Differential modules and dormant opers of higher level

Abstract

In the first half of the present paper, we study higher-level generalizations of differential modules in positive characteristic. These objects may be regarded as ring-theoretic counterparts of vector bundles on a curve equipped with an action of the ring of (logarithmic) differential operators of finite level introduced by P. Berthelot (and C. Montagnon). The existence assertion for a cyclic vector of a differential module is generalized to higher level under mild conditions. In the second half, we introduce (dormant) opers of level N > 0 on a pointed smooth curve whose structure group is either GLn or PGLn. Some of the results on higher-level differential modules are applied to prove a duality theorem between dormant PGLn-opers of level N and dormant PGLpN-n-opers of level N. Finally, in the case where the underlying curve is a 3-pointed projective line, we establish a bijective correspondence between dormant PGL2-opers of level N and certain tamely ramified coverings.