In: Molecular Imaging and Biology, 2015, vol. 17, no. 5, p. 704-713
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In: Nature, 2020, vol. 588, no. 2020-7838, p. 445–449
Pterosaurs were the first vertebrates to evolve powered flight1 and comprised one of the main evolutionary radiations in terrestrial ecosystems of the Mesozoic era (approximately 252–66 million years ago), but their origin has remained an unresolved enigma in palaeontology since the nineteenth century2,3,4. These flying reptiles have been hypothesized to be the close relatives of a wide...
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In: Applied Sciences, 2019, vol. 9, no. 19, p. 3975
In artistic gymnastics, the possibility of using 2D video analysis to measure the peak height (hpeak) and length of flight (L) during routine training in order to monitor the execution and development of difficult elements is intriguing. However, the validity and reliability of such measurements remain unclear. Therefore, in this study, the hpeak and L of 38 vaults, performed by top-level...
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Thèse de doctorat : Università della Svizzera italiana, 2019 ; 2019INFO009.
This work focuses on optimizing node placement for time-of-flight-based wireless localization networks. Main motivation are critical safety applications. The first part of my thesis is an experimental study on in-tunnel vehicle localization. In- tunnel localization of vehicles is crucial for emergency management, especially for large trucks transporting dangerous goods such as inflammable...
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In: PLOS ONE, 2019, vol. 14, no. 3, p. e0213310
On vault in artistic gymnastics, a high run-up speed is thought to be important when performing difficult vaults. To test this assumption in a large cohort of elite athletes, we calculated the correlations between the run-up speed, scores, height and length of flight for handspring-, Tsukahara- and Yurchenko-style vaults and compared the performances of male and female elite and junior...
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In: Proceedings of the American Mathematical Society, 2018, vol. 146, no. 10, p. 4447–4458
In this note we consider submersions from compact manifolds, homotopy equivalent to the Eschenburg or Bazaikin spaces of positive curvature. We show that if the submersion is nontrivial, the dimension of the base is greater than the dimension of the fiber. Together with previous results, this proves the Petersen-Wilhelm conjecture for all the known compact manifolds with positive curvature.
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In: Analytical and Bioanalytical Chemistry, 2013, vol. 405, no. 26, p. 8505-8514
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In: Neuroradiology, 2006, vol. 48, no. 5, p. 291-299
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In: Metabolomics, 2012, vol. 8, no. 4, p. 643-653
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In: Analytical and Bioanalytical Chemistry, 2011, vol. 400, no. 2, p. 503-516
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