On cohomology groups of nef line bundles tensorized with multiplier ideal sheaves on compact Kähler manifolds (Q1382129)

Main theorem proved here: Let \(X\) be a compact Kähler manifold, \(\dim(X) =n\), with a fixed Kähler metric \(\omega_X\), \(E\) a nef line bundle on \(X\) with a smooth hermitian metric \(h_E\) and \(\varphi\) an integrable function with \(\Theta_E+ dd^c \varphi\) positive current; let \(I(\varphi)\) be the multiplier ideal sheaf of \(\varphi\); then the homomorphism \[ H^0 \bigl(X,I (\varphi) \otimes \Omega_X^{n-q} (E)\bigr) \to\text{Image} \bigl( j^q (\varphi) \bigr) \subseteq H^q \bigl(X, \Omega_X^n (E)\bigr) \] is surjective and the Hodge star operator relative to \(\omega_X\) induces a splitting homomorphism \(\delta^q: \text{Image} (j^q (\varphi))\to H^0 (X,I(\varphi) \otimes \Omega^{n-q}_X (E))\). Here the multiplier ideal sheaf \(I(\varphi)\) associated to \(\varphi\) is the sheaf of germs of holomorphic functions, \(f\), such that \(| f|^2e^{-\varphi}\) is locally integrable with respect to any (local) Lebesgue measure; \(j^q (\varphi)\): \(H^q (X,I(\varphi) \otimes \Omega^n_X (E))\to H^q(X, \Omega^n_X (E))\) is the inclusion induced by the inclusion \(I(\varphi) \otimes \Omega^n_X (E)\to \Omega^n_X (E)\). The main theorem is applied in this paper to obtain vanishing theorems of Kawamata-Viehweg type.