Abstract: We consider summation of some finite and infinite functional p-adic series with factorials. In particular, we are interested in the infinite series which are convergent for all primes p, and have the same integer value for an integer argument. In this paper, we present rather large class of such p-adic functional series with integer coefficients which contain factorials. By recurrence relations, we constructed sequence of polynomials A_k(n;x) which are a generator for a few other sequences also relevant to some problems in number theory and combinatorics
A general theorem concerning some absolute summability factors of infinite series is proved. This th...
In this paper, we study a sequence of polynomials, A1(z),A2(z),… useful in the study of production f...
[[abstract]]In the present paper a general theorem on j N ; pn; jk summability factors of innite se...
AbstractA general algorithm is considered and shown to lead to various unusual and unique series exp...
AbstractAn algorithm is introduced and shown to lead to various unique series expansions of p-adic n...
textMotivated by [5], we develop an analogy with a similar problem in p-adic power series over a fi...
AbstractIn 1940, K. Mahler presented a geometric algorithm which, for any P-adic integer ζ, yields a...
In the present paper, a general theorem concerning the ϕ − |N, pn|k summability factors of infinite ...
AbstractThe purpose of this work is to introduce new types of sequences, whose terms are infinite se...
AbstractWe prove an explicit formula for Fourier coefficients of Siegel–Eisenstein series of degree ...
AbstractGiven a set of sequences defined by linear recurrence relations 1 method is described for fi...
this paper a local approach. Fix a prime number p and let k p be the maximal unramified extension of...
AbstractLet p be a prime number, Qp the field of p-adic numbers, Qp a fixed algebraic closure of Qp,...
In memory of my sister Fedra Marina Jakimczuk (1970-2010) In this article we obtain some results on ...
International audienceABSTRACT. — The n-th order polylogarithm Ln(z) is defined by the seriesE^Ll zk...
A general theorem concerning some absolute summability factors of infinite series is proved. This th...
In this paper, we study a sequence of polynomials, A1(z),A2(z),… useful in the study of production f...
[[abstract]]In the present paper a general theorem on j N ; pn; jk summability factors of innite se...
AbstractA general algorithm is considered and shown to lead to various unusual and unique series exp...
AbstractAn algorithm is introduced and shown to lead to various unique series expansions of p-adic n...
textMotivated by [5], we develop an analogy with a similar problem in p-adic power series over a fi...
AbstractIn 1940, K. Mahler presented a geometric algorithm which, for any P-adic integer ζ, yields a...
In the present paper, a general theorem concerning the ϕ − |N, pn|k summability factors of infinite ...
AbstractThe purpose of this work is to introduce new types of sequences, whose terms are infinite se...
AbstractWe prove an explicit formula for Fourier coefficients of Siegel–Eisenstein series of degree ...
AbstractGiven a set of sequences defined by linear recurrence relations 1 method is described for fi...
this paper a local approach. Fix a prime number p and let k p be the maximal unramified extension of...
AbstractLet p be a prime number, Qp the field of p-adic numbers, Qp a fixed algebraic closure of Qp,...
In memory of my sister Fedra Marina Jakimczuk (1970-2010) In this article we obtain some results on ...
International audienceABSTRACT. — The n-th order polylogarithm Ln(z) is defined by the seriesE^Ll zk...
A general theorem concerning some absolute summability factors of infinite series is proved. This th...
In this paper, we study a sequence of polynomials, A1(z),A2(z),… useful in the study of production f...
[[abstract]]In the present paper a general theorem on j N ; pn; jk summability factors of innite se...