2016
DOI: 10.1088/1751-8113/49/15/155203
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Relations between elliptic multiple zeta values and a special derivation algebra

Abstract: We investigate relations between elliptic multiple zeta values and describe a method to derive the number of indecomposable elements of given weight and length. Our method is based on representing elliptic multiple zeta values as iterated integrals over Eisenstein series and exploiting the connection with a special derivation algebra. Its commutator relations give rise to constraints on the iterated integrals over Eisenstein series relevant for elliptic multiple zeta values and thereby allow to count the indec… Show more

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Cited by 93 publications
(238 citation statements)
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“…Each entry of r η ( 2m>0 ) is of homogeneity degree η 2m−2 , and r η ( 0 ) contains derivatives ∂ η i ∂ η j on top of degree-η −2 and degree-η 0 terms. The dependence of r η ( 2m ) on η j and ∂ η j should preserve the commutation relations of the derivations [24,57,58], that is why they are referred to as a conjectural representation. Note that differential equations of the form in (1.4) have also been found for Feynman integrals that evaluate to elliptic polylogarithms, see e.g.…”
Section: Summary Of the Main Resultsmentioning
confidence: 99%
See 1 more Smart Citation
“…Each entry of r η ( 2m>0 ) is of homogeneity degree η 2m−2 , and r η ( 0 ) contains derivatives ∂ η i ∂ η j on top of degree-η −2 and degree-η 0 terms. The dependence of r η ( 2m ) on η j and ∂ η j should preserve the commutation relations of the derivations [24,57,58], that is why they are referred to as a conjectural representation. Note that differential equations of the form in (1.4) have also been found for Feynman integrals that evaluate to elliptic polylogarithms, see e.g.…”
Section: Summary Of the Main Resultsmentioning
confidence: 99%
“…The desired α -expansions at genus one are generated by solving the differential equations (along with an initial value at τ → i∞) via standard Picard iteration. Accordingly, the accompanying eMZVs will appear as iterated integrals over holomorphic Eisenstein series of SL 2 (Z) [21,24,25], "iterated Eisenstein integrals" for short. In this way, all relations among eMZVs are automatically built in 3 , and the α -expansions of A-cycle integrals are available in a maximally simplified form.…”
mentioning
confidence: 99%
“…In fact, the entire τ -dependence in the η j -expansion of D τ η is carried by holomorphic Eisenstein series, see Section 6 for further details. That is why (1.4) manifests the appearance of iterated Eisenstein integrals in the α -expansion of open-string integrals, a canonical representation of eMZVs exposing all their relations over Q, MZVs and (2πi) −1 [38,41].…”
Section: Open-string Integrals and Differential Equationsmentioning
confidence: 99%
“…It might be rewarding to approach the low-energy expansion of superstring loop amplitudes at higher multiplicity with Berends-Giele methods. At the one-loop order, this concerns annulus integrals involving elliptic multiple zeta values [85][86][87] and torus integrals involving modular graph functions [88][89][90][91][92][93][94][95][96].…”
Section: Further Directionsmentioning
confidence: 99%