Staticity and regularity for zero rest-mass fields near spatial infinity on flat spacetime

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TitreStaticity and regularity for zero rest-mass fields near spatial infinity on flat spacetime
Type de publicationJournal Article
Year of Publication2022
AuteursGasperin E., Kroon J.AValient
JournalCLASSICAL AND QUANTUM GRAVITY
Volume39
Pagination015014
Date PublishedJAN 6
Type of ArticleArticle
ISSN0264-9381
Mots-clésconformal methods, cylinder at spatial infinity, regularity, spinors, staticity
Résumé

Linear zero-rest-mass fields generically develop logarithmic singularities at the critical sets where spatial infinity meets null infinity. Friedrich's representation of spatial infinity is ideally suited to study this phenomenon. These logarithmic singularities are an obstruction to the smoothness of the zero-rest-mass field at null infinity and, in particular, to peeling. In the case of the spin-2 field it has been shown that these logarithmic singularities can be precluded if the initial data for the field satisfies a certain regularity condition involving the vanishing, at spatial infinity, of a certain spinor (the linearised cotton spinor) and its totally symmetrised derivatives. In this article we investigate the relation between this regularity condition and the staticity of the spin-2 field. It is shown that while any static spin-2 field satisfies the regularity condition, not every solution satisfying the regularity condition is static. This result is in contrast with what happens in the case of general relativity where staticity in a neighbourhood of spatial infinity and the smoothness of the field at future and past null infinities are much more closely related.

DOI10.1088/1361-6382/ac37ce