论文信息 - On the non-closure under convolution of the subexponential family

On the non-closure under convolution of the subexponential family

A distribution F of a non-negative random variable belongs to the subexponential family of distributions S if 1 - 2)(x) - 2(1 - F(x)) as x - oo. This family is of considerable interest in branching processes, queueing theory, transient renewal theory and infinite divisibility theory. Much is known about the kind of distributions that belong to S but the question of whether S is closed under convolution has remained unresolved for some time. This paper contains an example which demonstrates that S is not in fact closed.

J. Leslie | J. R. Leslie

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