Asymptotic evaluation of the Sinc transform of entire exponential type function resulting to exact polynomial asymptotic behavior

Abstract

We consider the asymptotic evaluation of the integral transform ∫0∞ f(x) \, n(λ x)/xn \,d x of an exponential type function f(x) of type τ>0, for large values of the parameter λ, where n is a positive integer. We refer to this integral as the Sinc transform. Under the condition that f(x) is even with respect to x, we derive a terminating asymptotic expansion of the Sinc transform which behave as a polynomial in positive powers of λ as λ grows large provided that the conditions λ > τ/2 for even n and λ>τ for odd n are satisfied.