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On torsion in loop spaces of $H$-spaces
Illinois Journal of Mathematics, 1974 openaire +3 more sources
Navigating Ternary Doping in Li-ion Cathodes With Closed-Loop Multi-Objective Bayesian Optimization. [PDF]
Adv MaterZeinali Galabi N +6 more
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The future of fundamental science led by generative closed-loop artificial intelligence. [PDF]
Front Artif IntellZenil H +19 more
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Efficiency of ultrasonic retrieval for separated instruments within the middle third of root canals using modified staging platform: a comparative in-vitro study. [PDF]
BMC Oral HealthMohamed BS, Sabet NE, Morsy DA.
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Preoperative Classification of Submembrane Spaces for Optical Coherence Tomography-Guided Epiretinal Membranectomy. [PDF]
J Vitreoretin DisAlmeida DRP, Chin EK, Mahajan VB.
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Inventiones Mathematicae, 1989
It was shown by \textit{Y. Felix}, \textit{S. Halperin}, \textit{C. Jacobsson}, \textit{C. Löfwall}, and \textit{J.-C. Thomas} [Am. J. Math. 110, 301-322 (1988; Zbl 0654.55011)] that the rational Lusternik-Schnirelmann category of a space \(X\) forms an upper bound for the depth of the rational homology algebra of the loop space \(\Omega\) X.
Félix, Yves +3 more
openaire +1 more source
It was shown by \textit{Y. Felix}, \textit{S. Halperin}, \textit{C. Jacobsson}, \textit{C. Löfwall}, and \textit{J.-C. Thomas} [Am. J. Math. 110, 301-322 (1988; Zbl 0654.55011)] that the rational Lusternik-Schnirelmann category of a space \(X\) forms an upper bound for the depth of the rational homology algebra of the loop space \(\Omega\) X.
Félix, Yves +3 more
openaire +1 more source