THE REDUCTION OF CERTAIN TWO DIMENSIONAL SEMISTABLE REPRESENTATIONS
Let p be a prime number and F be a finite extension of Qp. We established an algorithm to compute the semisimplification of the reduction of some irreducible two dimensional crystalline representations with two parameter {h,ap} when vp(ap) is large enough. We improve the known results when p|h. We also extend the algorithm to the two dimensional semistable and non-crystalline representation. We compute the semi-simplification of the reduction when vp(L) large enough and p=2. These results solve the difficulties with the case p=2. The strategies are based on the study of the Kisin modules over OF and Breuil modules over SF. By the theory of Breuil and Theorem of Colmez-Fontaine, these modules are closely related to semistable representations.
History
Degree Type
- Doctor of Philosophy
Department
- Mathematics
Campus location
- West Lafayette