Elliptic Anisotropy from Quantum Diffraction

TL;DR

This paper proposes a quantum mechanical, geometry-based mechanism to explain elliptic anisotropy in small collision systems, without relying on energy loss, potentially contributing to observed flow coefficients.

Contribution

Introduces a novel sum-over-paths quantum mechanism that accounts for elliptic anisotropy in small systems independent of energy loss effects.

Findings

Quantum geometry mechanism can produce elliptic anisotropy.

Applicable to small and large deconfined media.

Provides an alternative explanation for flow coefficients.

Abstract

The surprising manifestation of collectivity in small collision systems, such as nucleon-nucleon and nucleon-nucleus collisions, is perhaps even more striking when discussed at higher momenta. In larger systems, high-$p_T$ elliptic anisotropy is understood as a selection bias effect due to the smaller energy loss experienced along the shorter direction that aligns with the event plane. However, in small systems the amount of energy loss appears insufficient to reproduce the sizable angular anisotropy observed experimentally. In this work, we explore a new mechanism generating preferred orientations for energetic particles without the need of energy loss. We exploit a simple model that is based on two basic although inalienable ingredients: geometry and quantum mechanics. Our findings suggest that this sum-over-paths mechanism can provide a relevant contribution to so-called flow coefficients of energetic particles traversing deconfined media of any size.