Add to ORKGLet e ⊂ R be a finite union of ℓ+1 disjoint closed intervals, and denote by ω_j the harmonic measure of the j left-most bands. The frequency module for e is the set of all integral combinations of ω_1,…,ω_ℓ. Let {a_nb_n}^∞_(n=−∞) be a point in the isospectral torus for e and p_n its orthogonal polynomials. Let {a_nb_n}^∞_(n=1) be a half-line Jacobi matrix with a_n=a_n+δa_n, b_n=b_n+δb_n. Suppose ∑^∞_(n=1)│δan│^2 + │δb_n│^2 < ∞ and ∑^N_n=1^e^(2πiωn), δa_n ∑^N_n=1^e^(2πiωn) δb_n have finite limits as N → ∞ for all ω in the frequency module. If, in addition, these partial sums grow at most subexponentially with respect to ω, then for z∈ℂ∖ℝ, p_n(z)p_n(z) has a limit as n→∞. Moreover, we show that there are non-Szegő class J’s for which this h...
AbstractWe study the problem of the asymptotic expansion of the ratio of two gamma functions Γ(x+α)/...
In the present paper, a general theorem on ${mid{bar{N},p_n;delta}mid}_k$ summability factors of in...
Let µ be the Jacobi measure supported on the interval [1; 1]. Let introduce the Sobolev-type inner ...
Let e ⊂ R be a finite union of ℓ+1 disjoint closed intervals, and denote by ω_j the harmonic measure...
For Jacobi matrices with a_n=1+(−1)^nαn−γ, b_n=(−1)^nβn−γ, we study bound states and the Szegő condi...
AbstractWe study asymptotic properties (as n→∞) of polynomials Qn(x)=xn+⋯, orthogonal with respect t...
AbstractIn this paper we study the existence and the stability of bounded solutions of the following...
AbstractLet Pk(α,β)(x) be an orthonormal Jacobi polynomial of degree k. We will establish the follow...
We consider probability measures, dμ = w(θ)^(dθ)_(2π) + dμ_s, on the unit circle, ∂D, with Verblunsk...
The purpose of this paper is to establish a Cohen type inequality for Fourier expansion with respe...
AbstractWe first settle an open problem of Balakrishnan from Linear Algebra Appl. 387 (2004) 287–295...
AbstractLetA=H1E∗EH2andA∼=H1OOH2 be Hermitian matrices with eigenvalues λ1⩾⋯⩾λk and λ∼1⩾⋯⩾λ∼k, respe...
AbstractLet X and Y be n×n Hermitian matrices with eigenvalues x1⩾x2⩾⋯⩾xn and y1⩾y2⩾⋯⩾yn respectivel...
AbstractLet σ(n) be the sum of the positive divisors of n, and let A(t) be the natural density of th...
We show that for many families of OPUC, one has ‖φ'_n‖2/n → l, a condition we call normal behavior. ...
AbstractWe study the problem of the asymptotic expansion of the ratio of two gamma functions Γ(x+α)/...
In the present paper, a general theorem on ${mid{bar{N},p_n;delta}mid}_k$ summability factors of in...
Let µ be the Jacobi measure supported on the interval [1; 1]. Let introduce the Sobolev-type inner ...
Let e ⊂ R be a finite union of ℓ+1 disjoint closed intervals, and denote by ω_j the harmonic measure...
For Jacobi matrices with a_n=1+(−1)^nαn−γ, b_n=(−1)^nβn−γ, we study bound states and the Szegő condi...
AbstractWe study asymptotic properties (as n→∞) of polynomials Qn(x)=xn+⋯, orthogonal with respect t...
AbstractIn this paper we study the existence and the stability of bounded solutions of the following...
AbstractLet Pk(α,β)(x) be an orthonormal Jacobi polynomial of degree k. We will establish the follow...
We consider probability measures, dμ = w(θ)^(dθ)_(2π) + dμ_s, on the unit circle, ∂D, with Verblunsk...
The purpose of this paper is to establish a Cohen type inequality for Fourier expansion with respe...
AbstractWe first settle an open problem of Balakrishnan from Linear Algebra Appl. 387 (2004) 287–295...
AbstractLetA=H1E∗EH2andA∼=H1OOH2 be Hermitian matrices with eigenvalues λ1⩾⋯⩾λk and λ∼1⩾⋯⩾λ∼k, respe...
AbstractLet X and Y be n×n Hermitian matrices with eigenvalues x1⩾x2⩾⋯⩾xn and y1⩾y2⩾⋯⩾yn respectivel...
AbstractLet σ(n) be the sum of the positive divisors of n, and let A(t) be the natural density of th...
We show that for many families of OPUC, one has ‖φ'_n‖2/n → l, a condition we call normal behavior. ...
AbstractWe study the problem of the asymptotic expansion of the ratio of two gamma functions Γ(x+α)/...
In the present paper, a general theorem on ${mid{bar{N},p_n;delta}mid}_k$ summability factors of in...
Let µ be the Jacobi measure supported on the interval [1; 1]. Let introduce the Sobolev-type inner ...