D
Domenico Giulini
Researcher at Leibniz University of Hanover
Publications - 149
Citations - 5825
Domenico Giulini is an academic researcher from Leibniz University of Hanover. The author has contributed to research in topics: General relativity & Einstein. The author has an hindex of 31, co-authored 145 publications receiving 5452 citations. Previous affiliations of Domenico Giulini include Pennsylvania State University & University of Freiburg.
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Decoherence and the Appearance of a Classical World in Quantum Theory
TL;DR: In this article, the authors present basic concepts and their interpretation, including Decoherence through Interaction with the Environment, consistent history and decoherence in Quantum Field Theory and Quantum Gravity.
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The Physical Basis of the Direction of Time
TL;DR: The fifth edition of Dieter Zeh's classic text on the physical foundations of time-irreversibility in the phenomena appeared as volume 200 in the Springer series Lecture Notes in Physics as mentioned in this paper.
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Quantum tests of the Einstein Equivalence Principle with the STE–QUEST space mission
Brett Altschul,Quentin G. Bailey,Luc Blanchet,Kai Bongs,Philippe Bouyer,Luigi Cacciapuoti,Salvatore Capozziello,Naceur Gaaloul,Domenico Giulini,Jonas Hartwig,Luciano Iess,Philippe Jetzer,Arnaud Landragin,Ernst M. Rasel,Serge Reynaud,Stephan Schiller,Christian Schubert,Fiodor Sorrentino,Uwe Sterr,Jay D. Tasson,Guglielmo M. Tino,Philip Tuckey,Peter Wolf +22 more
TL;DR: The STE-QUEST science case as mentioned in this paper describes the scientific objectives in fundamental physics of the Space-Time Explorer (STE-QUEST), which carries out tests of different aspects of the Einstein equivalence principle using atomic clocks, matter wave interferometry and long distance time/frequency links.
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Influence of global cosmological expansion on local dynamics and kinematics
Matteo Carrera,Domenico Giulini +1 more
TL;DR: In this article, the influence of global cosmological expansion on local systems is reviewed, where "local" is taken to mean that the sizes of the considered systems are much smaller than cosmologically relevant scales.