AbstractThe object of this work is to retrieve the convergence of a series from its discrete Mφ summability under certain conditions. We obtain as a corollary a Tauberian theorem for the discrete logarithmic summability method
AbstractLet sn be the partial sums of the series ∑n=0∞an. We consider the sufficient conditions for ...
AbstractIn this paper, some mistakes in the paper which is cited in the title are corrected. Fortuna...
The purpose of this paper is to establish a Cohen type inequality for Fourier expansion with respe...
AbstractWe show a limit formula for Eisenstein series by using the theory of a multiple cotangent fu...
AbstractLet sn=1+1/2+⋯+1/(n−1)−logn. In 1995, the author has found a series transformation of the ty...
AbstractFor given positive integers n and a, let R(n;a) denote the number of positive integer soluti...
AbstractWe establish a quantitative version of Vijayaraghavan's classical result and use it to give ...
AbstractThe paper deals with absolute summability factors for infinite series. The main purpose of t...
AbstractIn this paper, a singular elliptic system involving multiple critical exponents and the Caff...
AbstractIn the present paper, we have proved a more general theorem dealing with φ−|C,α,β|k summabil...
We show that for many families of OPUC, one has ‖φ'_n‖2/n → l, a condition we call normal behavior. ...
AbstractIn this paper we prove a Tauberian theorem for (A)(C,α) summability method, which extends th...
AbstractIn this paper, we consider the unboundedness problem of solutions for the following asymmetr...
Let µ be the Jacobi measure supported on the interval [1; 1]. Let introduce the Sobolev-type inner ...
AbstractIn this paper, we give direct, inverse and equivalence approximation theorems for the Bézier...
AbstractLet sn be the partial sums of the series ∑n=0∞an. We consider the sufficient conditions for ...
AbstractIn this paper, some mistakes in the paper which is cited in the title are corrected. Fortuna...
The purpose of this paper is to establish a Cohen type inequality for Fourier expansion with respe...
AbstractWe show a limit formula for Eisenstein series by using the theory of a multiple cotangent fu...
AbstractLet sn=1+1/2+⋯+1/(n−1)−logn. In 1995, the author has found a series transformation of the ty...
AbstractFor given positive integers n and a, let R(n;a) denote the number of positive integer soluti...
AbstractWe establish a quantitative version of Vijayaraghavan's classical result and use it to give ...
AbstractThe paper deals with absolute summability factors for infinite series. The main purpose of t...
AbstractIn this paper, a singular elliptic system involving multiple critical exponents and the Caff...
AbstractIn the present paper, we have proved a more general theorem dealing with φ−|C,α,β|k summabil...
We show that for many families of OPUC, one has ‖φ'_n‖2/n → l, a condition we call normal behavior. ...
AbstractIn this paper we prove a Tauberian theorem for (A)(C,α) summability method, which extends th...
AbstractIn this paper, we consider the unboundedness problem of solutions for the following asymmetr...
Let µ be the Jacobi measure supported on the interval [1; 1]. Let introduce the Sobolev-type inner ...
AbstractIn this paper, we give direct, inverse and equivalence approximation theorems for the Bézier...
AbstractLet sn be the partial sums of the series ∑n=0∞an. We consider the sufficient conditions for ...
AbstractIn this paper, some mistakes in the paper which is cited in the title are corrected. Fortuna...
The purpose of this paper is to establish a Cohen type inequality for Fourier expansion with respe...
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