Optimally defined Racah-Casimir operators for su(n) and their eigenvalues for various classes of representations
Abstract
This paper deals with the striking fact that there is an essentially canonical path from the i-th Lie algebra cohomology cocycle, i=1,2,... l, of a simple compact Lie algebra of rank l to the definition of its primitive Casimir operators C(i) of order mi. Thus one obtains a complete set of Racah-Casimir operators C(i) for each and nothing else. The paper then goes on to develop a general formula for the eigenvalue c(i) of each C(i) valid for any representation of , and thereby to relate c(i) to a suitably defined generalised Dynkin index. The form of the formula for c(i) for su(n) is known sufficiently explicitly to make clear some interesting and important features. For the purposes of illustration, detailed results are displayed for some classes of representation of su(n), including all the fundamental ones and the adjoint representation.
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