Tobias Beran scite author profile

Tobias Beran

3Publications

21Citation Statements Received

249Citation Statements Given

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249

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University of Vienna

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Hyperbolic angles in Lorentzian length spaces and timelike curvature bounds

Beran

Sämann

2023

Journal of London Math Soc

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Within the synthetic‐geometric framework of Lorentzian (pre‐)length spaces developed in Kunzinger and Sämann (Ann. Glob. Anal. Geom. 54 (2018), no. 3, 399–447) we introduce a notion of a hyperbolic angle, an angle between timelike curves and related concepts such as timelike tangent cone and exponential map. This provides valuable technical tools for the further development of the theory and paves the way for the main result of the article, which is the characterization of timelike curvature bounds (defined via triangle comparison) with an angle monotonicity condition. Further, we improve on a geodesic non‐branching result for spaces with timelike curvature bounded below.

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Gluing constructions for Lorentzian length spaces

Beran

Rott

2023

manuscripta math.

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We introduce an analogue to the amalgamation of metric spaces into the setting of Lorentzian pre-length spaces. This provides a very general process of constructing new spaces out of old ones. The main application in this work is an analogue of the gluing theorem of Reshetnyak for CAT(k) spaces, which roughly states that gluing is compatible with upper curvature bounds. Due to the absence of a notion of spacelike distance in Lorentzian pre-length spaces we can only formulate the theorem in terms of (strongly causal) spacetimes viewed as Lorentzian length spaces.

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The splitting theorem for globally hyperbolic Lorentzian length spaces with non-negative timelike curvature

et al. 2023

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Tobias Beran

Hyperbolic angles in Lorentzian length spaces and timelike curvature bounds

Gluing constructions for Lorentzian length spaces

The splitting theorem for globally hyperbolic Lorentzian length spaces with non-negative timelike curvature

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