AbstractHyperasymptotic expansions are in terms of certain multiple integrals, the so-called hyperterminants. In this paper we give new integral representations for the hyperterminants. With these integral representations we are able to obtain convergent series expansions for the hyperterminants. Furthermore, we consider how these convergent expansions can be used to compute the hyperterminants to arbitrary precision
Describes a new asymptotic method of high-precision evaluation of certain integrals, related to the ...
We present a new methodology to perform the $\epsilon$-expansion of hypergeometric functions with li...
The second Appell¿s hypergeometric function F2(a,b,b0,c,c0; x,y) is considered for large values of i...
AbstractHyperasymptotic expansions are in terms of certain multiple integrals, the so-called hyperte...
AbstractHyperasymptotic expansions are in terms of certain multiple integrals, the so-called hyperte...
AbstractA new method is introduced for the computation of hyperterminants. It is based on recurrence...
Abstract. In this paper we explain how the hyperasymptotic expansion of late terms in divergent asym...
Hypergeometric structures in single and multiscale Feynman integrals emerge in a wide class of topol...
We describe how a modification of a common technique for developing asymptotic expansions of solutio...
Hyperasymptotic summation of steepest-descent asymptotic expansions of integrals is extended to func...
AbstractHadamard expansions are constructed for Laplace-type integrals containing a parameter and an...
The hyperdeteminants considered here are the simplest analogues of determinants for higher rank tens...
AbstractGiven a Feynman parameter integral, depending on a single discrete variable N and a real par...
AbstractWe apply regularization of divergent integrals in the derivation of the asymptotic expansion...
AbstractThis paper is one of a series considering the application of Hadamard expansions in the hype...
Describes a new asymptotic method of high-precision evaluation of certain integrals, related to the ...
We present a new methodology to perform the $\epsilon$-expansion of hypergeometric functions with li...
The second Appell¿s hypergeometric function F2(a,b,b0,c,c0; x,y) is considered for large values of i...
AbstractHyperasymptotic expansions are in terms of certain multiple integrals, the so-called hyperte...
AbstractHyperasymptotic expansions are in terms of certain multiple integrals, the so-called hyperte...
AbstractA new method is introduced for the computation of hyperterminants. It is based on recurrence...
Abstract. In this paper we explain how the hyperasymptotic expansion of late terms in divergent asym...
Hypergeometric structures in single and multiscale Feynman integrals emerge in a wide class of topol...
We describe how a modification of a common technique for developing asymptotic expansions of solutio...
Hyperasymptotic summation of steepest-descent asymptotic expansions of integrals is extended to func...
AbstractHadamard expansions are constructed for Laplace-type integrals containing a parameter and an...
The hyperdeteminants considered here are the simplest analogues of determinants for higher rank tens...
AbstractGiven a Feynman parameter integral, depending on a single discrete variable N and a real par...
AbstractWe apply regularization of divergent integrals in the derivation of the asymptotic expansion...
AbstractThis paper is one of a series considering the application of Hadamard expansions in the hype...
Describes a new asymptotic method of high-precision evaluation of certain integrals, related to the ...
We present a new methodology to perform the $\epsilon$-expansion of hypergeometric functions with li...
The second Appell¿s hypergeometric function F2(a,b,b0,c,c0; x,y) is considered for large values of i...
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