The Stokes phenomenon is the apparent discontinuous change in the form of the asymptotic expansion of a function across certain rays in the complex plane, known as Stokes lines, as additional expansions, pre-factored by exponentially small terms, appear in its representation. It was first observed by G. G. Stokes while studying the asymptotic behaviour of the Airy function. R. B. Dingle proposed a set of rules for locating Stokes lines and continuing asymptotic expansions across them. Included among these rules is the "final main rule" stating that half the discontinuity in form occurs on reaching the Stokes line, and half on leaving it the other side. M. V. Berry demonstrated that, if an asymptotic expansion is terminated just before its n...
this subject. In a sequel, we discuss the hyperasymptotic expansions of the first Painleve ́ equatio...
The Stokes phenomenon is a class of asymptotic behaviour that was first discovered by Stokes in his ...
Abstract. In this paper we explain how the hyperasymptotic expansion of late terms in divergent asym...
The Stokes phenomenon is the apparent discontinuous change in the form of the asymptotic expansion o...
This paper describes the use of matched asymptotic expansions to illuminate the description of funct...
During the course of a Stokes phenomenon, an asymptotic expansion can change its form as a further s...
During the course of a Stokes phenomenon, an asymptotic expansion can change its form as a further s...
This paper discusses the relevance of the asymptotic behavior of the coefficients of asymptotic powe...
The Stokes phenomenon refers to the emergence of jump discontinuities in asymptotic expansions at sp...
As an introduction we present a new, elementary and constructive proof of the multisummability prope...
The solutions of the perturbed first Painlev\'e equation $y"=6y^2-x^\mu$, $\mu>-4$, are uniquely det...
For a function given by contour integral the two types (conventions) of asymptotic representations a...
A singularly perturbed linear partial differential equation motivated by the geometrical model for c...
Exponential asymptotics, which deals with the interpretation of divergent series, is a highly topica...
This paper describes the use of matched asymptotic expansions to illuminate the description of funct...
this subject. In a sequel, we discuss the hyperasymptotic expansions of the first Painleve ́ equatio...
The Stokes phenomenon is a class of asymptotic behaviour that was first discovered by Stokes in his ...
Abstract. In this paper we explain how the hyperasymptotic expansion of late terms in divergent asym...
The Stokes phenomenon is the apparent discontinuous change in the form of the asymptotic expansion o...
This paper describes the use of matched asymptotic expansions to illuminate the description of funct...
During the course of a Stokes phenomenon, an asymptotic expansion can change its form as a further s...
During the course of a Stokes phenomenon, an asymptotic expansion can change its form as a further s...
This paper discusses the relevance of the asymptotic behavior of the coefficients of asymptotic powe...
The Stokes phenomenon refers to the emergence of jump discontinuities in asymptotic expansions at sp...
As an introduction we present a new, elementary and constructive proof of the multisummability prope...
The solutions of the perturbed first Painlev\'e equation $y"=6y^2-x^\mu$, $\mu>-4$, are uniquely det...
For a function given by contour integral the two types (conventions) of asymptotic representations a...
A singularly perturbed linear partial differential equation motivated by the geometrical model for c...
Exponential asymptotics, which deals with the interpretation of divergent series, is a highly topica...
This paper describes the use of matched asymptotic expansions to illuminate the description of funct...
this subject. In a sequel, we discuss the hyperasymptotic expansions of the first Painleve ́ equatio...
The Stokes phenomenon is a class of asymptotic behaviour that was first discovered by Stokes in his ...
Abstract. In this paper we explain how the hyperasymptotic expansion of late terms in divergent asym...