Add to ORKGWe obtain inequalities of Abel type but for nondecreasing sequences rather than the usual nonincreasing sequences. Striking complex analogues are presented. The inequalities on the real domain are used to derive new integral inequalities related to those of Gauss-Pólya type
We consider probability measures, dμ = w(θ)^(dθ)_(2π) + dμ_s, on the unit circle, ∂D, with Verblunsk...
In this paper a theorem on | A, pn |k summability methods, which generalizes a theorem of Bor [2] on...
We consider probability measures, dμ = w(θ)^(dθ)_(2π) + dμ_s, on the unit circle, ∂D, with Verblunsk...
We show that for many families of OPUC, one has ‖φ'_n‖2/n → l, a condition we call normal behavior. ...
In this paper some inequalities for Dirichlet\u27s and Fejer\u27s kernels proved in [6] are refined ...
An inequality of Grüss-Lupas type in normed spaces is proved. Some applications in estimating the p-...
AbstractLet n>1 be an integer, f∈Cn[a,b], and A:C[a,b]→R a continuous linear functional which annihi...
AbstractIn [S.G. Samko, B.G. Vakulov, Weighted Sobolev theorem with variable exponent for spatial an...
AbstractIn this paper, splitting finite sums, refinements of the inequalities of Aczél, Popoviciu an...
Some conversions of the Jensen-Steffensen inequality for convex functions are considered. Applying e...
Let µ be the Jacobi measure supported on the interval [1; 1]. Let introduce the Sobolev-type inner ...
AbstractThe Apéry polynomials are given byAn(x)=∑k=0n(nk)2(n+kk)2xk(n=0,1,2,…). (Those An=An(1) are ...
In [S.G. Samko, B.G. Vakulov, Weighted Sobolev theorem with variable exponent for spatial and spheri...
AbstractNew oscillation and nonoscillation theorems are obtained for the second order quasilinear di...
AbstractWe prove that for any nonnegative integers n and r the binomial sum∑k=−nn(2nn−k)k2r is divis...
We consider probability measures, dμ = w(θ)^(dθ)_(2π) + dμ_s, on the unit circle, ∂D, with Verblunsk...
In this paper a theorem on | A, pn |k summability methods, which generalizes a theorem of Bor [2] on...
We consider probability measures, dμ = w(θ)^(dθ)_(2π) + dμ_s, on the unit circle, ∂D, with Verblunsk...
We show that for many families of OPUC, one has ‖φ'_n‖2/n → l, a condition we call normal behavior. ...
In this paper some inequalities for Dirichlet\u27s and Fejer\u27s kernels proved in [6] are refined ...
An inequality of Grüss-Lupas type in normed spaces is proved. Some applications in estimating the p-...
AbstractLet n>1 be an integer, f∈Cn[a,b], and A:C[a,b]→R a continuous linear functional which annihi...
AbstractIn [S.G. Samko, B.G. Vakulov, Weighted Sobolev theorem with variable exponent for spatial an...
AbstractIn this paper, splitting finite sums, refinements of the inequalities of Aczél, Popoviciu an...
Some conversions of the Jensen-Steffensen inequality for convex functions are considered. Applying e...
Let µ be the Jacobi measure supported on the interval [1; 1]. Let introduce the Sobolev-type inner ...
AbstractThe Apéry polynomials are given byAn(x)=∑k=0n(nk)2(n+kk)2xk(n=0,1,2,…). (Those An=An(1) are ...
In [S.G. Samko, B.G. Vakulov, Weighted Sobolev theorem with variable exponent for spatial and spheri...
AbstractNew oscillation and nonoscillation theorems are obtained for the second order quasilinear di...
AbstractWe prove that for any nonnegative integers n and r the binomial sum∑k=−nn(2nn−k)k2r is divis...
We consider probability measures, dμ = w(θ)^(dθ)_(2π) + dμ_s, on the unit circle, ∂D, with Verblunsk...
In this paper a theorem on | A, pn |k summability methods, which generalizes a theorem of Bor [2] on...
We consider probability measures, dμ = w(θ)^(dθ)_(2π) + dμ_s, on the unit circle, ∂D, with Verblunsk...