Right-tail asymptotics for products of independent normal random variables
Abstract
Let X1,…,Xn be independent normal random variables with Xi N(μi,σi2), and set Z=Πi=1n Xi. We derive asymptotic approximations for the right tail probability P(Z>x) as x∞. When at least one mean is nonzero, the asymptotic formula remains explicit and involves a finite multiplicative factor arising from admissible sign patterns (reflecting the different ways the product can be positive); it includes an explicit first relative correction term of order x-1/n, with remaining relative error O(x-2/n). The proof uses a boundary saddle-point/Laplace method: first a multidimensional Laplace approximation near the boundary saddle, then a one-dimensional endpoint Laplace approximation.
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