Examples of cosmological spacetimes without CMC Cauchy surfaces

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Examples of cosmological spacetimes without CMC Cauchy surfaces. / Ling, Eric; Ohanyan, Argam.

In: Letters in Mathematical Physics, Vol. 114, No. 4, 96, 2024.

Research output: Contribution to journalJournal articleResearchpeer-review

Harvard

Ling, E & Ohanyan, A 2024, 'Examples of cosmological spacetimes without CMC Cauchy surfaces', Letters in Mathematical Physics, vol. 114, no. 4, 96. https://doi.org/10.1007/s11005-024-01843-7

APA

Ling, E., & Ohanyan, A. (2024). Examples of cosmological spacetimes without CMC Cauchy surfaces. Letters in Mathematical Physics, 114(4), [96]. https://doi.org/10.1007/s11005-024-01843-7

Vancouver

Ling E, Ohanyan A. Examples of cosmological spacetimes without CMC Cauchy surfaces. Letters in Mathematical Physics. 2024;114(4). 96. https://doi.org/10.1007/s11005-024-01843-7

Author

Ling, Eric ; Ohanyan, Argam. / Examples of cosmological spacetimes without CMC Cauchy surfaces. In: Letters in Mathematical Physics. 2024 ; Vol. 114, No. 4.

Bibtex

@article{6dffa8cf42d34348b1427285d05d113d,
title = "Examples of cosmological spacetimes without CMC Cauchy surfaces",
abstract = "CMC (constant mean curvature) Cauchy surfaces play an important role in mathematical relativity as finding solutions to the vacuum Einstein constraint equations is made much simpler by assuming CMC initial data. However, Bartnik (Commun Math Phys 117(4):615–624, 1988) constructed a cosmological spacetime without a CMC Cauchy surface whose spatial topology is the connected sum of two three-dimensional tori. Similarly, Chru{\'s}ciel et al. (Commun Math Phys 257(1):29–42, 2005) constructed a vacuum cosmological spacetime without CMC Cauchy surfaces whose spatial topology is also the connected sum of two tori. In this article, we enlarge the known number of spatial topologies for cosmological spacetimes without CMC Cauchy surfaces by generalizing Bartnik{\textquoteright}s construction. Specifically, we show that there are cosmological spacetimes without CMC Cauchy surfaces whose spatial topologies are the connected sum of any compact Euclidean or hyperbolic three-manifold with any another compact Euclidean or hyperbolic three-manifold. Analogous examples in higher spacetime dimensions are also possible. We work with the Tolman–Bondi class of metrics and prove gluing results for variable marginal conditions, which allows for smooth gluing of Schwarzschild to FLRW models.",
keywords = "53B30, 53C50, 83C20, CMC Cauchy surfaces, Cosmological spacetimes, Tolman–Bondi metrics",
author = "Eric Ling and Argam Ohanyan",
note = "Publisher Copyright: {\textcopyright} The Author(s) 2024.",
year = "2024",
doi = "10.1007/s11005-024-01843-7",
language = "English",
volume = "114",
journal = "Letters in Mathematical Physics",
issn = "0377-9017",
publisher = "Springer",
number = "4",

}

RIS

TY - JOUR

T1 - Examples of cosmological spacetimes without CMC Cauchy surfaces

AU - Ling, Eric

AU - Ohanyan, Argam

N1 - Publisher Copyright: © The Author(s) 2024.

PY - 2024

Y1 - 2024

N2 - CMC (constant mean curvature) Cauchy surfaces play an important role in mathematical relativity as finding solutions to the vacuum Einstein constraint equations is made much simpler by assuming CMC initial data. However, Bartnik (Commun Math Phys 117(4):615–624, 1988) constructed a cosmological spacetime without a CMC Cauchy surface whose spatial topology is the connected sum of two three-dimensional tori. Similarly, Chruściel et al. (Commun Math Phys 257(1):29–42, 2005) constructed a vacuum cosmological spacetime without CMC Cauchy surfaces whose spatial topology is also the connected sum of two tori. In this article, we enlarge the known number of spatial topologies for cosmological spacetimes without CMC Cauchy surfaces by generalizing Bartnik’s construction. Specifically, we show that there are cosmological spacetimes without CMC Cauchy surfaces whose spatial topologies are the connected sum of any compact Euclidean or hyperbolic three-manifold with any another compact Euclidean or hyperbolic three-manifold. Analogous examples in higher spacetime dimensions are also possible. We work with the Tolman–Bondi class of metrics and prove gluing results for variable marginal conditions, which allows for smooth gluing of Schwarzschild to FLRW models.

AB - CMC (constant mean curvature) Cauchy surfaces play an important role in mathematical relativity as finding solutions to the vacuum Einstein constraint equations is made much simpler by assuming CMC initial data. However, Bartnik (Commun Math Phys 117(4):615–624, 1988) constructed a cosmological spacetime without a CMC Cauchy surface whose spatial topology is the connected sum of two three-dimensional tori. Similarly, Chruściel et al. (Commun Math Phys 257(1):29–42, 2005) constructed a vacuum cosmological spacetime without CMC Cauchy surfaces whose spatial topology is also the connected sum of two tori. In this article, we enlarge the known number of spatial topologies for cosmological spacetimes without CMC Cauchy surfaces by generalizing Bartnik’s construction. Specifically, we show that there are cosmological spacetimes without CMC Cauchy surfaces whose spatial topologies are the connected sum of any compact Euclidean or hyperbolic three-manifold with any another compact Euclidean or hyperbolic three-manifold. Analogous examples in higher spacetime dimensions are also possible. We work with the Tolman–Bondi class of metrics and prove gluing results for variable marginal conditions, which allows for smooth gluing of Schwarzschild to FLRW models.

KW - 53B30

KW - 53C50

KW - 83C20

KW - CMC Cauchy surfaces

KW - Cosmological spacetimes

KW - Tolman–Bondi metrics

U2 - 10.1007/s11005-024-01843-7

DO - 10.1007/s11005-024-01843-7

M3 - Journal article

C2 - 38994398

AN - SCOPUS:85198079118

VL - 114

JO - Letters in Mathematical Physics

JF - Letters in Mathematical Physics

SN - 0377-9017

IS - 4

M1 - 96

ER -

ID: 398546143