de Rham and Dolbeault Cohomology of solvmanifolds with local systems

Abstract: Let $G$ be a simply connected solvable Lie group with a lattice $\Gamma$ and the Lie algebra $\g$ and a representation $\rho:G\to GL(V_{\rho})$ whose restriction on the nilradical is unipotent. Consider the flat bundle $E_{\rho}$ given by $\rho$. By using "many" characters ${\alpha}$ of $G$ and "many" flat line bundles ${E_{\alpha}}$ over $G/\Gamma$, we show that an isomorphism [\bigoplus_{{\alpha}} H^{\ast}(\g, V_{\alpha}\otimes V_{\rho})\cong \bigoplus_{{E_{\alpha}}} H^{\ast}(G/\Gamma, E_{\alpha}\otimes E_{\rho})] holds. This isomorphism is a generalization of the well-known fact:"If $G$ is nilpotent and $\rho$ is unipotent then, the isomorphism $H^{\ast}(\g, V_{\rho})\cong H^{\ast}(G/\Gamma, E_{\rho})$ holds". By this result, we construct an explicit finite dimensional cochain complex which compute the cohomology $H^{\ast}(G/\Gamma, E_{\rho})$ of solvmanifolds even if the isomorphism $H^{\ast}(\g, V_{\rho})\cong H^{\ast}(G/\Gamma, E_{\rho})$ does not hold. For Dolbeault cohomology of complex parallelizable solvmanifolds, we also prove an analogue of the above isomorphism result which is a generalization of computations of Dolbeault cohomology of complex parallelizable nilmanifolds. By this isomorphism, we construct an explicit finite dimensional cochain complex which compute the Dolbeault cohomology of complex parallelizable solvmanifolds.