Related references
Note: Only part of the references are listed.Inextendibility of spacetimes and Lorentzian length spaces
James D. E. Grant et al.
ANNALS OF GLOBAL ANALYSIS AND GEOMETRY (2019)
Causality theory for closed cone structures with applications
Ettore Minguzzi
REVIEWS IN MATHEMATICAL PHYSICS (2019)
Maximizers in Lipschitz spacetimes are either timelike or null
Melanie Graf et al.
CLASSICAL AND QUANTUM GRAVITY (2018)
Lyapounov Functions of Closed Cone Fields: From Conley Theory to Time Functions
Patrick Bernard et al.
COMMUNICATIONS IN MATHEMATICAL PHYSICS (2018)
THE C0-INEXTENDIBILITY OF THE SCHWARZSCHILD SPACETIME AND THE SPACELIKE DIAMETER IN LORENTZIAN GEOMETRY
Jan Sbierski
JOURNAL OF DIFFERENTIAL GEOMETRY (2018)
Lorentzian length spaces
Michael Kunzinger et al.
ANNALS OF GLOBAL ANALYSIS AND GEOMETRY (2018)
The Hawking-Penrose Singularity Theorem for C 1,1-Lorentzian Metrics
Melanie Graf et al.
COMMUNICATIONS IN MATHEMATICAL PHYSICS (2018)
On geodesics in low regularity
Clemens Saemann et al.
NON-REGULAR SPACETIME GEOMETRY (2018)
On the proof of the C0-inextendibility of the Schwarzschild spacetime
Jan Sbierski
NON-REGULAR SPACETIME GEOMETRY (2018)
Timelike Completeness as an Obstruction to C 0-Extensions
Gregory J. Galloway et al.
COMMUNICATIONS IN MATHEMATICAL PHYSICS (2018)
Some Remarks on the C0-(In)Extendibility of Spacetimes
Gregory J. Galloway et al.
ANNALES HENRI POINCARE (2017)
Global Hyperbolicity for Spacetimes with Continuous Metrics
Clemens Saemann
ANNALES HENRI POINCARE (2016)
The Penrose singularity theorem in regularity C1,1
Michael Kunzinger et al.
CLASSICAL AND QUANTUM GRAVITY (2015)
Hawking's singularity theorem for C-1,C-1-metrics
Michael Kunzinger et al.
CLASSICAL AND QUANTUM GRAVITY (2015)
Time functions revisited
Albert Fathi
INTERNATIONAL JOURNAL OF GEOMETRIC METHODS IN MODERN PHYSICS (2015)
Convex neighborhoods for Lipschitz connections and sprays
E. Minguzzi
MONATSHEFTE FUR MATHEMATIK (2015)
The exponential map of a C1,1-metric
Michael Kunzinger et al.
DIFFERENTIAL GEOMETRY AND ITS APPLICATIONS (2014)
A regularisation approach to causality theory for C1,1-Lorentzian metrics
Michael Kunzinger et al.
GENERAL RELATIVITY AND GRAVITATION (2014)
Lorentz and semi-Riemannian spaces with Alexandrov curvature bounds
Stephanie B. Alexander et al.
COMMUNICATIONS IN ANALYSIS AND GEOMETRY (2013)
On Lorentzian causality with continuous metrics
Piotr T. Chrusciel et al.
CLASSICAL AND QUANTUM GRAVITY (2012)
On smooth time functions
Albert Fathi et al.
MATHEMATICAL PROCEEDINGS OF THE CAMBRIDGE PHILOSOPHICAL SOCIETY (2012)
Limit curve theorems in Lorentzian geometry
E. Minguzzi
JOURNAL OF MATHEMATICAL PHYSICS (2008)