Topology change in commuting saddles of thermal N=4 SYM theory
Abstract
We study the large N saddle points of weakly coupled N=4 super Yang-Mills theory on S1 x S3 that are described by a commuting matrix model for the seven scalar fields A0, J. We show that at temperatures below the Hagedorn/`deconfinement' transition the joint eigenvalue distribution is S1 x S5. At high temperatures T >> 1/RS3, the eigenvalues form an ellipsoid with topology S6. We show how the deconfinement transition realises the topology change S1 x S5 --> S6. Furthermore, we find compelling evidence that when the temperature is increased to T = 1/(λ RS3) the saddle with S6 topology changes continuously to one with S5 topology in a new second order quantum phase transition occurring in these saddles.
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