducible representations introduced in Ref. [16]. Following the lines of that reference, the sought projection operators P ðmÞ are thus constructed as…”

Spin and flavor projection operators in theSU(2Nf)spin-flavor group