Singular points of a Morsian form and foliations (Q1382597)

Let \(M\) be a smooth compact connected orientable \(n\)-dimensional manifold on which the 1-form \(\omega\) with Morse peculiarities is defined. On the manifold \(M\) a foliation with peculiarities \(\mathcal F_\omega\) is specified. The irrationality power of the form \(\omega\) is determined by \[ \text{dirr } \omega = rk_Q\Biggl\{\int_{z_1} \omega,\dots, \int_{z_m} \omega \Biggr\} - 1, \] where \(z_1,\dots,z_m\) is the basis in \(H_1(M)\). It is proved that in the case of a compact foliation the irrationality power of the form and the number of homologically independent layers are determined by the correlation of the number of special points of index 0 and 1.