The Fr\"olicher spectral sequence of certain solvmanifolds
classification
🧮 math.DG
math.CVmath.KT
keywords
gammaprimeolichersequencespectraldegeneratetermcomplex
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We show that the Fr\"olicher spectral sequence of a complex parallelizable solvmanifold is degenerate at $E_{2}$-term. For a semi-direct product $G=\C^{n}\ltimes_{\phi}N$ of Lie-groups with lattice $\Gamma=\Gamma^{\prime}\ltimes \Gamma^{\prime\prime}$ such that $N$ is a nilpotent Lie-group with a left-invariant complex structure and $\phi$ is a semi-simple action, we also show that, if the Fr\"olicher spectral sequence of the nilmanifold $N/\Gamma^{\prime\prime}$ is degenerate at $E_{r}$-term for $r\ge 2$, then the Fr\"olicher spectral sequence of the solvmanifold $G/\Gamma$ is also degenerate at $E_{r}$-term.
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