Add to ORKGLet dμ be a probability measure on the unit circle and dν be the measure formed by adding a pure point to dμ. We give a formula for the Verblunsky coefficients of dν, based on a result of Simon
AbstractIn the paper, we generalize some congruences of Lehmer and prove that for any positive integ...
AbstractA new uniform bound for the Laguerre polynomials Ln(α)(x), α∈R is determined
The purpose of this paper is to establish a Cohen type inequality for Fourier expansion with respe...
Let dμ be a probability measure on the unit circle and dν be the measure formed by adding a pure poi...
AbstractLet dμ be a probability measure on the unit circle and dν be the measure formed by adding a ...
Let d μ be a probability measure on the unit circle and d ν be the measure formed by adding a pure...
AbstractLet sn=1+1/2+⋯+1/(n−1)−logn. In 1995, the author has found a series transformation of the ty...
Let d μ be a probability measure on the unit circle and d ν be the measure formed by adding a pure...
We consider probability measures, dμ = w(θ)^(dθ)_(2π) + dμ_s, on the unit circle, ∂D, with Verblunsk...
We consider probability measures, dμ = w(θ)^(dθ)_(2π) + dμ_s, on the unit circle, ∂D, with Verblunsk...
AbstractThe generalized Gegenbauer polynomials are orthogonal polynomials with respect to the weight...
AbstractWe show a limit formula for Eisenstein series by using the theory of a multiple cotangent fu...
AbstractFor given positive integers n and a, let R(n;a) denote the number of positive integer soluti...
Let µ be the Jacobi measure supported on the interval [1; 1]. Let introduce the Sobolev-type inner ...
We give a formula for [scubscript sλ/μ](1,q,q[superscript 2],…)/sscubscript λ](1,q,q[superscript 2]...
AbstractIn the paper, we generalize some congruences of Lehmer and prove that for any positive integ...
AbstractA new uniform bound for the Laguerre polynomials Ln(α)(x), α∈R is determined
The purpose of this paper is to establish a Cohen type inequality for Fourier expansion with respe...
Let dμ be a probability measure on the unit circle and dν be the measure formed by adding a pure poi...
AbstractLet dμ be a probability measure on the unit circle and dν be the measure formed by adding a ...
Let d μ be a probability measure on the unit circle and d ν be the measure formed by adding a pure...
AbstractLet sn=1+1/2+⋯+1/(n−1)−logn. In 1995, the author has found a series transformation of the ty...
Let d μ be a probability measure on the unit circle and d ν be the measure formed by adding a pure...
We consider probability measures, dμ = w(θ)^(dθ)_(2π) + dμ_s, on the unit circle, ∂D, with Verblunsk...
We consider probability measures, dμ = w(θ)^(dθ)_(2π) + dμ_s, on the unit circle, ∂D, with Verblunsk...
AbstractThe generalized Gegenbauer polynomials are orthogonal polynomials with respect to the weight...
AbstractWe show a limit formula for Eisenstein series by using the theory of a multiple cotangent fu...
AbstractFor given positive integers n and a, let R(n;a) denote the number of positive integer soluti...
Let µ be the Jacobi measure supported on the interval [1; 1]. Let introduce the Sobolev-type inner ...
We give a formula for [scubscript sλ/μ](1,q,q[superscript 2],…)/sscubscript λ](1,q,q[superscript 2]...
AbstractIn the paper, we generalize some congruences of Lehmer and prove that for any positive integ...
AbstractA new uniform bound for the Laguerre polynomials Ln(α)(x), α∈R is determined
The purpose of this paper is to establish a Cohen type inequality for Fourier expansion with respe...