A p-adic Montel theorem and locally polynomial functions

Abstract

We prove a version of both Jacobi's and Montel's Theorems for the case of continuous functions defined over the field Qp of p-adic numbers. In particular, we prove that, if \[ h0m+1f(x)=0 \ \ for all x∈Qp, \] and |h0|p=p-N0 then, for all x0∈ Qp, the restriction of f over the set x0+pN0Zp coincides with a polynomial px0(x)=a0(x0)+a1(x0)x+...+am(x0)xm. Motivated by this result, we compute the general solution of the functional equation with restrictions given by equation hm+1f(x)=0 \ \ (x∈ X and h∈ BX(r)=\x∈ X:\|x\|≤ r\), equation whenever f:X Y, X is an ultrametric normed space over a non-Archimedean valued field (K,|...|) of characteristic zero, and Y is a Q-vector space. By obvious reasons, we call these functions uniformly locally polynomial.