An attempt at axiomatization of extending mechanism of solutions to the fluid dynamical systems

TL;DR

This paper proposes a unified axiomatic framework for extending solutions across various fluid dynamical systems, based on fundamental conditions and new interpolation inequalities, independent of specific system forms.

Contribution

It introduces an axiomatization approach for solution extension mechanisms applicable to multiple fluid systems, utilizing novel Besov-type inequalities.

Findings

Unified extension mechanisms derived from axioms

New multiplicative interpolation inequalities of Besov type

Applicable to diverse fluid dynamical systems

Abstract

Note that some classic fluid dynamical systems such as the Navier-Stokes equations, Magnetohydrodynamics (MHD), Boussinesq equations, and etc are observably different from each other but obey some energy inequalities of the similar type. In this paper, we attempt to axiomatize the extending mechanism of solutions to these systems, merely starting from several basic axiomatized conditions such as the local existence, joint property of solutions and some energy inequalities. The results established have nothing to do with the concrete forms of the systems and, thus, give the extending mechanisms in a unified way to all systems obeying the axiomatized conditions. The key tools are several new multiplicative interpolation inequalities of Besov type, which have their own interests.