On the Stability of Leading-Power Factorization under Photon Propagator Numerator Modifications

Abstract

We study collinear factorization in strong electromagnetic backgrounds within SCET for a class of modifications where the photon propagator keeps the vacuum pole structure and i prescription, while the background enters only through a numerator tensor μ(k). We show that the set of Landau pinch surfaces and leading momentum regions is unchanged, so the leading-power (LP) factorized form is preserved. Moreover, the LP cusp kernel depends on the background solely through the longitudinal contraction nμ nμ(k) in the soft region; if it vanishes (or is power suppressed), the LP soft kernel reduces to the vacuum. As an application, for an occupancy-number modification with the physical polarization-sum tensor gTμ(k;n), transversality implies nμ nμ=0, so genuine background sensitivity starts only beyond LP.