Abstract class field theory (formatting of modules).
Abstract -expansions and ultimately periodic representations
For abstract numeration systems built on exponential regular languages (including those coming from substitutions), we show that the set of real numbers having an ultimately periodic representation is if the dominating eigenvalue of the automaton accepting the language is a Pisot number. Moreover, if is neither a Pisot nor a Salem number, then there exist points in which do not have any ultimately periodic representation.
Acknowledgment of priority
Action of Aut (.../...) on Zeta-Integrals and Local Constants.
Addendum and corrigendum to the paper "Abelian binomials, power residues and exponential congruences", Acta Arith. 32(1977), pp. 245-274
Addendum: Les extensions quadratiques du corps des raionnels, ou du corps de Gauss, ou du coprs des racines cubiques de l'unité de calibres 1.
Addendum to the paper "On the product of the conjugates outside the unit circle of an algebraic number"
Addendum to the papers "On polynomials taking small values at integral arguments I, II" (Acta Arith. 42 (1983), 189-196; ibid. 106 (2003), 115-121)
Addendum to: v-adic Zeta Functions, L-series and Measures for Function Fields.
Addition of Sequences in General Fields.
Additive Galois module structure and Chinburg's invariant.
Additive relations with conjugate algebraic numbers
Adèles et groupes algébriques
Adèles et séries trigonométriques spéciales
Algebraic cycles and values of L-functions.
Algebraic function fields of class number one
Algebraic function fields with equal class number
Algebraic independence results for reciprocal sums of Fibonacci numbers
Algebraic integers near the unit circle
Algebraic integers of small discriminant