The Galois coaction on φ4 periods
Abstract
We report on calculations of Feynman periods of primitive log-divergent φ4 graphs up to eleven loops. The structure of φ4 periods is described by a series of conjectures. In particular, we discuss the possibility that φ4 periods are a comodule under the Galois coaction. Finally, we compare the results with the periods of primitive log-divergent non-φ4 graphs up to eight loops and find remarkable differences to φ4 periods. Explicit results for all periods we could compute are provided in ancillary files.
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