## Contact

**KTH Royal Institute of Technology**

*SE-100 44 Stockholm Sweden +46 8 790 60 00*

[1]

H. Ringström, "Linear Systems Of Wave Equations On Cosmological Backgrounds With Convergent Asymptotics," *Astérisque*, no. 420, pp. V-+, 2020.

[2]

H. Ringström, "A Unified Approach to the Klein-Gordon Equation on Bianchi Backgrounds," *Communications in Mathematical Physics*, vol. 372, no. 2, pp. 599-656, 2019.

[3]

H. Andréasson and H. Ringström, "Proof of the cosmic no-hair conjecture in the T3-Gowdy symmetric Einstein-Vlasov setting," *Journal of the European Mathematical Society (Print)*, vol. 18, no. 7, pp. 1565-1650, 2016.

[4]

H. Ringström, "Instability of Spatially Homogeneous Solutions in the Class of T-2-Symmetric Solutions to Einstein's Vacuum Equations," *Communications in Mathematical Physics*, vol. 334, no. 3, pp. 1299-1375, 2015.

[5]

H. Ringström, "Origins and development of the Cauchy problem in general relativity," *Classical and quantum gravity*, vol. 32, no. 12, 2015.

[6]

H. Ringström, "The Cauchy problem in general relativity," *Acta Physica Polonica B*, vol. 44, no. 12, pp. 2621-2641, 2013.

[7]

H. Ringstrom, "Cosmic Censorship for Gowdy Spacetimes," *Living Reviews in Relativity*, vol. 13, pp. 2, 2010.

[8]

J. M. Heinzle and H. Ringström, "Future asymptotics of vacuum Bianchi type VI0 solutions," *Classical and quantum gravity*, vol. 26, no. 14, 2009.

[9]

H. Ringström, "Power Law Inflation," *Communications in Mathematical Physics*, vol. 290, no. 1, pp. 155-218, 2009.

[10]

H. Ringström, "Strong cosmic censorship in T-3-Gowdy spacetimes," *Annals of Mathematics*, vol. 170, no. 3, pp. 1181-1240, 2009.

[11]

H. Ringström, "Future stability of the Einstein-non-linear scalar field system," *Inventiones Mathematicae*, vol. 173, no. 1, pp. 123-208, 2008.

[12]

H. Ringström, "Strong cosmic censorship in the case of T(3)-Gowdy vacuum spacetimes," *Classical and quantum gravity*, vol. 25, no. 11, pp. 114010, 2008.

[13]

H. Ringström, "Existence of an asymptotic velocity and implications for the asymptotic behavior in the direction of the singularity in T-3-Gowdy," *Communications on Pure and Applied Mathematics*, vol. 59, no. 7, pp. 977-1041, 2006.

[14]

H. Ringström, "On curvature decay in expanding cosmological models," *Communications in Mathematical Physics*, vol. 264, no. 3, pp. 613-630, 2006.

[15]

H. Ringström, "On the T-3-Gowdy symmetric Einstein-Maxwell equations," *Annales de l'Institute Henri Poincare. Physique theorique*, vol. 7, no. 1, pp. 1-20, 2006.

[16]

H. Ringström, "Curvature blow up on a dense subset of the singularity in T-3-Gowdy," *Journal of Hyperbolic Differential Equations*, vol. 2, no. 2, pp. 547-564, 2005.

[17]

H. Ringström, "Data at the moment of infinite expansion for polarized Gowdy," *Classical and quantum gravity*, vol. 22, no. 9, pp. 1647-1653, 2005.

[18]

H. Ringström, "Asymptotic expansions close to the singularity in Gowdy spacetimes," *Classical and quantum gravity*, vol. 21, no. 3, pp. S305-S322, 2004.

[19]

H. Ringström, "On Gowdy vacuum spacetimes," *Mathematical proceedings of the Cambridge Philosophical Society (Print)*, vol. 136, pp. 485-512, 2004.

[20]

H. Ringström, "On a wave map equation arising in general relativity," *Communications on Pure and Applied Mathematics*, vol. 57, no. 5, pp. 657-703, 2004.

[21]

H. Ringström, "Future asymptotic expansions of Bianchi VIII vacuum metrics," *Classical and quantum gravity*, vol. 20, no. 11, pp. 1943-1989, 2003.

[22]

H. Ringström, "The Bianchi IX attractor," *Annales de l'Institute Henri Poincare. Physique theorique*, vol. 2, no. 3, pp. 405-500, 2001.

[23]

H. Ringström, "The future asymptotics of Bianchi VIII vacuum solutions," *Classical and quantum gravity*, vol. 18, no. 18, pp. 3791-3823, 2001.

[24]

H. Ringström, "Curvature blow up in Bianchi VIII and IX vacuum spacetimes," *Classical and quantum gravity*, vol. 17, no. 4, pp. 713-731, 2000.

[25]

H. Ringström, "On the future stability of cosmological solutions to Einstein's equations with accelerated expansion," in *PROCEEDINGS OF THE INTERNATIONAL CONGRESS OF MATHEMATICIANS (ICM 2014), VOL II*, 2014, pp. 983-999.

[26]

H. Ringström, *On the Topology and Future Stability of the Universe.* 1st ed. Oxford : Oxford University Press, 2013.

[27]

H. Ringström, *The Cauchy problem in general relativity.* 1st ed. Zürich : European Mathematical Society Publishing House, 2009.

Senaste synkning med DiVA:

2023-05-28 00:43:23

**KTH Royal Institute of Technology**

*SE-100 44 Stockholm Sweden +46 8 790 60 00*