AbstractAn algorithm is introduced and shown to lead to a unique infinite product representation for a given formal power series A(z) with A(0) = 1. The infinite product is ∏n=1∞(1+bnzrn), where all bn ≠ 0, rn∈N, and rn+1 > rn. The degree of approximation by the polynomial (1 + b1zr1) · · · (1 + bnzrn) is also considered
AbstractAn algorithm is considered, and shown to lead to various unusual and unique series expansion...
AbstractAn algorithm is introduced and shown to lead to various unique series expansions of p-adic n...
AbstractLet X be a finite simply connected CW-complex of dimension nX such that π∗(ΩX)⊗Q is infinite...
AbstractLet f(z) be any fixed formal power series starting 1 + z + (possibly) terms in higher powers...
AbstractAn algorithm is introduced and shown to lead to a unique infinite product representation for...
Let $K$ be a field of characteristic zero. We deal with the algebraic closure of the field of fracti...
AbstractIt is shown how two doubly infinite sets of series involving π may be obtained using closure...
We give an exact coefficients formula of any infinite product of power series with constant term equ...
AbstractUniform approximation of functions of a real or a complex variable by a class of linear oper...
In [8], Bor has obtained a main theorem dealing with Riesz summability factors of infinite series an...
"Several aspects of microlocal analysis". October 20~24, 2014. edited by Naofumi Honda, Yasunori Oka...
AbstractThe methodology used for proving the uniform convergence of the infinite product of quotient...
AbstractA general method for obtaining rational approximations to formal power series is defined and...
AbstractUsing old results on the explicit calculation of determinants, formulae are given for the co...
In this paper, we obtain an approximation theorem by max-product operators with the use of power ser...
AbstractAn algorithm is considered, and shown to lead to various unusual and unique series expansion...
AbstractAn algorithm is introduced and shown to lead to various unique series expansions of p-adic n...
AbstractLet X be a finite simply connected CW-complex of dimension nX such that π∗(ΩX)⊗Q is infinite...
AbstractLet f(z) be any fixed formal power series starting 1 + z + (possibly) terms in higher powers...
AbstractAn algorithm is introduced and shown to lead to a unique infinite product representation for...
Let $K$ be a field of characteristic zero. We deal with the algebraic closure of the field of fracti...
AbstractIt is shown how two doubly infinite sets of series involving π may be obtained using closure...
We give an exact coefficients formula of any infinite product of power series with constant term equ...
AbstractUniform approximation of functions of a real or a complex variable by a class of linear oper...
In [8], Bor has obtained a main theorem dealing with Riesz summability factors of infinite series an...
"Several aspects of microlocal analysis". October 20~24, 2014. edited by Naofumi Honda, Yasunori Oka...
AbstractThe methodology used for proving the uniform convergence of the infinite product of quotient...
AbstractA general method for obtaining rational approximations to formal power series is defined and...
AbstractUsing old results on the explicit calculation of determinants, formulae are given for the co...
In this paper, we obtain an approximation theorem by max-product operators with the use of power ser...
AbstractAn algorithm is considered, and shown to lead to various unusual and unique series expansion...
AbstractAn algorithm is introduced and shown to lead to various unique series expansions of p-adic n...
AbstractLet X be a finite simply connected CW-complex of dimension nX such that π∗(ΩX)⊗Q is infinite...
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