• Corpus ID: 233306929

Asymptotic Expansion of Laplace-Fourier-Type Integrals

@inproceedings{Konrad2021AsymptoticEO,
  title={Asymptotic Expansion of Laplace-Fourier-Type Integrals},
  author={Sara Konrad and Matthias Bartelmann},
  year={2021}
}
We study the asymptotic behaviour of integrals of the Laplace-Fourier type 

References

SHOWING 1-10 OF 16 REFERENCES

Asymptotic approximations of integrals

  • R. Wong
  • Mathematics
    Classics in applied mathematics
  • 2001

An Explicit Formula for the Coefficients in Laplace’s Method

Laplace’s method is one of the fundamental techniques in the asymptotic approximation of integrals. The coefficients appearing in the resulting asymptotic expansion arise as the coefficients of a

NIST Handbook of Mathematical Functions

This handbook results from a 10-year project conducted by the National Institute of Standards and Technology with an international group of expert authors and validators and is destined to replace its predecessor, the classic but long-outdated Handbook of Mathematical Functions, edited by Abramowitz and Stegun.

General asymptotic expansions of laplace integrals

The Asymptotic Expansion of the Generalized Hypergeometric Function

All the trinomial roots, their powers and logarithms from the Lambert series, Bell polynomials and Fox–Wright function: illustration for genome multiplicity in survival of irradiated cells

  • D. Belkić
  • Mathematics
    Journal of Mathematical Chemistry
  • 2018
All the roots of the general nth degree trinomial admit certain convenient representations in terms of the Lambert and Euler series for the asymmetric and symmetric cases of the trinomial equation,