A Pendant for Polya: The One-Loop Partition Function of N=4 SYM on R x S3
Abstract
We study weakly coupled SU(N) N = 4 super Yang-Mills theory on R x S3 at infinite N, which has interesting thermodynamics, including a Hagedorn transition, even at zero Yang-Mills coupling. We calculate the exact one-loop partition function below the Hagedorn temperature. Our calculation employs the representation of the one-loop dilatation operator as a spin chain Hamiltonian acting on neighboring sites and a generalization of Polya's counting of `necklaces' (gauge-invariant operators) to include necklaces with a `pendant' (an operator which acts on neighboring beads). We find that the one-loop correction to the Hagedorn temperature is delta ln TH = + lambda/8 pi2.
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