From d \! to d E: Canonical Elliptic Integrands and Modular Symbol Letters with Pure eMPLs
Abstract
We propose 'd E-forms' as fundamental building blocks of canonical integrands for elliptic Feynman integrals, which lead to Kronecker-Eisenstein ω-form symbol letters. Built upon pure elliptic multiple polylogarithms, they provide a natural extension of the 'd \! -form' integrands and d \! letters for polylogarithmic cases. By introducing an extended basis treating all marked points equally, we manifest a hidden symmetry structure in the canonical connection matrix, and demonstrate its covariance under modular transformations. Our result provides a novel perspective on describing canonical bases and symbol letters in a unified language of pure functions.
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