The de Rham cohomology of the Suzuki curves

Abstract

For a natural number m, let Sm/F2 be the mth Suzuki curve. We study the mod 2 Dieudonn\'e module of Sm, which gives the equivalent information as the Ekedahl-Oort type or the structure of the 2-torsion group scheme of its Jacobian. We accomplish this by studying the de Rham cohomology of Sm. For all m, we determine the structure of the de Rham cohomology as a 2-modular representation of the mth Suzuki group and the structure of a submodule of the mod 2 Dieudonn\'e module. For m=1 and 2, we determine the complete structure of the mod 2 Dieudonn\'e module.