Journal
Proceedings of the American Mathematical Society
Publisher
American Mathematical Society
Abstract
An integral inequality due to Ball involves the Lq norm of the sincp
function; the dependence of this norm on q as q → ∞ is now understood.
By use of recent inequalities involving p−trigonometric functions (1 <
p < ∞) we obtain asymptotic information about the analogue of Ball’s
integral when sin is replaced by sinp .
