Multi-beam Energy Moments of Multibeam Particle Velocity Distributions

TL;DR

This paper introduces a generalized approach to calculating energy moments of multibeam particle velocity distributions, addressing limitations of standard methods that assume a single mean flow, with applications to space plasma measurements.

Contribution

It develops multibeam energy moments that accurately represent multibeam distributions, improving analysis of particle velocity data in space physics.

Findings

Multibeam moments avoid false thermal energy in multibeam distributions.

Application to sum of tri-Maxwellians demonstrates the method's effectiveness.

Undecomposed moments are independent of the moment calculation approach.

Abstract

High resolution electron and ion velocity distributions, f(v), which consist of N effectively disjoint beams, have been measured by NASA's Magnetospheric Multi-Scale Mission (MMS) observatories and in reconnection simulations. Commonly used standard velocity moments generally assume a single mean-flow-velocity for the entire distribution, which can lead to counterintuitive results for a multibeam f(v). An example is the (false) standard thermal energy moment of a pair of equal and opposite cold particle beams, which is nonzero even though each beam has zero thermal energy. By contrast, a multibeam moment of two or more beams has no false thermal energy. A multibeam moment is obtained by taking a standard moment of each beam and then summing over beams. In this paper we will generalize these notions, explore their consequences and apply them to an f(v) which is sum of tri-Maxwellians. Both standard and multibeam energy moments have coherent and incoherent forms. Examples of incoherent moments are the thermal energy density, the pressure and the thermal energy flux (enthalpy flux plus heat flux). Corresponding coherent moments are the bulk kinetic energy density, the RAM pressure and the bulk kinetic energy flux. The false part of an incoherent moment is defined as the difference between the standard incoherent moment and the corresponding multibeam moment. The sum of a pair of corresponding coherent and incoherent moments will be called the undecomposed moment. Undecomposed moments are independent of whether the sum is standard or multibeam and therefore have advantages when studying moments of measured f(v).