Flavor Fragmentation Function Factorization

TL;DR

This paper introduces a factorization theorem for perturbative flavor fragmentation functions, enabling precise calculations of jet flavor evolution from production to hadronization, with detailed all-orders analysis and validation.

Contribution

It proposes a new factorization theorem for flavor fragmentation functions that resum collinear divergences and describes flavor evolution with modified DGLAP equations, validated at one- and two-loop orders.

Findings

Validated the factorization theorem at one-loop order.

Demonstrated consistency of the theorem at two loops.

Showed soft contributions vanish due to scaleless phase space constraints.

Abstract

A definition of partonic jet flavor that is both theoretically well-defined and experimentally robust would have profound implications for measurements and predictions especially for heavy flavor applications. Recently, a definition of jet flavor was introduced as the net flavor flowing along the direction of the Winner-Take-All axis of a jet which is soft safe to all orders, but not collinear safe. Here, we exploit the lack of collinear safety and propose a factorization theorem of perturbative flavor fragmentation functions that resum collinear divergences and describe the evolution of flavor from the short distance of jet production to the long distance at which hadronization occurs. Collinear flavor evolution is governed by a small modification of the DGLAP equations. We present a detailed all-orders analysis and identify exact relations that must hold amongst the various anomalous dimensions by probability conservation and the existence of fixed points of the renormalization group flow. We explicitly validate the factorization theorem at one-loop order, and demonstrate its consistency at two loops in particular flavor channels. Starting at two-loops, constraints on phase space imposed by flavor measurements potentially allow for non-trivial soft contributions, but we demonstrate that they are scaleless and so explicitly vanish, ensuring that soft particles are summed inclusively and all divergences are exclusively collinear in nature. This factorization theorem opens the door to precision calculations with identified flavor in the infrared.