Sinc integrals and tiny numbers

Abstract

We apply a result of David and Jon Borwein to evaluate a sequence of highly-oscillatory integrals whose integrands are the products of a rapidly growing number of sinc functions. The value of each integral is given in the form π(1-t)/2, where the numbers t quickly become very tiny. Using the Euler-Maclaurin summation formula, we calculate these numbers to high precision. For example, the integrand of the tenth integral in the sequence is the product of 68100152 sinc functions. The corresponding t is approximately 9.6492736004286844634795531209398105309232 · 10-554381308.