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Public Spaces as Hotspots of Zoonotic Gastrointestinal Parasite Transmission: Evidence from Small Animal and Soil Surveillance in Malaysia. [PDF]
J Epidemiol Glob HealthLow SY +11 more
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Autonomous microfluidic labs: progress and prospects.
Lab ChipDamir S +3 more
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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
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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
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Journal of Knot Theory and Its Ramifications, 1999
We prove that the rack and quandle spaces of links in 3-manifolds, considered only as topological spaces (disregarding their cubical structure), are closely related to certain subspaces of the loop spaces on the 3-manifold, which we call the vertical and the straight loop space of the link. Using these models we prove that the homotopy type of the non-
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We prove that the rack and quandle spaces of links in 3-manifolds, considered only as topological spaces (disregarding their cubical structure), are closely related to certain subspaces of the loop spaces on the 3-manifold, which we call the vertical and the straight loop space of the link. Using these models we prove that the homotopy type of the non-
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Shape loop space of pro-discrete spaces
2022Loop spaces endowed with a (natural) compact-open topology are important invariants in (algebraic) topology. In the paper [Topology Appl. 261, 29--38 (2019; Zbl 1430.55008)], the author and \textit{B. Mashayekhy} introduced the \(k\)-th shape loop space \(\Omega_{k}^{p}(X,x)\) for the fixed polyhedral expansion \(p:(X,x)\to((X_\lambda,x_\lambda),[p_ ...
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