Subexponential asymptotics for stochastic processes: extremal behavior, stationary distributions and first passage probabilities
Tóm tắt
Từ khóa
Tài liệu tham khảo
1 ANANTHARAM, V. 1988. How large delay s build up in a GI GI 1 queue. Queueing Sy stems Theory Appl. 5 345 368.
2 ASMUSSEN, S. 1982. Conditioned limit theorems relating a random walk to its associate, with applications to risk reserve processes and the GI G 1 queue. Adv. in Appl. Probab. 14 143 170.
3 ASMUSSEN, S. 1987. Applied Probability and Queues. Wiley, New York.
4 ASMUSSEN, S. 1996. Rare events in the presence of heavy tails. In Stochastic Networks: Z. Rare Events and Stability P. Glasserman, K. Sigman and D. Yao, eds. 197 214. Springer, New York.
5 ASMUSSEN, S. and KLUPPELBERG, C. 1995. Large deviations results in the presence of ¨ heavy tails, with applications to insurance risk. Stochastic Process. Appl. 64 103 125.
6 ASMUSSEN, S. and KLUPPELBERG, C. 1997. Stationary M G 1 excursions in the presence of ¨ heavy tails. J. Appl. Probab. 34 208 212.
7 ASMUSSEN, S. and NIELSEN, H. M. 1995. Ruin probabilities via local adjustment coefficients. J. Appl. Probab. 32 736 755.
8 ASMUSSEN, S. and SCHOCK PETERSEN, S. 1989. Ruin probabilities expressed in terms of storage processes. Adv. in Appl. Probab. 20 913 916.
10 BERMAN, S. M. 1962. Limit distribution of the maximum term in a sequence of dependent random variables. Ann. Math. Statist. 33 894 908.
11 BROCKWELL, P. J., RESNICK, S. I. and TWEEDIE, R. L. 1982. Storage processes with general release rule and additive inputs. Adv. in Appl. Probab. 14 392 433.
13 DURRETT, R. 1980. Conditioned limit theorems for random walks with negative drift. Z. Wahrsch. Verw. Gebiete 52 277 287.
14 EMBRECHTS, P. and GOLDIE, C. M. 1980. On closure and factorization properties of subexponential and related distributions. J. Austral. Math. Soc. Ser. A 29 243 256.
15 EMBRECHTS, P., KLUPPELBERG, C. and MIKOSCH, T. 1997. Extremal Events in Finance and ¨ Insurance. Springer, New York.
16 EMBRECHTS, P. and VERAVERBEKE, N. 1982. Estimates for the probability of ruin with special emphasis on the possibility of large claims. Insurance Math. Econom. 1 55 72.
17 GELUB, J. L. and DE HAAN, L. 1987. Regular Variation, Extensions and Tauberian Theorems. CWI Tract 40. CWI, Amsterdam.
18 GNEDENKO, B. V. and KOVALENKO, I. N. 1989. Introduction to Queueing Theory, 2nd ed. Birkhauser, Basel. ¨
19 GOLDIE, C. and RESNICK, S. I. 1988. Distributions that are both subexponential and in the domain of attraction of an extreme-value distribution. Adv. in Appl. Probab. 20 706 718.
20 HARRISON, J. M. and RESNICK, S. I. 1976. The stationary distribution and first exit probabilities of a storage process with general release rule. Math. Oper. Res. 1 347 358.
21 HARRISON, J. M. and RESNICK, S. I. 1977. The recurrence classification of risk and storage processes. Math. Oper. Res. 3 57 66.
24 KLUPPELBERG, C. 1988. Subexponential distributions and integrated tails. J. Appl. Probab. ¨ 25 132 141.
25 KLUPPELBERG, C. and STADTMULLER, U. 1995. Ruin probabilities in the presence of heavy¨ ¨ tails and interest rates. Scand. Actuar. J. 49 58.
26 LEADBETTER, M. R., LINDGREN, G. and ROOTZEN, H. 1983. Extremes and Related Properties ´ of Random Sequences and Processes. Springer, New York.
28 ROOTZEN, H. 1988. Maxima and exceedances of stationary Markov chains. Adv. in Appl. ´Probab. 20 371 390.
29 SUNDT, B. and TEUGELS, J. L. 1995. Ruin estimates under interest force. Insurance Math. Econom. 16 7 22.