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Communications in Analysis and Geometry
Volume 30 (2022)
Number 4
Quasi-local mass on unit spheres at spatial infinity
Pages: 745 – 778
DOI: https://dx.doi.org/10.4310/CAG.2022.v30.n4.a2
Authors
Abstract
In this note, we compute the limit of the Wang–Yau quasi-local mass on unit spheres at spatial infinity of an asymptotically flat initial data set. Similar to the small sphere limit of the Wang–Yau quasi-local mass, we prove that the leading order term of the quasi-local mass recovers the stress-energy tensor. For a vacuum spacetime, the quasi-local mass decays faster and the leading order term is related to the Bel–Robinson tensor. Several new techniques of evaluating quasilocal mass are developed in this note.
P.-N. Chen is supported by NSF grant DMS-1308164, and by Simons Foundation collaboration grant #584785.
M.-T. Wang is supported by NSF grants DMS-1405152 and DMS-1810856.
Y.-K. Wang is supported by MOST Taiwan grants 105-2115-M-006-016-MY2 and 107-2115-M-006-001-MY2.
S.-T. Yau is supported by NSF grants PHY-0714648 and DMS-1308244.
The authors would like to thank the National Center for Theoretical Sciences at National Taiwan University where part of this research was carried out.
Received 23 March 2019
Accepted 9 September 2019
Published 30 January 2023