A sufficient and necessary condition for $\mathcal{A}$-quasiaffinity

Stefan Schiffer

arXiv:2111.07151·math.AP·November 16, 2021

A sufficient and necessary condition for $\mathcal{A}$-quasiaffinity

Stefan Schiffer

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TL;DR

This paper characterizes $\

Contribution

It provides a new characterization theorem for $\

Findings

01

A characterization theorem for $\

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paper_type

03

empirical

Abstract

We consider a homogeneous, constant rank differential operator $A$ and prove a characterisation theorem for $A$ -quasiaffine functions in the spirit of Ball, Currie and Olver (1981); i.e. functions such that \[ f(v) = \int_{T_N} f(v + \psi(y))~\mathrm{d}y \] for all $v$ and all $A$ -free test functions $ψ$ with zero mean. This result is used to get a sufficient, but not necessary condition for the differential operator $A$ , such that linearity along the characteristic cone of $A$ implies $A$ -quasiaffinity. We show that this implication is true if $A$ admits a first order potential.

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Taxonomy

TopicsSpectral Theory in Mathematical Physics · Mathematical Dynamics and Fractals · Nonlinear Partial Differential Equations