Nombre de zéros des fonctions exponentielles-polynômes
Nombres de Bell et analyse -adique
Nonarchimedean Harmonie Analysis and Analytic Functions.
Normal bases for the space of continuous functions defined on a subset of Zp.
Let K be a non-archimedean valued field which contains Qp and suppose that K is complete for the valuation |·|, which extends the p-adic valuation. Vq is the closure of the set {aqn|n = 0,1,2,...} where a and q are two units of Zp, q not a root of unity. C(Vq → K) is the Banach space of continuous functions from Vq to K, equipped with the supremum norm. Our aim is to find normal bases (rn(x)) for C(Vq → K), where rn(x) does not have to be a polynomial.
Normal bases of rings of continuous functions constructed with the (qₙ)-digit principle
Nouveau point de vue sur le prolongement algébrique