Negative anomalous dimensions in N=4 SYM
Abstract
We elucidate aspects of the one-loop anomalous dimension of -singlet multi-trace operators in SYM at finite . First, we study how corrections lift the large degeneracy of the spectrum, which we call the operator submixing problem. We observe that all large zero modes acquire non-positive anomalous dimension starting at order , and they mix only among the operators with the same number of traces at leading order. Second, we study the lowest one-loop dimension of operators of length equal to . The dimension of such operators becomes more negative as increases, which will eventually diverge in a double scaling limit. Third, we examine the structure of level-crossing at finite in view of unitarity. Finally we find out a correspondence between the large zero modes and completely symmetric polynomials of Mandelstam variables.
Keywords
Cite
@article{arxiv.1503.06210,
title = {Negative anomalous dimensions in N=4 SYM},
author = {Yusuke Kimura and Ryo Suzuki},
journal= {arXiv preprint arXiv:1503.06210},
year = {2015}
}
Comments
34+31 pages, many figures, a Mathematica file attached, v2: typos corrected, references added, section 5 revised, v3: revised Section 4 on correlators, and small details