Kasuya, Hisashi Minimal models, formality, and hard Lefschetz properties of solvmanifolds with local systems. (English) Zbl 1373.53069 J. Differ. Geom. 93, No. 2, 269-297 (2013). Summary: For a simply connected solvable Lie group \(G\) with a cocompact discrete subgroup \(\Gamma\), we consider the space of differential forms on the solvmanifold \(G/\Gamma\) with values in a certain flat bundle so that this space has a structure of a differential graded algebra (DGA). We construct Sullivan’s minimal model of this DGA. This result is an extension of Nomizu’s theorem for ordinary coefficients in the nilpotent case. By using this result, we refine Hasegawa’s result of formality of nilmanifolds and Benson-Gordon’s result of hard Lefschetz properties of nilmanifolds. Cited in 17 Documents MSC: 53C30 Differential geometry of homogeneous manifolds 16E45 Differential graded algebras and applications (associative algebraic aspects) 14E30 Minimal model program (Mori theory, extremal rays) Keywords:cocompact discrete subgroup; flat bundle; differential graded algebra; minimal model; formality of nilmanifolds PDF BibTeX XML Cite \textit{H. Kasuya}, J. Differ. Geom. 93, No. 2, 269--297 (2013; Zbl 1373.53069) Full Text: DOI Euclid arXiv