AbstractTo evaluate the class of integrals ∫1−1e−αxƒ(x) dx, where R† and the function f(x) is known only approximately in a tabular form, we wish to use a Gaussian quadrature formula. Nodes and weights have to be computed using the family of monic orthogonal polynomials, with respect to the weight function e−αx, obtained through the three-term recurrence relation Pk+1(x) = (x + Bk+1)Pk(x) − Ck+1Pk−1(x).To guarantee a good precision, we must evaluate carefully the values for the coefficients Bk+1 and Ck+1. Such evaluations are made completely formally through a Mathematica program to obtain great precision.A comparison between various methods, starting from moments and modified moments, is shown. Numerical results are also presented
In this paper, we consider the Gauss-Kronrod quadrature formulas for a modified Chebyshev weight. Ef...
A special recursive algorithm is built by a three-term recursive formula with coefficients evaluated...
AbstractIn this paper we consider polynomials orthogonal with respect to an oscillatory weight funct...
AbstractTo evaluate the class of integrals ∫1−1e−αxƒ(x) dx, where R† and the function f(x) is known ...
To evaluate the class of integrals $\int^1_{-1}e^{-\alpha x}f(x) dx$, where $\alpha \in \R^+$ and th...
AbstractWe consider the problem of generating the three-term recursion coefficients of orthogonal po...
AbstractIn this paper we are constructing a recurrence relation of the form ∑i=0rωi(k)mk+i{λ} [f] = ...
summary:The paper describes a new numerical method for the computation of integrals with the weight ...
We are presenting here a class of integrals that has shown its importance in quantum mechanics. It's...
AbstractA representation formula (by means of the generalized Lucas Polynomials of first kind) for t...
In a series of articles about the numerical computation of orthogonal polynomials on a subset of the...
AbstractIn this paper a recurrence formula for the computation of Mk = ∫−1+1 (1 − x)α(1 + x)β exp[−a...
A new approach is presented for constructing recurrence relations for the modified moments of a func...
AbstractSoftware (in Matlab) is developed for computing variable-precision recurrence coefficients f...
In a series of articles [9, 10, 11] about the numerical computation of orthogonal polynomials on a s...
In this paper, we consider the Gauss-Kronrod quadrature formulas for a modified Chebyshev weight. Ef...
A special recursive algorithm is built by a three-term recursive formula with coefficients evaluated...
AbstractIn this paper we consider polynomials orthogonal with respect to an oscillatory weight funct...
AbstractTo evaluate the class of integrals ∫1−1e−αxƒ(x) dx, where R† and the function f(x) is known ...
To evaluate the class of integrals $\int^1_{-1}e^{-\alpha x}f(x) dx$, where $\alpha \in \R^+$ and th...
AbstractWe consider the problem of generating the three-term recursion coefficients of orthogonal po...
AbstractIn this paper we are constructing a recurrence relation of the form ∑i=0rωi(k)mk+i{λ} [f] = ...
summary:The paper describes a new numerical method for the computation of integrals with the weight ...
We are presenting here a class of integrals that has shown its importance in quantum mechanics. It's...
AbstractA representation formula (by means of the generalized Lucas Polynomials of first kind) for t...
In a series of articles about the numerical computation of orthogonal polynomials on a subset of the...
AbstractIn this paper a recurrence formula for the computation of Mk = ∫−1+1 (1 − x)α(1 + x)β exp[−a...
A new approach is presented for constructing recurrence relations for the modified moments of a func...
AbstractSoftware (in Matlab) is developed for computing variable-precision recurrence coefficients f...
In a series of articles [9, 10, 11] about the numerical computation of orthogonal polynomials on a s...
In this paper, we consider the Gauss-Kronrod quadrature formulas for a modified Chebyshev weight. Ef...
A special recursive algorithm is built by a three-term recursive formula with coefficients evaluated...
AbstractIn this paper we consider polynomials orthogonal with respect to an oscillatory weight funct...