Generalizations of the Double-Copy: the KLT Bootstrap

TL;DR

This paper develops a new framework to generalize the double-copy construction of tree amplitudes, introducing bootstrap equations for the KLT kernel and exploring higher-derivative corrections, leading to novel double-copy structures.

Contribution

It formulates KLT bootstrap equations and solves them perturbatively to find the most general higher-derivative corrections to the double-copy kernel, extending the string KLT kernel.

Findings

Derived generalized KLT kernels with higher-derivative corrections

Established new color-structures and relations in effective theories

Applied to 4d Yang-Mills, producing dilaton-axion-gravity with local operators

Abstract

We formulate a new program to generalize the double-copy of tree amplitudes. The approach exploits the link between the identity element of the KLT algebra and the KLT kernel, and we demonstrate how this leads to a set of KLT bootstrap equations that the double-copy kernel has to satisfy (in addition to locality constraints). We solve the KLT bootstrap equations perturbatively to find the most general higher-derivative corrections to the 4- and 5-point field theory KLT kernel. The new kernel generalizes the string KLT kernel and its associated monodromy relations. It admits new color-structures in the effective theories it double-copies. It provides distinct generalized KK and BCJ relations for the left and right single-color theories and is in that sense a heterotic-type double-copy. We illustrate the generalized double-copy in detail for 4d Yang-Mills theory with higher-derivative corrections that produce dilaton-axion-gravity with local operators up order $\nabla^{10} R^4$. Finally, we initiate a search for new double-copy kernels.