A p-adically entire function with integral values on Qp and entire liftings of the p-divisible group Qp/ Zp

Abstract

We give a self-contained proof of the fact that, for any prime number p, there exists a power series = p(T) ∈ T + T2[[T]] which trivializes the addition law of the formal group of Witt covectors is p-adically entire and assumes values in p all over p. We actually generalize, following a suggestion of M. Candilera, the previous facts to any fixed unramified extension q of p of degree f, where q = pf. We show that = q provides a quasi-finite covering of the Berkovich affine line 1_p by itself. We prove in section 3 new strong estimates for the growth of , in view of the application to p-adic Fourier expansions on p. We locate the zeros of and to obtain its product expansion. We reconcile the present discussion (for q =p) with a previous formal group proof which takes place in the Fr\'echet algebra p\x\ of the analytic additive group a,p over p. We show that, for any λ ∈ p×, the closure λ of p[(pix/λ)\,|\,i=0,1,…] in p\x\ is a Hopf algebra object in the category of Fr\'echet p-algebras. The special fiber of λ is the affine algebra of the p-divisible group p/p λ p over p, while λ [1/p] is dense in p\x\. From p[(λ x)\,|\,λ ∈ p×] we construct a p-adic analog _p() of the algebra of Dirichlet series holomorphic in a strip (-, ) × i ⊂ . We start developing this analogy. It turns out that the Banach algebra of almost periodic functions on p identifies with the topological ring of germs of holomorphic almost periodic functions on strips around p.