Singular foliations for M-theory compactification
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Publication:1755050
DOI10.1007/JHEP03(2015)116zbMath1388.83727arXiv1411.3497WikidataQ125738729 ScholiaQ125738729MaRDI QIDQ1755050
Calin-Iuliu Lazaroiu, Elena-Mirela Babalic
Publication date: 31 May 2018
Published in: Journal of High Energy Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1411.3497
Related Items (13)
Geometric algebra techniques in flux compactifications ⋮ Generalised structures for \( \mathcal{N}=1 \) AdS backgrounds ⋮ M-theory on non-Kähler eight-manifolds ⋮ The landscape of G-structures in eight-manifold compactifications of M-theory ⋮ Internal circle uplifts, transversality and stratified G-structures ⋮ Spinors of real type as polyforms and the generalized Killing equation ⋮ \(\mathrm{AdS}_3\) vacua realising \(\mathfrak{osp}(n|2)\) superconformal symmetry ⋮ \(N = (2, 0)\) \(\mathrm{AdS}_3\) solutions of M-theory ⋮ Sufficient conditions for the compactifiability of~a~closed~one-form~foliation ⋮ Compact and locally dense leaves of a closed one-form foliation ⋮ Foliated eight-manifolds for M-theory compactification ⋮ Twisted Cohomotopy implies M-theory anomaly cancellation on 8-manifolds ⋮ The co-rank of the fundamental group: The direct product, the first Betti number, and the topology of foliations
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