Restricting positive energy representations of Diff+(S1) to the stabilizer of n points
Abstract
Let Gn ⊂ Diff+(S1) be the stabilizer of n given points of S1. How much information do we lose if we restrict a positive energy representation Uch associated to an admissible pair (c,h) of the central charge and lowest energy, to the subgroup Gn? The question, and a part of the answer originate in chiral conformal QFT. The value of c can be easily ``recovered'' from such a restriction; the hard question concerns the value of h. If c≤ 1, then there is no loss of information, and accordingly, all of these restrictions are irreducible. In this work it is shown that Uch|Gn is always irreducible for n=1, and if h=0, it is irreducible at least up to n≤ 3. Moreover, an example is given for certain values c>1 and h,h>0 such that Uch|G1 Uch|G1. It follows that for these values Uch|Gn cannot be irreducible for n≥ 2. For further values of c,h and n, the question is left open. Nevertheless, the example already shows, that in general, local and global intertwiners in a QFT model may not be equivalent.
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