Abstract
Using a infinite-dimensional, nondecomposable representation of the dilatation subgroup, it is shown that, in the general case, β≠0 the Calan-Symanzik equation coincides with the naive scaling law. It is pointed out that this representation leaves the perturbative series invariant. In the limiting case β=0, this representation degenerates to the ordinary irreducible representation of the dilatation group.
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