| Abstract: | A sheaf of differentials on a compact Riemann surface supplied with a projective structure is said to be n-analytic if, in
local projective coordinates, sections of the sheaf satisfy the differential equation {
} For the projective structure induced by a covering mapping from the disk, an explicit characterization of the space of cross
sections and of the space of first cohomologies of an n-analytic sheaf is given in terms of known spaces of sections of certain
holomorphic sheaves. Bibliography: 10 titles.
Translated fromZapiski Nauchnykh Seminarov POMI, Vol. 247, 1997, pp. 15–25.
Translated by S. V. Kislyakov. |
