Coordinate Transformation in Faltings' Extension

Abstract

Analogue to Fontaine's computation for Zp/Zp, we compute the structure of OK0/OK0 (here K0 is the completion of Qp(T) at place p) and prove that p1-1/pndp1/pn, T1-1/pndT1/pn and S1-1/pndS1/pn are linearly dependent (Here S := 1-T). The main aim of this article is to find the linear equations for these three differential forms. Then we define a map which is called "differential version" of Fontaine's map to express the equations in a computable way. Finally, we prove that the coefficients in the equation can be expressed in some polynomial forms and compute some examples.