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Algorithms for Evaluation of the Wright Function for the Real Arguments’ Values

Luchko, Yury (2008)

Fractional Calculus and Applied Analysis

2000 Math. Subject Classification: 33E12, 65D20, 33F05, 30E15The paper deals with analysis of several techniques and methods for the numerical evaluation of the Wright function. Even if the focus is mainly on the real arguments’ values, the methods introduced here can be used in the complex plane, too. The approaches presented in the paper include integral representations of the Wright function, its asymptotic expansions and summation of series. Because the Wright function depends on two parameters ...

An accurate approximation of zeta-generalized-Euler-constant functions

Vito Lampret (2010)

Open Mathematics

Zeta-generalized-Euler-constant functions, $γ (s) : = \sum_{k = 1}^{\infty} (\frac{1}{k^{s}} - \int_{k}^{k + 1} \frac{d x}{x^{s}})$ and $\tilde{γ} (s) : = \sum_{k = 1}^{\infty} {(- 1)}^{k + 1} (\frac{1}{k^{s}} - \int_{k}^{k + 1} \frac{d x}{x^{s}})$ defined on the closed interval [0, ∞), where γ(1) is the Euler-Mascheroni constant and $\tilde{γ}$ (1) = ln $\frac{4}{π}$ , are studied and estimated with high accuracy.

Application of Bessel coefficients in approximative expressing of collectives

Ladislav Truksa (1930)

Aktuárské vědy

Approximating poles of complex rational functions.

Lócsi, Levente (2009)

Acta Universitatis Sapientiae. Mathematica

Approximating real Pochhammer products: a comparison with powers

Vito Lampret (2009)

Open Mathematics

Accurate estimates of real Pochhammer products, lower (falling) and upper (rising), are presented. Double inequalities comparing the Pochhammer products with powers are given. Several examples showing how to use the established approximations are stated.

Approximation of hypergeometric functions with matricial argument through their development in series of zonal polynomials.

Gutiérrez, R., Rodriguez, J., Sáez, A.J. (2000)

ETNA. Electronic Transactions on Numerical Analysis [electronic only]

Decomposition principle for the reciprocal of the factorial.

Haidar, Nassar H.S., Hamzeh, Adnan M., Hamzeh, Soumaya M. (2005)

Applied Mathematics E-Notes [electronic only]

Enumeration of integral tetrahedra.

Kurz, Sascha (2007)

Journal of Integer Sequences [electronic only]

Errata to: “Decomposition principle for the reciprocal of the factorial”.

Haidar, Nassar H.S., Hamzeh, Adnan M., Hamzeh, Soumaya M. (2005)

Applied Mathematics E-Notes [electronic only]

Estimating powers with base close to unity and large exponents.

Lampret, Vito (2005)

Divulgaciones Matemáticas

Estimating the sequence of real binomial coefficients.

Lampret, Vito (2006)

JIPAM. Journal of Inequalities in Pure & Applied Mathematics [electronic only]

Euler polynomials and the related quadrature rule.

Bretti, Gabriella, Ricci, Paolo E. (2001)

Georgian Mathematical Journal

Exotic approximate identities and Maass forms

Fernando Chamizo, Dulcinea Raboso, Serafín Ruiz-Cabello (2013)

Acta Arithmetica

We obtain some approximate identities whose accuracy depends on the bottom of the discrete spectrum of the Laplace-Beltrami operator in the automorphic setting and on the symmetries of the corresponding Maass wave forms. From the geometric point of view, the underlying Riemann surfaces are classical modular curves and Shimura curves.

Hermite-Padé approximations of generalized hypergeometric series in two variables.

Sorokin, V. N. (2002)

Sibirskij Matematicheskij Zhurnal

Infinite families of accelerated series for some classical constants by the Markov-WZ Method.

Mohammed, Mohamud (2005)

Discrete Mathematics and Theoretical Computer Science. DMTCS [electronic only]

Low-rank tensor representation of Slater-type and Hydrogen-like orbitals

Martin Mrovec (2017)

Applications of Mathematics

The paper focuses on a low-rank tensor structured representation of Slater-type and Hydrogen-like orbital basis functions that can be used in electronic structure calculations. Standard packages use the Gaussian-type basis functions which allow us to analytically evaluate the necessary integrals. Slater-type and Hydrogen-like orbital functions are physically more appropriate, but they are not analytically integrable. A numerical integration is too expensive when using the standard discretization...

New results in discrete asymptotic analysis.

Vernescu, Andrei, Mortici, Cristinel (2008)

General Mathematics

On Appel-type quadrature rules.

Belingeri, C., Germano, B. (2002)

Georgian Mathematical Journal

On calculation of zeta function of integral matrix

Jiří Janáček (2009)

Mathematica Bohemica

Values of the Epstein zeta function of a positive definite matrix and the knowledge of matrices with minimal values of the Epstein zeta function are important in various mathematical disciplines. Analytic expressions for the matrix theta functions of integral matrices can be used for evaluation of the Epstein zeta function of matrices. As an example, principal coefficients in asymptotic expansions of variance of the lattice point count in the random ball are calculated for some lattices.

Optimization of parameters in the Menzerath–Altmann law

Ján Andres, Lubomír Kubáček, Jitka Machalová, Michaela Tučková (2012)

Acta Universitatis Palackianae Olomucensis. Facultas Rerum Naturalium. Mathematica

Four formulas of the Menzerath–Altmann law are tested from the point of view of their applicability and suitability. The accuracy of related approximations of measured data is examined by the least square method at first. Then the accuracy of calculated parameters in the formulas under consideration is compared statistically. The influence of neglecting parameter $c$ is investigated as well. Finally, the obtained results are discussed by means of an illustrative example from quantitative linguistics....

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