Defines timelike ideal boundary for non-positively curved Lorentzian length spaces, proves upper curvature bounds on the resulting space, and relates it to generalized cones.
Penrose, Phys
2 Pith papers cite this work. Polarity classification is still indexing.
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Pith papers citing it
years
2026 2verdicts
UNVERDICTED 2representative citing papers
Radiation from hyperbolic motion escapes the Rindler wedge with zero flux at infinity inside it in both frames.
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Timelike ideal boundary of non-positively curved Lorentzian spaces
Defines timelike ideal boundary for non-positively curved Lorentzian length spaces, proves upper curvature bounds on the resulting space, and relates it to generalized cones.
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On radiation from hyperbolic motion, behavior of electromagnetic fields, and coordinate transformations at infinity
Radiation from hyperbolic motion escapes the Rindler wedge with zero flux at infinity inside it in both frames.