Connected correlator of 1/2 BPS Wilson loops in N=4 SYM

[16] E.I. Buchbinder and A.A. Tseytlin, 1/N correction in the D3-brane description of a circular

Wilson loop at strong coupling, Phys. Rev. D 89 (2014) 126008 [arXiv:1404.4952]

[INSPIRE].

[17] X. Chen-Lin, Symmetric Wilson Loops beyond leading order, SciPost Phys. 1 (2016) 013

[arXiv:1610.02914] [INSPIRE].

[18] J. Gordon, Antisymmetric Wilson loops in N = 4 SYM beyond the planar limit, JHEP 01

(2018) 107 [arXiv:1708.05778] [INSPIRE].

[19] S. Yamaguchi, Bubbling geometries for half BPS Wilson lines, Int. J. Mod. Phys. A 22

(2007) 1353 [hep-th/0601089] [INSPIRE].

[21] E. D’Hoker, J. Estes and M. Gutperle, Gravity duals of half-BPS Wilson loops, JHEP 06

(2007) 063 [arXiv:0705.1004] [INSPIRE].

[22] T. Okuda and D. Trancanelli, Spectral curves, emergent geometry and bubbling solutions for

Wilson loops, JHEP 09 (2008) 050 [arXiv:0806.4191] [INSPIRE].

[23] B. Fiol and G. Torrents, Exact results for Wilson loops in arbitrary representations, JHEP

01 (2014) 020 [arXiv:1311.2058] [INSPIRE].

[24] M. Horikoshi and K. Okuyama, α0 -expansion of Anti-Symmetric Wilson Loops in N = 4

SYM from Fermi Gas, PTEP 2016 (2016) 113B05 [arXiv:1607.01498] [INSPIRE].

[25] K. Okuyama, Phase Transition of Anti-Symmetric Wilson Loops in N = 4 SYM, JHEP 12

(2017) 125 [arXiv:1709.04166] [INSPIRE].

[26] A.F. Canazas Garay, A. Faraggi and W. M¨

uck, Antisymmetric Wilson loops in N = 4 SYM:

from exact results to non-planar corrections, JHEP 08 (2018) 149 [arXiv:1807.04052]

[INSPIRE].

[27] P. Olesen and K. Zarembo, Phase transition in Wilson loop correlator from AdS/CFT

correspondence, hep-th/0009210 [INSPIRE].

[28] D.J. Gross and H. Ooguri, Aspects of large N gauge theory dynamics as seen by string

theory, Phys. Rev. D 58 (1998) 106002 [hep-th/9805129] [INSPIRE].

[29] S. Kawamoto, T. Kuroki and A. Miwa, Boundary condition for D-brane from Wilson loop

and gravitational interpretation of eigenvalue in matrix model in AdS/CFT correspondence,

Phys. Rev. D 79 (2009) 126010 [arXiv:0812.4229] [INSPIRE].

[30] B. Eynard, Topological expansion for the 1-Hermitian matrix model correlation functions,

JHEP 11 (2004) 031 [hep-th/0407261] [INSPIRE].

[31] B. Eynard and N. Orantin, Algebraic methods in random matrices and enumerative

geometry, arXiv:0811.3531 [INSPIRE].

[32] U. Haagerup and S. Thorbjørnsen, Asymptotic expansions for the Gaussian Unitary

Ensemble, Inf. Dim. Anal. Quant. Probab. Rel. Top. 15 (2012) 1250003, [arXiv:1004.3479].

[33] S. Giombi, V. Pestun and R. Ricci, Notes on supersymmetric Wilson loops on a two-sphere,

JHEP 07 (2010) 088 [arXiv:0905.0665] [INSPIRE].

– 15 –

JHEP10(2018)037

[20] O. Lunin, On gravitational description of Wilson lines, JHEP 06 (2006) 026

[hep-th/0604133] [INSPIRE].

...