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Higher genus modular graph functions, string invariants, and their exact asymptotics

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arxiv 1712.06135 v2 pith:U73WWSAG submitted 2017-12-17 hep-th math.NT

Higher genus modular graph functions, string invariants, and their exact asymptotics

classification hep-th math.NT
keywords functionsgenusgraphmodulardegreelaurentpolynomialamplitude
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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The concept and the construction of modular graph functions are generalized from genus-one to higher genus surfaces. The integrand of the four-graviton superstring amplitude at genus-two provides a generating function for a special class of such functions. A general method is developed for analyzing the behavior of modular graph functions under non-separating degenerations in terms of a natural real parameter $t$. For arbitrary genus, the Arakelov Green function and the Kawazumi-Zhang invariant degenerate to a Laurent polynomial in $t$ of degree $(1,1)$ in the limit $t\to\infty$. For genus two, each coefficient of the low energy expansion of the string amplitude degenerates to a Laurent polynomial of degree $(w,w)$ in $t$, where $w+2$ is the degree of homogeneity in the kinematic invariants. These results are exact to all orders in $t$, up to exponentially suppressed corrections. The non-separating degeneration of a general class of modular graph functions at arbitrary genus is sketched and similarly results in a Laurent polynomial in $t$ of bounded degree. The coefficients in the Laurent polynomial are generalized modular graph functions for a punctured Riemann surface of lower genus.

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Cited by 4 Pith papers

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