For a function given by contour integral the two types (conventions) of asymptotic representations are considered: the usual representation by asymptotic series in inverse powers of large parameters and the special division of contour integral in contributions of high and low saddle points. It is shown that the width of the recessive term formation zone (Stokes strip) in the second convention is determined by uncertainty relation and is much less than the zone width in the first convention. The reasons of such a difference is clarified. The results of the work are useful for understanding of formation region of the exponentially small process arising on the background of the strong one
When we have two expansions of physical quantity around two different points in parameter space, we ...
Exponential asymptotics, which deals with the interpretation of divergent series, is a highly topica...
This thesis contains three main parts. The first part concerns the derivation of an asymptotic expan...
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...
A singularly perturbed linear partial differential equation motivated by the geometrical model for c...
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...
AbstractIn this paper we discuss the higher-order Stokes phenomenon of the particular integral of an...
We consider classes of functions uniquely determined by coefficients of their divergent expansions. ...
A prevalent though unexpected asymptotic phenomenon occurs near anti-Stokes lines, on which two expo...
During the course of a Stokes phenomenon, an asymptotic expansion can change its form as a further s...
The Stokes phenomenon refers to the emergence of jump discontinuities in asymptotic expansions at sp...
AbstractIn this sequel to Paris (On the use of Hadamard expansions in hyperasymptotic evaluation of ...
AbstractOn the occasion of the conference we mention examples of Stieltjes' work on asymptotics of s...
When we have two expansions of physical quantity around two different points in parameter space, we ...
Exponential asymptotics, which deals with the interpretation of divergent series, is a highly topica...
This thesis contains three main parts. The first part concerns the derivation of an asymptotic expan...
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...
A singularly perturbed linear partial differential equation motivated by the geometrical model for c...
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...
AbstractIn this paper we discuss the higher-order Stokes phenomenon of the particular integral of an...
We consider classes of functions uniquely determined by coefficients of their divergent expansions. ...
A prevalent though unexpected asymptotic phenomenon occurs near anti-Stokes lines, on which two expo...
During the course of a Stokes phenomenon, an asymptotic expansion can change its form as a further s...
The Stokes phenomenon refers to the emergence of jump discontinuities in asymptotic expansions at sp...
AbstractIn this sequel to Paris (On the use of Hadamard expansions in hyperasymptotic evaluation of ...
AbstractOn the occasion of the conference we mention examples of Stieltjes' work on asymptotics of s...
When we have two expansions of physical quantity around two different points in parameter space, we ...
Exponential asymptotics, which deals with the interpretation of divergent series, is a highly topica...
This thesis contains three main parts. The first part concerns the derivation of an asymptotic expan...