Analytic Torsion from Chern-Simons theory via the (2,0)-theory on Dicyclic Orbifolds of S3
Abstract
The Witten index of the (2,0)-theory compactified on spaces of the form S3/× S2, with a freely acting group , and with external string sources implemented via timelike surface operator insertions, is expressed in terms of Ray-Singer torsion of S3/ and characters of irreducible representations of . We compute it explicitly for the Dicyclic groups =Dick. The torsion and characters are generally irrational numbers, but they nicely combine to an integer index. Alternatively, the Witten index can be computed from Chern-Simons theory on S2, and Ray-Singer torsion on S3/Dick is thus computable from Chern-Simons theory. The matching of the Witten index calculated by these dual approaches reveals new details about the partition function of the (2,0)-theory with surface operators.
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