Abstract
This is the second installment of a series of three papers in which we describe a method to determine higher-point correlation functions in one-loop open-superstring amplitudes from first principles. In this second part, we study worldsheet functions defined on a genus-one surface built from the coefficient functions of the Kronecker-Einsenstein series. We construct two classes of worldsheet functions whose properties lead to several simplifying features within our description of one-loop correlators with the pure-spinor formalism. The first class is described by functions with prescribed monodromies, whose characteristic shuffle-symmetry property leads to a Lie-polynomial structure when multiplied by the local superfields from part I of this series. The second class is given by so-called generalized elliptic integrands (GEIs) that are constructed using the same combinatorial patterns of the BRST pseudo-invariant superfields from part I. Both of them lead to compact and combinatorially rich expressions for the correlators in part III. The identities obeyed by the two classes of worldsheet functions exhibit striking parallels with those of the superfield kinematics. We will refer to this phenomenon as a duality between worldsheet functions and kinematics.
Highlights
This is the second part of a series of papers [1,2,3] in the quest of deriving the one-loop correlators of massless open- and closed-superstring states using the pure-spinor formalism [4, 5]
(ii) We establish the notion of generalized elliptic integrands (GEIs) which mirror the combinatorics of BRST invariant kinematic factors in the spirit of the duality between kinematics and worldsheet functions
The Ei|... on the right-hand sides will be defined in analogy8 with Ci|..., and this analogy will be reflected by the notation: the duality between superfields and ZA,B,C,D as well as the resulting correspondence between Q and D imply that BRST invariants Ci|A,B,C should be dualized to GEIs
Summary
This is the second part of a series of papers [1,2,3] ( referred to as part I, II and III) in the quest of deriving the one-loop correlators of massless open- and closed-superstring states using the pure-spinor formalism [4, 5]. The key results are the following (i) We present a bootstrap program to construct worldsheet functions for the correlators that share the differential structure and relations of their superspace kinematics These parallels will be referred to as a duality between kinematics and worldsheet functions, and they endow one-loop amplitudes of the open superstring with a doublecopy structure [6]. (ii) We establish the notion of generalized elliptic integrands (GEIs) which mirror the combinatorics of BRST invariant kinematic factors in the spirit of the duality between kinematics and worldsheet functions These results will come to fruition in the assembly of one-loop correlators in part III, see appendix C for their representation that manifests their double-copy structure. Since we will often refer to section and equation numbers from the papers I and III, these numbers will be prefixed by the roman numerals I and III
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