Quantum spectral curve as a tool for a perturbative quantum field theory

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VOLIN, DMYTRO

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Marboe C., Volin D., Quantum spectral curve as a tool for a perturbative quantum field theory, Nuclear Physics B, 899, 2015, 810-847

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An iterative procedure perturbatively solving the quantum spectral curve of planar N=4N=4 SYM for any operator in the slsl(2) sector is presented. A Mathematica notebook executing this procedure is enclosed. The obtained results include 10-loop computations of the conformal dimensions of more than ten different operators. We prove that the conformal dimensions are always expressed, at any loop order, in terms of multiple zeta-values with coefficients from an algebraic number field determined by the one-loop Baxter equation. We observe that all the perturbative results that were computed explicitly are given in terms of a smaller algebra: single-valued multiple zeta-values times the algebraic numbers.

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Author's Homepage: http://people.tcd.ie/volind
Type of material: Journal Article