EuDML | Browse

We show that a transformation method relating planar first-order differential systems to second order equations is an effective tool for finding non-liouvillian first integrals. We obtain explicit first integrals for a subclass of Kukles systems, including fourth and fifth order systems, and for generalized Liénard-type systems.

A simple proof of Ramanujan's summation of the ... .

George E Andrews, Richard Askey (1978)

Aequationes mathematicae

A simplification of the Laplace method for double integrals. Application to the second Appell function.

López, José L., Pagola, Pedro J. (2008)

ETNA. Electronic Transactions on Numerical Analysis [electronic only]

A sixteenth-order polylogarithm ladder.

Cohen, Henri, Lewin, Leonard, Zagier, Don (1992)

Experimental Mathematics

A solution of the boundary value problem in heat conduction

M. Shah (1973)

Matematički Vesnik

A special class of two dimensional exponential-Bessel series of Fox’s $H$ -function

S. D. Bajpai (1992)

Annales scientifiques de l'Université de Clermont. Mathématiques

A study of $q$ -Laguerre polynomials through the $T_{k, q, x}$ -operator

Mumtaz Ahmad Khan (1997)

Czechoslovak Mathematical Journal

The present paper deals with certain generating functions and recurrence relations for $q$ -Laguerre polynomials through the use of the $T_{k, q, x}$ -operator introduced in an earlier paper [7].

A survey on D-semiclassical orthogonal polynomials.

Ghressi, Abdallah, Kheriji, Lotfi (2010)

Applied Mathematics E-Notes [electronic only]

A symbolic operator approach to power series transformation-expansion formulas.

He, Tian-Xiao (2008)

Journal of Integer Sequences [electronic only]

A system of differential equations for the Airy process.

Tracy, Craig A., Widom, Harold (2003)

Electronic Communications in Probability [electronic only]

A transformation formula for a special bilateral basic hypergeometric $_{12} ψ_{12}$ series.

Zhang, Zhizheng, Hu, Qiuxia (2009)

Acta Mathematica Universitatis Comenianae. New Series

A transplantation theorem for ultraspherical polynomials at critical index

J. J. Guadalupe, V. I. Kolyada (2001)

Studia Mathematica

We investigate the behaviour of Fourier coefficients with respect to the system of ultraspherical polynomials. This leads us to the study of the “boundary” Lorentz space $ℒ_{λ}$ corresponding to the left endpoint of the mean convergence interval. The ultraspherical coefficients $c ₙ^{(λ)} (f)$ of $ℒ_{λ}$ -functions turn out to behave like the Fourier coefficients of functions in the real Hardy space ReH¹. Namely, we prove that for any $f \in ℒ_{λ}$ the series $\sum_{n = 1}^{\infty} c ₙ^{(λ)} (f) c o s n θ$ is the Fourier series of some function φ ∈ ReH¹ with ${| | φ | |}_{R e H ¹} {\leq c | | f | |}_{ℒ_{λ}}$ .

A triple lacunary generating function for Hermite polynomials.

Gessel, Ira M., Jayawant, Pallayi (2005)

The Electronic Journal of Combinatorics [electronic only]

Currently displaying 141 – 160 of 310

Previous Page 8 Next