textMotivated by [5], we develop an analogy with a similar problem in p-adic power series over a finite field extension of Qp, say K. Concerned with the convergence of the p-adic power series, we naturally assume that it converges in the unit disc, since we calculate the values of this power series at roots of unity in Q¯ p. This dissertation is devoted to the proof of the following result. Let F(x1,...,xn) be a power series over K, a finite field extension of Qp, converging in On K = {(x1,...,xn) ∈ Kn| max 1≤i≤n {|xi|p} ≤ 1}. Then, there exists a positive constant c such that for any roots of unity ζ1,...,ζn in the algebraic closure of Qp either F(ζ1,...,ζn) = 0 or |F(ζ1,...,ζn)|p ≥ c. We also compute some constants c associat...
A continued fraction expansion for a quartic power series over F_13 was conjectured by David Robbins...
AbstractWe extend some results of Christol and Furstenberg to the case of several variables: (1) A p...
In this paper, we consider some lacunar power series in Q(p), where p is a prime number. We obtain s...
textMotivated by [5], we develop an analogy with a similar problem in p-adic power series over a fi...
AbstractLet p be a prime number, Qp the field of p-adic numbers, Qp a fixed algebraic closure of Qp,...
Abstract. We extend the result of Anglès [1], namely f ′(T; θ) ≡ 0 (mod p) for the Iwasawa power s...
AbstractAn algorithm is introduced and shown to lead to various unique series expansions of p-adic n...
AbstractWe extend the result of Anglès (2007) [1], namely f′(T;θ)≢0(modp) for the Iwasawa power seri...
Abstract: We consider summation of some finite and infinite functional p-adic series with factorials...
When is an ideal of a ring radical or prime? By examining its generators, one may in many cases defi...
AbstractA general algorithm is considered and shown to lead to various unusual and unique series exp...
AbstractThe continued fraction expansion for a quartic power series over the finite field F13 was co...
Let K be a finite field and K(x) be the quotient field of the ring of polynomials in x with coeffici...
AbstractLet q⩾2 be an integer and let w be a block of 0, …, q−1 of finite length. For a nonnegative ...
AbstractPower series with rational exponents on the real numbers field and the Levi-Civita field are...
A continued fraction expansion for a quartic power series over F_13 was conjectured by David Robbins...
AbstractWe extend some results of Christol and Furstenberg to the case of several variables: (1) A p...
In this paper, we consider some lacunar power series in Q(p), where p is a prime number. We obtain s...
textMotivated by [5], we develop an analogy with a similar problem in p-adic power series over a fi...
AbstractLet p be a prime number, Qp the field of p-adic numbers, Qp a fixed algebraic closure of Qp,...
Abstract. We extend the result of Anglès [1], namely f ′(T; θ) ≡ 0 (mod p) for the Iwasawa power s...
AbstractAn algorithm is introduced and shown to lead to various unique series expansions of p-adic n...
AbstractWe extend the result of Anglès (2007) [1], namely f′(T;θ)≢0(modp) for the Iwasawa power seri...
Abstract: We consider summation of some finite and infinite functional p-adic series with factorials...
When is an ideal of a ring radical or prime? By examining its generators, one may in many cases defi...
AbstractA general algorithm is considered and shown to lead to various unusual and unique series exp...
AbstractThe continued fraction expansion for a quartic power series over the finite field F13 was co...
Let K be a finite field and K(x) be the quotient field of the ring of polynomials in x with coeffici...
AbstractLet q⩾2 be an integer and let w be a block of 0, …, q−1 of finite length. For a nonnegative ...
AbstractPower series with rational exponents on the real numbers field and the Levi-Civita field are...
A continued fraction expansion for a quartic power series over F_13 was conjectured by David Robbins...
AbstractWe extend some results of Christol and Furstenberg to the case of several variables: (1) A p...
In this paper, we consider some lacunar power series in Q(p), where p is a prime number. We obtain s...