Geometrical aspects of the interaction between expanding clouds and environment

Abstract

This work is intended to be a contribution to the study of the morphology of the rising convective columns, for a better representation of the processes of entrainment and detrainment. We examine technical methods for the description of the interface of expanding clouds and reveal the role of fingering instability which increases the effective length of the periphery of the cloud. Assuming Laplacian growth we give a detailed derivation of the time-dependent conformal transformation that solves the equation of the fingering instability. For the phase of slower expansion, the evolution of complex poles with a dynamics largely controlled by the Hilbert operator (acting on the function that represents the interface position) leads to cusp singularities but smooths out the smaller scale perturbations. We review the arguments that the rising column cannot preserve its integrity (seen as compacity in any horizontal section), because of the penetrative downdrafts or the incomplete repulsion of the static environmental air through momentum transfer. Then we propose an analytical framework which is adequate for competition of two distinct phases of the same system. The methods exmined here are formulated in a general framework and can be easily adapted to particular cases of atmospheric convection.