Asymptotic Expansion of Laplace-Fourier-Type Integrals

Abstract

We study the asymptotic behaviour of integrals of the Laplace-Fourier type P(k) = ∫-|k|sf(x)ei kxd x\;, with k∈Rd in d1 dimensions, with ⊂Rd and sufficiently well-behaved functions f:. Our main result is P(k) e-|k|sf(0)|k|sd/2(2π)d A (-k A-1k2|k|s) for |k|∞, where A is the Hessian matrix of the function f at its critical point, assumed to be at x0 = 0. In one dimension, the Hessian is replaced by the second derivative, A = f''(0). We also show that the integration domain can be extended to Rd without changing the asymptotic behaviour.