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Non-holomorphic modular forms from zeta generators

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arxiv 2403.14816 v2 pith:6FIHSWPM submitted 2024-03-21 hep-th math.AGmath.NT

Non-holomorphic modular forms from zeta generators

classification hep-th math.AGmath.NT
keywords formsmodularintegralsiteratedzetaeisensteingraphequivariant
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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We study non-holomorphic modular forms built from iterated integrals of holomorphic modular forms for SL$(2,\mathbb Z)$ known as equivariant iterated Eisenstein integrals. A special subclass of them furnishes an equivalent description of the modular graph forms appearing in the low-energy expansion of string amplitudes at genus one. Notably the Fourier expansion of modular graph forms contains single-valued multiple zeta values. We deduce the appearance of products and higher-depth instances of multiple zeta values in equivariant iterated Eisenstein integrals, and ultimately modular graph forms, from the appearance of simpler odd Riemann zeta values. This analysis relies on so-called zeta generators which act on certain non-commutative variables in the generating series of the iterated integrals. From an extension of these non-commutative variables we incorporate iterated integrals involving holomorphic cusp forms into our setup and use them to construct the modular completion of triple Eisenstein integrals. Our work represents a fully explicit realisation of the modular graph forms within Brown's framework of equivariant iterated Eisenstein integrals and reveals structural analogies between single-valued period functions appearing in genus zero and one string amplitudes.

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Cited by 3 Pith papers

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