AbstractLaplace's method is one of the best-known techniques in the asymptotic approximation of integrals. The salient step in the technique's historical development was Erdélyi's use of Watson's Lemma to obtain an infinite asymptotic expansion valid for any Laplace-type integral, published in 1956. Erdélyi's expansion contains coefficients cs that must be calculated in each application of Laplace's method, a tedious process that has traditionally involved the reversion of a series. This paper shows that the coefficients cs in fact have a very simple general form. In effect, we extend Erdélyi's theorem. Our results greatly simplify calculation of the cs in any particular application and clarify the theoretical basis of Erdélyi's expansion: ...
1 1 Integration by Parts 1 2 Laplace Integrals 3 3 Laplace's Method 5 4 Fourier Integrals 8 5 S...
bibliographical data to be processed -- In: TW in beeld: bij het afscheid van prof.dr. H.A. Lauwerie...
The classical Laplace expansion of an 'arbitrary ' function / in a series of Legendre poly...
AbstractLaplace's method is one of the best-known techniques in the asymptotic approximation of inte...
AbstractThe main difficulties in the Laplace’s method of asymptotic expansions of integrals are orig...
AbstractWe examine a Maple implementation of two distinct approaches to Laplace's method used to obt...
We revise Laplace’s and Steepest Descents methods of asymptotic expansions of integrals. The main di...
A technique for obtaining asymptotic expansions of integrals by approximating the integrand and then...
We give an overview of basic methods that can be used for obtaining asymptotic expansions of integra...
Bell's polynomials have been used in many different fields, ranging from number theory to operators ...
An extension of the Laplace transform by using Bell polynomials was recently introduced. In the pres...
International audienceRecently, Breiter et al. [Celest. Mech. Dyn. Astron., 2004, 88, 153 161] repor...
AbstractThis paper is one of a series considering the application of Hadamard expansions in the hype...
AbstractThe classical term-by-term integration technique used for obtaining asymptotic expansions of...
The expansion of Taylor series is a very old topic in both pure and applied mathematics. It plays a ...
1 1 Integration by Parts 1 2 Laplace Integrals 3 3 Laplace's Method 5 4 Fourier Integrals 8 5 S...
bibliographical data to be processed -- In: TW in beeld: bij het afscheid van prof.dr. H.A. Lauwerie...
The classical Laplace expansion of an 'arbitrary ' function / in a series of Legendre poly...
AbstractLaplace's method is one of the best-known techniques in the asymptotic approximation of inte...
AbstractThe main difficulties in the Laplace’s method of asymptotic expansions of integrals are orig...
AbstractWe examine a Maple implementation of two distinct approaches to Laplace's method used to obt...
We revise Laplace’s and Steepest Descents methods of asymptotic expansions of integrals. The main di...
A technique for obtaining asymptotic expansions of integrals by approximating the integrand and then...
We give an overview of basic methods that can be used for obtaining asymptotic expansions of integra...
Bell's polynomials have been used in many different fields, ranging from number theory to operators ...
An extension of the Laplace transform by using Bell polynomials was recently introduced. In the pres...
International audienceRecently, Breiter et al. [Celest. Mech. Dyn. Astron., 2004, 88, 153 161] repor...
AbstractThis paper is one of a series considering the application of Hadamard expansions in the hype...
AbstractThe classical term-by-term integration technique used for obtaining asymptotic expansions of...
The expansion of Taylor series is a very old topic in both pure and applied mathematics. It plays a ...
1 1 Integration by Parts 1 2 Laplace Integrals 3 3 Laplace's Method 5 4 Fourier Integrals 8 5 S...
bibliographical data to be processed -- In: TW in beeld: bij het afscheid van prof.dr. H.A. Lauwerie...
The classical Laplace expansion of an 'arbitrary ' function / in a series of Legendre poly...