论文信息 - NWU property of a class of random sums

NWU property of a class of random sums

In this note, we derive an inequality for the renewal process. Then, using this inequality, together with an identity in terms of the renewal process for the tails of random sums, we prove that a class of random sums is always new worse than used (NWU). Thus, the well-known NWU property of geometric sums is extended to the class of random sums. This class is illustrated by some examples, including geometric sums, mixed geometric sums, certain mixed Poisson distributions and certain negative binomial sums.

Jun Cai | Jun Cai | V. Kalashnikov | Vladimir Kalashnikov

[1] J. Frenk,et al. Some monotonicity properties of the delayed renewal function , 1991, Journal of Applied Probability.

[2] Mark Brown. Error bounds for exponential approximations of geometric convolutions , 1990 .

[3] van K Klaas Harn,et al. Classifying infinitely divisible distributions by functional equations , 1978 .

[4] Sheldon M. Ross,et al. Stochastic Processes , 2018, Gauge Integral Structures for Stochastic Calculus and Quantum Electrodynamics.

[5] Xiaodong Lin,et al. TAIL OF COMPOUND DISTRIBUTIONS AND EXCESS TIME , 1996 .

[6] Richard E. Barlow,et al. Statistical Theory of Reliability and Life Testing: Probability Models , 1976 .

[7] Henry W. Block,et al. Laplace Transforms for Classes of Life Distributions , 1980 .

[8] Bengt Klefsjö. Some properties of the HNBUE and HNWUE classes of life distributions , 1980 .

[9] J. George Shanthikumar,et al. DFR Property of First-Passage Times and its Preservation Under Geometric Compounding , 1988 .