Convolution powers of unbounded measures on the positive half-line
Abstract
For a right-continuous nondecreasing and unbounded function V of at most exponential growth, which vanishes on the negative halfline, we investigate the asymptotic behavior of the Lebesgue-Stieltjes convolution powers V(j)(t) as both j and t tend to infinity. We obtain a comprehensive asymptotic formula for V(j)(t), which is valid across different regimes of simultaneous growth of j and t. Our main technical tool is an exponential change of measure, which is a standard technique in the large deviations theory. Various applications of our result are given.
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